/* There are a total of 312 entries in the algebraic variable array. There are a total of 25 entries in each of the rate and state variable arrays. There are a total of 342 entries in the constant variable array. */ /* * VOI is time in component environment (minute). * ALGEBRAIC[0] is pH_cy in component environment (dimensionless). * CONSTANTS[34] is addbuffer in component environment (dimensionless). * CONSTANTS[35] is pHstat in component environment (dimensionless). * CONSTANTS[2] is Par_97 in component parameters (dimensionless). * CONSTANTS[3] is Par_98 in component parameters (dimensionless). * STATES[0] is pH_calc in component differential_equations (dimensionless). * CONSTANTS[0] is R in component global_parameters (kilojoule_per_kelvin_per_mole). * CONSTANTS[1] is T1 in component global_parameters (kelvin). * CONSTANTS[130] is T in component global_parameters (kelvin). * CONSTANTS[125] is I in component global_parameters (molar). * CONSTANTS[124] is Par_90 in component parameters (molar). * CONSTANTS[129] is Par_94 in component parameters (kelvin). * CONSTANTS[4] is Par_1 in component parameters (molar_per_minute). * CONSTANTS[5] is Par_2 in component parameters (dimensionless). * CONSTANTS[6] is Par_3 in component parameters (molar). * CONSTANTS[36] is Par_4 in component parameters (molar). * CONSTANTS[56] is Par_5 in component parameters (molar). * CONSTANTS[7] is Par_6 in component parameters (molar). * CONSTANTS[57] is Par_7 in component parameters (molar). * CONSTANTS[8] is Par_8 in component parameters (molar). * CONSTANTS[58] is Par_9 in component parameters (molar). * CONSTANTS[59] is Par_10 in component parameters (molar). * CONSTANTS[9] is Par_11 in component parameters (molar). * CONSTANTS[60] is Par_12 in component parameters (molar). * CONSTANTS[61] is Par_13 in component parameters (molar). * CONSTANTS[10] is Par_14 in component parameters (molar). * CONSTANTS[62] is Par_15 in component parameters (molar). * CONSTANTS[11] is Par_16 in component parameters (molar). * CONSTANTS[12] is Par_17 in component parameters (dimensionless). * CONSTANTS[13] is Par_18 in component parameters (dimensionless). * CONSTANTS[63] is Par_19 in component parameters (molar_per_minute). * CONSTANTS[64] is Par_20 in component parameters (molar). * CONSTANTS[65] is Par_21 in component parameters (molar). * CONSTANTS[66] is Par_22 in component parameters (molar_per_minute). * CONSTANTS[67] is Par_23 in component parameters (molar). * CONSTANTS[68] is Par_24 in component parameters (molar). * CONSTANTS[69] is Par_25 in component parameters (molar_per_minute). * CONSTANTS[70] is Par_26 in component parameters (molar). * CONSTANTS[71] is Par_27 in component parameters (molar). * CONSTANTS[72] is Par_28 in component parameters (molar). * CONSTANTS[73] is Par_29 in component parameters (molar). * CONSTANTS[74] is Par_30 in component parameters (molar). * CONSTANTS[14] is Par_31 in component parameters (molar). * CONSTANTS[75] is Par_32 in component parameters (molar). * CONSTANTS[15] is Par_33 in component parameters (molar). * CONSTANTS[16] is Par_34 in component parameters (molar). * CONSTANTS[17] is Par_35 in component parameters (molar). * CONSTANTS[18] is Par_36 in component parameters (dimensionless). * CONSTANTS[19] is Par_37 in component parameters (dimensionless). * CONSTANTS[20] is Par_38 in component parameters (dimensionless). * CONSTANTS[76] is Par_39 in component parameters (molar_per_minute). * CONSTANTS[77] is Par_40 in component parameters (molar). * CONSTANTS[78] is Par_41 in component parameters (molar). * CONSTANTS[79] is Par_42 in component parameters (molar). * CONSTANTS[80] is Par_43 in component parameters (molar_per_minute). * CONSTANTS[81] is Par_44 in component parameters (molar). * CONSTANTS[82] is Par_45 in component parameters (molar). * CONSTANTS[83] is Par_46 in component parameters (molar_per_minute). * CONSTANTS[84] is Par_47 in component parameters (molar). * CONSTANTS[85] is Par_48 in component parameters (molar). * CONSTANTS[86] is Par_49 in component parameters (molar). * CONSTANTS[87] is Par_50 in component parameters (molar). * CONSTANTS[88] is Par_51 in component parameters (molar_per_minute). * CONSTANTS[89] is Par_52 in component parameters (molar). * CONSTANTS[90] is Par_53 in component parameters (molar). * CONSTANTS[91] is Par_54 in component parameters (molar). * CONSTANTS[92] is Par_55 in component parameters (molar). * CONSTANTS[93] is Par_56 in component parameters (molar). * CONSTANTS[94] is Par_57 in component parameters (molar_per_minute). * CONSTANTS[95] is Par_58 in component parameters (molar). * CONSTANTS[96] is Par_59 in component parameters (molar). * CONSTANTS[97] is Par_60 in component parameters (molar). * CONSTANTS[98] is Par_61 in component parameters (molar). * CONSTANTS[99] is Par_62 in component parameters (molar_per_minute). * CONSTANTS[100] is Par_63 in component parameters (molar). * CONSTANTS[101] is Par_64 in component parameters (molar). * CONSTANTS[102] is Par_65 in component parameters (molar_per_minute). * CONSTANTS[103] is Par_66 in component parameters (molar). * CONSTANTS[104] is Par_67 in component parameters (molar). * CONSTANTS[105] is Par_68 in component parameters (molar_per_minute). * CONSTANTS[106] is Par_69 in component parameters (molar). * CONSTANTS[107] is Par_70 in component parameters (molar). * CONSTANTS[108] is Par_71 in component parameters (molar). * CONSTANTS[109] is Par_72 in component parameters (molar). * CONSTANTS[110] is Par_73 in component parameters (molar_per_minute). * CONSTANTS[111] is Par_74 in component parameters (molar). * CONSTANTS[112] is Par_75 in component parameters (molar). * CONSTANTS[113] is Par_76 in component parameters (molar). * CONSTANTS[114] is Par_77 in component parameters (molar). * CONSTANTS[115] is Par_78 in component parameters (molar_per_minute). * CONSTANTS[116] is Par_79 in component parameters (molar). * CONSTANTS[117] is Par_80 in component parameters (molar). * CONSTANTS[118] is Par_81 in component parameters (molar). * CONSTANTS[21] is Par_82 in component parameters (molar). * CONSTANTS[119] is Par_83 in component parameters (molar). * CONSTANTS[120] is Par_84 in component parameters (molar_per_minute). * CONSTANTS[121] is Par_85 in component parameters (molar). * CONSTANTS[122] is Par_86 in component parameters (molar). * CONSTANTS[123] is Par_87 in component parameters (molar). * CONSTANTS[22] is Par_88 in component parameters (molar_per_minute). * CONSTANTS[23] is Par_89 in component parameters (molar). * CONSTANTS[126] is Par_91 in component parameters (molar). * CONSTANTS[127] is Par_92 in component parameters (molar). * CONSTANTS[128] is Par_93 in component parameters (molar). * CONSTANTS[24] is Par_95 in component parameters (molar). * CONSTANTS[131] is Par_96 in component parameters (molar). * CONSTANTS[132] is Par_99 in component parameters (dimensionless). * CONSTANTS[25] is Par_100 in component parameters (dimensionless). * CONSTANTS[37] is mgT in component equilibrium_constants (molar). * CONSTANTS[133] is k in component equilibrium_constants (molar). * CONSTANTS[134] is c0 in component equilibrium_constants (molar). * CONSTANTS[135] is RT2dadT in component correction_factors (kilojoule_half_liter_per_3_half_mole). * CONSTANTS[136] is B in component correction_factors (per_half_molar). * CONSTANTS[137] is Icorr in component correction_factors (kilojoule_per_mole). * CONSTANTS[138] is I1 in component correction_factors (molar). * CONSTANTS[139] is alphadebye in component correction_factors (per_half_molar). * CONSTANTS[140] is IcorrpKa in component correction_factors (kilojoule_per_mole). * CONSTANTS[141] is TcorrpKa in component correction_factors (mole_per_kilojoule). * CONSTANTS[142] is RTalpha in component correction_factors (kilojoule_half_liter_per_3_half_mole). * CONSTANTS[143] is IcorrdeltaGpof in component correction_factors (kilojoule_per_mole). * CONSTANTS[144] is pKak_Pi in component correction_factors (dimensionless). * CONSTANTS[145] is deltaH1o_Pi in component correction_factors (kilojoule_per_mole). * CONSTANTS[146] is deltaHmgo_Pi in component correction_factors (kilojoule_per_mole). * CONSTANTS[147] is deltaH1_Pi in component correction_factors (kilojoule_per_mole). * CONSTANTS[148] is deltaHmg_Pi in component correction_factors (kilojoule_per_mole). * CONSTANTS[149] is pKa1_Pi in component correction_factors (dimensionless). * CONSTANTS[150] is pKamg_Pi in component correction_factors (dimensionless). * ALGEBRAIC[1] is P_Pi in component correction_factors (dimensionless). * ALGEBRAIC[2] is HPi2 in component correction_factors (dimensionless). * ALGEBRAIC[3] is H2Pi1 in component correction_factors (dimensionless). * ALGEBRAIC[4] is kPi in component correction_factors (dimensionless). * ALGEBRAIC[5] is mgPi in component correction_factors (dimensionless). * ALGEBRAIC[6] is Navg_Pi in component correction_factors (dimensionless). * ALGEBRAIC[7] is dNavgPidH in component correction_factors (per_molar). * ALGEBRAIC[8] is dNavgPidmg in component correction_factors (per_molar). * ALGEBRAIC[9] is dmgPidmg in component correction_factors (per_molar). * ALGEBRAIC[10] is dmgPidpH in component correction_factors (dimensionless). * CONSTANTS[151] is NH_HPi2 in component correction_factors (dimensionless). * CONSTANTS[152] is deltaGof_HPi2 in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[11] is deltaGpof_HPi2 in component correction_factors (kilojoule_per_mole). * CONSTANTS[153] is deltaH1o_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[154] is deltaHmgo_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[155] is deltaHko_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[156] is deltaH1_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[157] is deltaHmg_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[158] is deltaHk_ATP in component correction_factors (kilojoule_per_mole). * CONSTANTS[159] is pKa1_ATP in component correction_factors (dimensionless). * CONSTANTS[160] is pKamg_ATP in component correction_factors (dimensionless). * CONSTANTS[161] is pKak_ATP in component correction_factors (dimensionless). * ALGEBRAIC[12] is P_ATP in component correction_factors (dimensionless). * ALGEBRAIC[13] is ATP4 in component correction_factors (dimensionless). * ALGEBRAIC[14] is HATP3 in component correction_factors (dimensionless). * ALGEBRAIC[15] is mgATP2 in component correction_factors (dimensionless). * ALGEBRAIC[16] is kATP in component correction_factors (dimensionless). * ALGEBRAIC[17] is Navg_ATP in component correction_factors (dimensionless). * ALGEBRAIC[18] is dNavgATPdH in component correction_factors (per_molar). * ALGEBRAIC[19] is dNavgATPdmg in component correction_factors (per_molar). * ALGEBRAIC[20] is dmgATP2dmg in component correction_factors (per_molar). * ALGEBRAIC[21] is dmgATP2dpH in component correction_factors (dimensionless). * CONSTANTS[162] is NH_ATP4 in component correction_factors (dimensionless). * CONSTANTS[163] is deltaGof_ATP4 in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[22] is deltaGpof_ATP4 in component correction_factors (kilojoule_per_mole). * CONSTANTS[164] is pKak_ADP in component correction_factors (dimensionless). * CONSTANTS[165] is deltaH1o_ADP in component correction_factors (kilojoule_per_mole). * CONSTANTS[166] is deltaHmgo_ADP in component correction_factors (kilojoule_per_mole). * CONSTANTS[167] is deltaH1_ADP in component correction_factors (kilojoule_per_mole). * CONSTANTS[168] is deltaHmg_ADP in component correction_factors (kilojoule_per_mole). * CONSTANTS[169] is pKa1_ADP in component correction_factors (dimensionless). * CONSTANTS[170] is pKamg_ADP in component correction_factors (dimensionless). * ALGEBRAIC[23] is P_ADP in component correction_factors (dimensionless). * ALGEBRAIC[24] is ADP3 in component correction_factors (dimensionless). * ALGEBRAIC[25] is HADP2 in component correction_factors (dimensionless). * ALGEBRAIC[26] is mgADP in component correction_factors (dimensionless). * ALGEBRAIC[27] is kADP in component correction_factors (dimensionless). * ALGEBRAIC[28] is Navg_ADP in component correction_factors (dimensionless). * ALGEBRAIC[29] is dNavgADPdH in component correction_factors (per_molar). * ALGEBRAIC[31] is dNavgADPdmg in component correction_factors (per_molar). * ALGEBRAIC[32] is dmgADPdmg in component correction_factors (per_molar). * ALGEBRAIC[33] is dmgADPdpH in component correction_factors (dimensionless). * CONSTANTS[171] is NH_ADP3 in component correction_factors (dimensionless). * CONSTANTS[172] is deltaGof_ADP3 in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[34] is deltaGpof_ADP3 in component correction_factors (kilojoule_per_mole). * CONSTANTS[173] is deltaH1o_AMP in component correction_factors (kilojoule_per_mole). * CONSTANTS[174] is deltaHmgo_AMP in component correction_factors (kilojoule_per_mole). * CONSTANTS[175] is deltaH1_AMP in component correction_factors (kilojoule_per_mole). * CONSTANTS[176] is deltaHmg_AMP in component correction_factors (kilojoule_per_mole). * CONSTANTS[177] is pKa1_AMP in component correction_factors (dimensionless). * CONSTANTS[178] is pKamg_AMP in component correction_factors (dimensionless). * ALGEBRAIC[35] is P_AMP in component correction_factors (dimensionless). * ALGEBRAIC[36] is AMP2 in component correction_factors (dimensionless). * ALGEBRAIC[37] is HAMP1 in component correction_factors (dimensionless). * ALGEBRAIC[38] is mgAMP in component correction_factors (dimensionless). * ALGEBRAIC[39] is Navg_AMP in component correction_factors (dimensionless). * ALGEBRAIC[40] is dNavgAMPdH in component correction_factors (per_molar). * ALGEBRAIC[41] is dNavgAMPdmg in component correction_factors (per_molar). * ALGEBRAIC[42] is dmgAMPdmg in component correction_factors (per_molar). * ALGEBRAIC[43] is dmgAMPdpH in component correction_factors (dimensionless). * CONSTANTS[179] is NH_AMP2 in component correction_factors (dimensionless). * CONSTANTS[180] is deltaGof_AMP2 in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[44] is deltaGpof_AMP2 in component correction_factors (kilojoule_per_mole). * CONSTANTS[181] is pKak_PCR in component correction_factors (dimensionless). * CONSTANTS[182] is deltaH1o_PCR in component correction_factors (kilojoule_per_mole). * CONSTANTS[183] is deltaHmgo_PCR in component correction_factors (kilojoule_per_mole). * CONSTANTS[184] is deltaH1_PCR in component correction_factors (kilojoule_per_mole). * CONSTANTS[185] is deltaHmg_PCR in component correction_factors (kilojoule_per_mole). * CONSTANTS[186] is pKa1_PCR in component correction_factors (dimensionless). * CONSTANTS[187] is pKamg_PCR in component correction_factors (dimensionless). * ALGEBRAIC[45] is P_PCR in component correction_factors (dimensionless). * ALGEBRAIC[46] is HPCR in component correction_factors (dimensionless). * ALGEBRAIC[48] is H2PCR in component correction_factors (dimensionless). * ALGEBRAIC[47] is kPCR in component correction_factors (dimensionless). * ALGEBRAIC[49] is mgPCR in component correction_factors (dimensionless). * ALGEBRAIC[50] is Navg_PCR in component correction_factors (dimensionless). * ALGEBRAIC[51] is dNavgPCRdH in component correction_factors (per_molar). * ALGEBRAIC[52] is dNavgPCRdmg in component correction_factors (per_molar). * ALGEBRAIC[53] is dmgPCRdmg in component correction_factors (per_molar). * ALGEBRAIC[54] is dmgPCRdpH in component correction_factors (dimensionless). * CONSTANTS[188] is NH_HPCR in component correction_factors (dimensionless). * CONSTANTS[189] is pKa1_CR in component correction_factors (dimensionless). * ALGEBRAIC[55] is P_CR in component correction_factors (dimensionless). * ALGEBRAIC[56] is HCR in component correction_factors (dimensionless). * ALGEBRAIC[57] is H2CR in component correction_factors (dimensionless). * ALGEBRAIC[58] is Navg_CR in component correction_factors (dimensionless). * ALGEBRAIC[59] is dNavgCRdH in component correction_factors (per_molar). * CONSTANTS[26] is dNavgCRdmg in component correction_factors (per_molar). * CONSTANTS[190] is NH_HCR in component correction_factors (dimensionless). * CONSTANTS[191] is deltaH1o_G1P in component correction_factors (kilojoule_per_mole). * CONSTANTS[192] is deltaHmgo_G1P in component correction_factors (kilojoule_per_mole). * CONSTANTS[193] is deltaH1_G1P in component correction_factors (kilojoule_per_mole). * CONSTANTS[194] is deltaHmg_G1P in component correction_factors (kilojoule_per_mole). * CONSTANTS[195] is pKa1_G1P in component correction_factors (dimensionless). * CONSTANTS[196] is pKamg_G1P in component correction_factors (dimensionless). * ALGEBRAIC[60] is P_G1P in component correction_factors (dimensionless). * ALGEBRAIC[61] is UG1P in component correction_factors (dimensionless). * ALGEBRAIC[62] is HG1P in component correction_factors (dimensionless). * ALGEBRAIC[63] is mgG1P in component correction_factors (dimensionless). * ALGEBRAIC[64] is Navg_G1P in component correction_factors (dimensionless). * ALGEBRAIC[65] is dNavgG1PdH in component correction_factors (per_molar). * ALGEBRAIC[66] is dNavgG1Pdmg in component correction_factors (per_molar). * ALGEBRAIC[67] is dmgG1Pdmg in component correction_factors (per_molar). * ALGEBRAIC[68] is dmgG1PdpH in component correction_factors (dimensionless). * CONSTANTS[197] is NH_UG1P in component correction_factors (dimensionless). * CONSTANTS[198] is deltaGof_UG1P in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[69] is deltaGpof_UG1P in component correction_factors (kilojoule_per_mole). * CONSTANTS[199] is pKa1_G6P in component correction_factors (dimensionless). * ALGEBRAIC[70] is P_G6P in component correction_factors (dimensionless). * ALGEBRAIC[71] is UG6P in component correction_factors (dimensionless). * ALGEBRAIC[72] is HG6P in component correction_factors (dimensionless). * ALGEBRAIC[73] is Navg_G6P in component correction_factors (dimensionless). * ALGEBRAIC[74] is dNavgG6PdH in component correction_factors (per_molar). * CONSTANTS[27] is dNavgG6Pdmg in component correction_factors (per_molar). * CONSTANTS[200] is NH_UG6P in component correction_factors (dimensionless). * CONSTANTS[201] is deltaGof_UG6P in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[75] is deltaGpof_UG6P in component correction_factors (kilojoule_per_mole). * CONSTANTS[202] is pKa1_F6P in component correction_factors (dimensionless). * ALGEBRAIC[76] is P_F6P in component correction_factors (dimensionless). * ALGEBRAIC[77] is UF6P in component correction_factors (dimensionless). * ALGEBRAIC[78] is HF6P in component correction_factors (dimensionless). * ALGEBRAIC[79] is Navg_F6P in component correction_factors (dimensionless). * ALGEBRAIC[80] is dNavgF6PdH in component correction_factors (per_molar). * CONSTANTS[28] is dNavgF6Pdmg in component correction_factors (per_molar). * CONSTANTS[203] is NH_UF6P in component correction_factors (dimensionless). * CONSTANTS[204] is deltaGof_UF6P in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[81] is deltaGpof_UF6P in component correction_factors (kilojoule_per_mole). * CONSTANTS[205] is pKa1_FDP in component correction_factors (dimensionless). * CONSTANTS[206] is pKa2_FDP in component correction_factors (dimensionless). * CONSTANTS[207] is pKamg_FDP in component correction_factors (dimensionless). * ALGEBRAIC[82] is P_FDP in component correction_factors (dimensionless). * ALGEBRAIC[83] is UFDP in component correction_factors (dimensionless). * ALGEBRAIC[84] is HFDP in component correction_factors (dimensionless). * ALGEBRAIC[85] is H2FDP in component correction_factors (dimensionless). * ALGEBRAIC[86] is mgFDP in component correction_factors (dimensionless). * ALGEBRAIC[87] is Navg_FDP in component correction_factors (dimensionless). * ALGEBRAIC[88] is dNavgFDPdH in component correction_factors (per_molar). * ALGEBRAIC[89] is dNavgFDPdmg in component correction_factors (per_molar). * ALGEBRAIC[90] is dmgFDPdmg in component correction_factors (per_molar). * ALGEBRAIC[91] is dmgFDPdpH in component correction_factors (dimensionless). * CONSTANTS[208] is NH_UFDP in component correction_factors (dimensionless). * CONSTANTS[209] is deltaGof_UFDP in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[92] is deltaGpof_UFDP in component correction_factors (kilojoule_per_mole). * CONSTANTS[210] is pKa1_GAP in component correction_factors (dimensionless). * ALGEBRAIC[93] is P_GAP in component correction_factors (dimensionless). * ALGEBRAIC[94] is UGAP in component correction_factors (dimensionless). * ALGEBRAIC[95] is HGAP in component correction_factors (dimensionless). * ALGEBRAIC[96] is Navg_GAP in component correction_factors (dimensionless). * ALGEBRAIC[97] is dNavgGAPdH in component correction_factors (per_molar). * CONSTANTS[29] is dNavgGAPdmg in component correction_factors (per_molar). * CONSTANTS[211] is NH_UGAP in component correction_factors (dimensionless). * CONSTANTS[212] is deltaGof_UGAP in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[98] is deltaGpof_UGAP in component correction_factors (kilojoule_per_mole). * CONSTANTS[213] is pKamg_G3P in component correction_factors (dimensionless). * CONSTANTS[214] is deltaH1o_G3P in component correction_factors (kilojoule_per_mole). * CONSTANTS[215] is deltaH1_G3P in component correction_factors (kilojoule_per_mole). * CONSTANTS[216] is pKa1_G3P in component correction_factors (dimensionless). * ALGEBRAIC[99] is P_G3P in component correction_factors (dimensionless). * ALGEBRAIC[100] is UG3P in component correction_factors (dimensionless). * ALGEBRAIC[101] is HG3P in component correction_factors (dimensionless). * ALGEBRAIC[102] is mgG3P in component correction_factors (dimensionless). * ALGEBRAIC[103] is Navg_G3P in component correction_factors (dimensionless). * ALGEBRAIC[104] is dNavgG3PdH in component correction_factors (per_molar). * ALGEBRAIC[105] is dNavgG3Pdmg in component correction_factors (per_molar). * ALGEBRAIC[106] is dmgG3Pdmg in component correction_factors (per_molar). * ALGEBRAIC[107] is dmgG3PdpH in component correction_factors (dimensionless). * CONSTANTS[217] is NH_UG3P in component correction_factors (dimensionless). * CONSTANTS[218] is deltaGof_UG3P in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[108] is deltaGpof_UG3P in component correction_factors (kilojoule_per_mole). * CONSTANTS[219] is pKa1_DHAP in component correction_factors (dimensionless). * CONSTANTS[220] is pKamg_DHAP in component correction_factors (dimensionless). * ALGEBRAIC[109] is P_DHAP in component correction_factors (dimensionless). * ALGEBRAIC[110] is UDHAP in component correction_factors (dimensionless). * ALGEBRAIC[111] is HDHAP in component correction_factors (dimensionless). * ALGEBRAIC[112] is mgDHAP in component correction_factors (dimensionless). * ALGEBRAIC[113] is Navg_DHAP in component correction_factors (dimensionless). * ALGEBRAIC[114] is dNavgDHAPdH in component correction_factors (per_molar). * ALGEBRAIC[115] is dNavgDHAPdmg in component correction_factors (per_molar). * ALGEBRAIC[116] is dmgDHAPdmg in component correction_factors (per_molar). * ALGEBRAIC[117] is dmgDHAPdpH in component correction_factors (dimensionless). * CONSTANTS[221] is NH_UDHAP in component correction_factors (dimensionless). * CONSTANTS[222] is deltaGof_UDHAP in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[118] is deltaGpof_UDHAP in component correction_factors (kilojoule_per_mole). * CONSTANTS[223] is pKa1_13DPG in component correction_factors (dimensionless). * ALGEBRAIC[119] is P_13DPG in component correction_factors (dimensionless). * ALGEBRAIC[120] is U13DPG in component correction_factors (dimensionless). * ALGEBRAIC[121] is H13DPG in component correction_factors (dimensionless). * ALGEBRAIC[122] is Navg_13DPG in component correction_factors (dimensionless). * ALGEBRAIC[123] is dNavg13DPGdH in component correction_factors (per_molar). * CONSTANTS[30] is dNavg13DPGdmg in component correction_factors (per_molar). * CONSTANTS[224] is NH_U13DPG in component correction_factors (dimensionless). * CONSTANTS[225] is deltaGof_U13DPG in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[124] is deltaGpof_U13DPG in component correction_factors (kilojoule_per_mole). * CONSTANTS[226] is pKa1_3PG in component correction_factors (dimensionless). * ALGEBRAIC[125] is P_3PG in component correction_factors (dimensionless). * ALGEBRAIC[126] is U3PG in component correction_factors (dimensionless). * ALGEBRAIC[127] is H3PG in component correction_factors (dimensionless). * ALGEBRAIC[128] is Navg_3PG in component correction_factors (dimensionless). * ALGEBRAIC[129] is dNavg3PGdH in component correction_factors (per_molar). * CONSTANTS[31] is dNavg3PGdmg in component correction_factors (per_molar). * CONSTANTS[227] is NH_U3PG in component correction_factors (dimensionless). * CONSTANTS[228] is deltaGof_U3PG in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[130] is deltaGpof_U3PG in component correction_factors (kilojoule_per_mole). * CONSTANTS[229] is pKa1_2PG in component correction_factors (dimensionless). * CONSTANTS[230] is pKamg_2PG in component correction_factors (dimensionless). * CONSTANTS[231] is pKak_2PG in component correction_factors (dimensionless). * ALGEBRAIC[131] is P_2PG in component correction_factors (dimensionless). * ALGEBRAIC[132] is U2PG in component correction_factors (dimensionless). * ALGEBRAIC[133] is H2PG in component correction_factors (dimensionless). * ALGEBRAIC[135] is mg2PG in component correction_factors (dimensionless). * ALGEBRAIC[134] is k2PG in component correction_factors (dimensionless). * ALGEBRAIC[136] is Navg_2PG in component correction_factors (dimensionless). * ALGEBRAIC[137] is dNavg2PGdH in component correction_factors (per_molar). * ALGEBRAIC[138] is dNavg2PGdmg in component correction_factors (per_molar). * ALGEBRAIC[139] is dmg2PGdmg in component correction_factors (per_molar). * ALGEBRAIC[140] is dmg2PGdpH in component correction_factors (dimensionless). * CONSTANTS[232] is NH_U2PG in component correction_factors (dimensionless). * CONSTANTS[233] is deltaGof_U2PG in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[141] is deltaGpof_U2PG in component correction_factors (kilojoule_per_mole). * CONSTANTS[234] is pKa1_PEP in component correction_factors (dimensionless). * CONSTANTS[235] is pKamg_PEP in component correction_factors (dimensionless). * CONSTANTS[236] is pKak_PEP in component correction_factors (dimensionless). * ALGEBRAIC[142] is P_PEP in component correction_factors (dimensionless). * ALGEBRAIC[143] is UPEP in component correction_factors (dimensionless). * ALGEBRAIC[144] is HPEP in component correction_factors (dimensionless). * ALGEBRAIC[145] is kPEP in component correction_factors (dimensionless). * ALGEBRAIC[146] is mgPEP in component correction_factors (dimensionless). * ALGEBRAIC[147] is Navg_PEP in component correction_factors (dimensionless). * ALGEBRAIC[148] is dNavgPEPdH in component correction_factors (per_molar). * ALGEBRAIC[149] is dNavgPEPdmg in component correction_factors (per_molar). * ALGEBRAIC[150] is dmgPEPdmg in component correction_factors (per_molar). * ALGEBRAIC[151] is dmgPEPdpH in component correction_factors (dimensionless). * CONSTANTS[237] is NH_UPEP in component correction_factors (dimensionless). * CONSTANTS[238] is deltaGof_UPEP in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[152] is deltaGpof_UPEP in component correction_factors (kilojoule_per_mole). * CONSTANTS[239] is pKa1_PYR in component correction_factors (dimensionless). * ALGEBRAIC[153] is P_PYR in component correction_factors (dimensionless). * ALGEBRAIC[154] is UPYR in component correction_factors (dimensionless). * ALGEBRAIC[155] is HPYR in component correction_factors (dimensionless). * ALGEBRAIC[156] is Navg_PYR in component correction_factors (dimensionless). * ALGEBRAIC[157] is dNavgPYRdH in component correction_factors (per_molar). * CONSTANTS[32] is dNavgPYRdmg in component correction_factors (per_molar). * CONSTANTS[240] is NH_UPYR in component correction_factors (dimensionless). * CONSTANTS[241] is deltaGof_UPYR in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[158] is deltaGpof_UPYR in component correction_factors (kilojoule_per_mole). * CONSTANTS[242] is pKamg_LAC in component correction_factors (dimensionless). * CONSTANTS[243] is deltaH1o_LAC in component correction_factors (kilojoule_per_mole). * CONSTANTS[244] is deltaH1_LAC in component correction_factors (kilojoule_per_mole). * CONSTANTS[245] is pKa1_LAC in component correction_factors (dimensionless). * ALGEBRAIC[159] is P_LAC in component correction_factors (dimensionless). * ALGEBRAIC[160] is ULAC in component correction_factors (dimensionless). * ALGEBRAIC[161] is HLAC in component correction_factors (dimensionless). * ALGEBRAIC[162] is mgLAC in component correction_factors (dimensionless). * ALGEBRAIC[163] is Navg_LAC in component correction_factors (dimensionless). * ALGEBRAIC[164] is dNavgLACdH in component correction_factors (per_molar). * ALGEBRAIC[165] is dNavgLACdmg in component correction_factors (per_molar). * ALGEBRAIC[166] is dmgLACdmg in component correction_factors (per_molar). * ALGEBRAIC[167] is dmgLACdpH in component correction_factors (dimensionless). * CONSTANTS[246] is NH_ULAC in component correction_factors (dimensionless). * CONSTANTS[247] is deltaGof_ULAC in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[168] is deltaGpof_ULAC in component correction_factors (kilojoule_per_mole). * CONSTANTS[248] is dNH_GLY in component correction_factors (dimensionless). * ALGEBRAIC[169] is deltaGpo_GLY in component correction_factors (kilojoule_per_mole). * CONSTANTS[249] is NH_NAD in component correction_factors (dimensionless). * CONSTANTS[250] is deltaGof_NAD in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[170] is deltaGpof_NAD in component correction_factors (kilojoule_per_mole). * CONSTANTS[251] is NH_NADH in component correction_factors (dimensionless). * CONSTANTS[252] is deltaGof_NADH in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[171] is deltaGpof_NADH in component correction_factors (kilojoule_per_mole). * CONSTANTS[253] is NH_H2O in component correction_factors (dimensionless). * CONSTANTS[254] is deltaGof_H2O in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[172] is deltaGpof_H2O in component correction_factors (kilojoule_per_mole). * CONSTANTS[255] is NH_H in component correction_factors (dimensionless). * CONSTANTS[256] is deltaGof_H in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[173] is deltaGpof_H in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[174] is deltaH_CK in component correction_factors (dimensionless). * CONSTANTS[257] is Kref_CK in component correction_factors (dimensionless). * CONSTANTS[258] is deltaHo_CKo in component correction_factors (kilojoule_per_mole). * CONSTANTS[259] is deltaH1_CK in component correction_factors (kilojoule_per_mole). * CONSTANTS[260] is Kref_CKI in component correction_factors (dimensionless). * CONSTANTS[261] is Kref_CKT in component correction_factors (dimensionless). * CONSTANTS[262] is deltaGpo_CK in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[176] is Kapp_CK in component correction_factors (dimensionless). * ALGEBRAIC[178] is deltaH_ADK in component correction_factors (dimensionless). * ALGEBRAIC[179] is deltaGpo_ADK in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[180] is Kapp_ADK in component correction_factors (dimensionless). * ALGEBRAIC[181] is deltaH_GP in component correction_factors (dimensionless). * ALGEBRAIC[182] is deltaGpo_GP in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[183] is Kapp_GP in component correction_factors (dimensionless). * ALGEBRAIC[184] is deltaH_PGLM in component correction_factors (dimensionless). * ALGEBRAIC[185] is deltaGpo_PGLM in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[186] is Kapp_PGLM in component correction_factors (dimensionless). * ALGEBRAIC[187] is deltaH_PGI in component correction_factors (dimensionless). * ALGEBRAIC[188] is deltaGpo_PGI in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[189] is Kapp_PGI in component correction_factors (dimensionless). * ALGEBRAIC[190] is deltaH_PFK in component correction_factors (dimensionless). * ALGEBRAIC[191] is deltaGpo_PFK in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[192] is Kapp_PFK in component correction_factors (dimensionless). * ALGEBRAIC[193] is deltaH_ALD in component correction_factors (dimensionless). * ALGEBRAIC[194] is deltaGpo_ALD in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[195] is Kapp_ALD in component correction_factors (molar). * ALGEBRAIC[196] is deltaH_TPI in component correction_factors (dimensionless). * ALGEBRAIC[197] is deltaGpo_TPI in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[198] is Kapp_TPI in component correction_factors (dimensionless). * ALGEBRAIC[199] is deltaH_GAPDH in component correction_factors (dimensionless). * ALGEBRAIC[200] is deltaGpo_GAPDH in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[201] is Kapp_GAPDH in component correction_factors (per_molar). * ALGEBRAIC[202] is deltaH_G3PDH in component correction_factors (dimensionless). * ALGEBRAIC[203] is deltaGpo_G3PDH in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[204] is Kapp_G3PDH in component correction_factors (dimensionless). * ALGEBRAIC[205] is deltaH_PGK in component correction_factors (dimensionless). * ALGEBRAIC[206] is deltaGpo_PGK in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[207] is Kapp_PGK in component correction_factors (dimensionless). * ALGEBRAIC[208] is deltaH_PGM in component correction_factors (dimensionless). * ALGEBRAIC[209] is deltaGpo_PGM in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[210] is Kapp_PGM in component correction_factors (dimensionless). * ALGEBRAIC[211] is deltaH_ENOL in component correction_factors (dimensionless). * ALGEBRAIC[212] is deltaGpo_ENOL in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[213] is Kapp_ENOL in component correction_factors (dimensionless). * ALGEBRAIC[214] is deltaH_PK in component correction_factors (dimensionless). * ALGEBRAIC[215] is deltaGpo_PK in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[216] is Kapp_PK in component correction_factors (dimensionless). * ALGEBRAIC[217] is deltaH_LDH in component correction_factors (dimensionless). * ALGEBRAIC[218] is deltaGpo_LDH in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[219] is Kapp_LDH in component correction_factors (dimensionless). * ALGEBRAIC[30] is deltaH_ATPase in component correction_factors (dimensionless). * ALGEBRAIC[175] is deltaGpo_ATPase in component correction_factors (kilojoule_per_mole). * ALGEBRAIC[177] is Kapp_ATPase in component correction_factors (dimensionless). * STATES[1] is Mg in component differential_equations (molar). * CONSTANTS[263] is Vfgly in component glycogen_phosphorylase (molar_per_minute). * CONSTANTS[38] is expno in component glycogen_phosphorylase (dimensionless). * ALGEBRAIC[220] is fracA in component glycogen_phosphorylase (dimensionless). * CONSTANTS[39] is KgpA_glyf in component glycogen_phosphorylase (molar). * CONSTANTS[264] is KgpA_pi in component glycogen_phosphorylase (molar). * CONSTANTS[265] is KgpA_igly in component glycogen_phosphorylase (molar). * CONSTANTS[40] is KgpA_ipi in component glycogen_phosphorylase (molar). * CONSTANTS[266] is KgpA_glyb in component glycogen_phosphorylase (molar). * CONSTANTS[41] is KgpA_g1p in component glycogen_phosphorylase (molar). * CONSTANTS[267] is KgpA_ig1p in component glycogen_phosphorylase (molar). * ALGEBRAIC[221] is Dglya in component glycogen_phosphorylase (dimensionless). * ALGEBRAIC[222] is pa in component glycogen_phosphorylase (dimensionless). * ALGEBRAIC[223] is VbglyA in component glycogen_phosphorylase (molar_per_minute). * ALGEBRAIC[224] is glyAF in component glycogen_phosphorylase (per_minute). * ALGEBRAIC[225] is glyAR in component glycogen_phosphorylase (per_minute). * ALGEBRAIC[226] is flux_GPa in component glycogen_phosphorylase (molar_per_minute). * STATES[2] is G1P in component differential_equations (molar). * STATES[3] is Pi in component differential_equations (molar). * STATES[4] is Gly in component differential_equations (molar). * ALGEBRAIC[227] is fracB in component glycogen_phosphorylase_B (dimensionless). * CONSTANTS[268] is KgpB_pi in component glycogen_phosphorylase_B (molar). * CONSTANTS[42] is KgpB_ipi in component glycogen_phosphorylase_B (molar). * CONSTANTS[269] is KgpB_iglyf in component glycogen_phosphorylase_B (molar). * CONSTANTS[270] is KgpB_g1p in component glycogen_phosphorylase_B (molar). * CONSTANTS[43] is KgpB_ig1p in component glycogen_phosphorylase_B (molar). * CONSTANTS[271] is KgpB_iglyb in component glycogen_phosphorylase_B (molar). * CONSTANTS[44] is Kgp_amp in component glycogen_phosphorylase_B (molar). * CONSTANTS[45] is interactioncoeff in component glycogen_phosphorylase_B (dimensionless). * CONSTANTS[46] is nH in component glycogen_phosphorylase_B (dimensionless). * ALGEBRAIC[228] is M in component glycogen_phosphorylase_B (dimensionless). * ALGEBRAIC[229] is Dglyb in component glycogen_phosphorylase_B (dimensionless). * ALGEBRAIC[230] is pb in component glycogen_phosphorylase_B (dimensionless). * ALGEBRAIC[231] is VbglyB in component glycogen_phosphorylase_B (molar_per_minute). * ALGEBRAIC[232] is glyBF in component glycogen_phosphorylase_B (per_minute). * ALGEBRAIC[233] is glyBR in component glycogen_phosphorylase_B (per_minute). * ALGEBRAIC[234] is flux_GPb in component glycogen_phosphorylase_B (molar_per_minute). * STATES[5] is AMP in component differential_equations (molar). * CONSTANTS[272] is Vffpglm in component PGLM (molar_per_minute). * CONSTANTS[273] is Kpglm_g1p in component PGLM (molar). * CONSTANTS[274] is Kpglm_g6p in component PGLM (molar). * ALGEBRAIC[235] is Vfpglm in component PGLM (molar_per_minute). * ALGEBRAIC[237] is Vbpglm in component PGLM (molar_per_minute). * ALGEBRAIC[238] is v_PGLM in component PGLM (molar_per_minute). * STATES[6] is G6P in component differential_equations (molar). * CONSTANTS[275] is Vbbpgi in component PGI (molar_per_minute). * CONSTANTS[276] is Kpgi_g6p in component PGI (molar). * CONSTANTS[277] is Kpgi_f6p in component PGI (molar). * ALGEBRAIC[239] is Vbpgi in component PGI (molar_per_minute). * ALGEBRAIC[240] is Vfpgi in component PGI (molar_per_minute). * ALGEBRAIC[241] is v_PGI in component PGI (molar_per_minute). * STATES[7] is F6P in component differential_equations (molar). * CONSTANTS[278] is Vffpfk in component PFK (molar_per_minute). * CONSTANTS[279] is Kpfk_f6p in component PFK (molar). * CONSTANTS[280] is Kpfk_f6pT in component PFK (molar). * CONSTANTS[281] is Kpfk_atp in component PFK (molar). * CONSTANTS[283] is Kpfk_atpT in component PFK (molar). * CONSTANTS[282] is Kpfk_fbp in component PFK (molar). * CONSTANTS[47] is Kpfk_fbpT in component PFK (molar). * CONSTANTS[284] is Kpfk_adp in component PFK (molar). * CONSTANTS[48] is Kpfk_adpT in component PFK (molar). * CONSTANTS[49] is Kpfki in component PFK (molar). * CONSTANTS[50] is Kmpfk in component PFK (molar). * CONSTANTS[51] is d in component PFK (dimensionless). * CONSTANTS[52] is e_ in component PFK (dimensionless). * CONSTANTS[53] is Lo in component PFK (dimensionless). * ALGEBRAIC[242] is Vfpfk in component PFK (molar_per_minute). * ALGEBRAIC[244] is Vbpfk in component PFK (molar_per_minute). * ALGEBRAIC[245] is L in component PFK (dimensionless). * CONSTANTS[285] is alpha in component PFK (dimensionless). * ALGEBRAIC[246] is Delta in component PFK (dimensionless). * ALGEBRAIC[247] is Deltap in component PFK (dimensionless). * ALGEBRAIC[248] is v_PFK in component PFK (molar_per_minute). * STATES[8] is FBP in component differential_equations (molar). * STATES[9] is ADP in component differential_equations (molar). * STATES[10] is ATP in component differential_equations (molar). * CONSTANTS[286] is Vffald in component ALD (molar_per_minute). * CONSTANTS[287] is Kald_fbp in component ALD (molar). * CONSTANTS[288] is Kald_dhap in component ALD (molar). * CONSTANTS[289] is Kald_gap in component ALD (molar). * ALGEBRAIC[249] is Vfald in component ALD (molar_per_minute). * ALGEBRAIC[251] is Vbald in component ALD (molar_per_minute). * ALGEBRAIC[252] is v_ALD in component ALD (molar_per_minute). * STATES[11] is DHAP in component differential_equations (molar). * STATES[12] is GAP in component differential_equations (molar). * CONSTANTS[290] is Vfftpi in component TPI (molar_per_minute). * CONSTANTS[291] is Ktpi_gap in component TPI (molar). * CONSTANTS[292] is Ktpi_dhap in component TPI (molar). * CONSTANTS[293] is Vftpi in component TPI (molar_per_minute). * ALGEBRAIC[253] is Vbtpi in component TPI (molar_per_minute). * ALGEBRAIC[254] is v_TPI in component TPI (molar_per_minute). * CONSTANTS[294] is Vbbg3pdh in component G3PDH (molar_per_minute). * CONSTANTS[295] is Kg3pdh_g3p in component G3PDH (molar). * CONSTANTS[296] is Kg3pdh_nad in component G3PDH (molar). * CONSTANTS[297] is Kg3pdh_dhap in component G3PDH (molar). * CONSTANTS[298] is Kg3pdh_nadh in component G3PDH (molar). * ALGEBRAIC[255] is Dg3pdh in component G3PDH (dimensionless). * CONSTANTS[299] is Vbg3pdh in component G3PDH (molar_per_minute). * ALGEBRAIC[256] is Vfg3pdh in component G3PDH (molar_per_minute). * ALGEBRAIC[257] is v_G3PDH in component G3PDH (molar_per_minute). * STATES[13] is G3P in component differential_equations (molar). * STATES[14] is NAD in component differential_equations (molar). * STATES[15] is NADH in component differential_equations (molar). * CONSTANTS[300] is Vffgad in component GAPDH (molar_per_minute). * CONSTANTS[301] is Kgapdh_gap in component GAPDH (molar). * CONSTANTS[302] is Kgapdh_nad in component GAPDH (molar). * CONSTANTS[303] is Kgapdh_pi in component GAPDH (molar). * CONSTANTS[304] is Kgapdh_bpg in component GAPDH (molar). * CONSTANTS[305] is Kgapdh_nadh in component GAPDH (molar). * ALGEBRAIC[258] is Dgap in component GAPDH (dimensionless). * ALGEBRAIC[259] is Vfgad in component GAPDH (molar_per_minute). * ALGEBRAIC[260] is Vbgad in component GAPDH (molar_per_minute). * ALGEBRAIC[261] is v_GAPDH in component GAPDH (molar_per_minute). * STATES[16] is BPG in component differential_equations (molar). * CONSTANTS[306] is Vbbpgk in component PGK (molar_per_minute). * CONSTANTS[307] is Kpgk_bpg in component PGK (molar). * CONSTANTS[308] is Kpgk_adp in component PGK (molar). * CONSTANTS[309] is Kpgk_3pg in component PGK (molar). * CONSTANTS[310] is Kpgk_atp in component PGK (molar). * CONSTANTS[311] is Vbpgk in component PGK (molar_per_minute). * ALGEBRAIC[262] is Vfpgk in component PGK (molar_per_minute). * ALGEBRAIC[264] is D_PGK in component PGK (dimensionless). * ALGEBRAIC[265] is v_PGK in component PGK (molar_per_minute). * STATES[17] is P3G in component differential_equations (molar). * CONSTANTS[312] is Vffpgm in component PGM (molar_per_minute). * CONSTANTS[313] is Kpgm_3pg in component PGM (molar). * CONSTANTS[314] is Kpgm_2pg in component PGM (molar). * ALGEBRAIC[266] is Vfpgm in component PGM (molar_per_minute). * ALGEBRAIC[268] is Vbpgm in component PGM (molar_per_minute). * ALGEBRAIC[269] is v_PGM in component PGM (molar_per_minute). * STATES[18] is P2G in component differential_equations (molar). * CONSTANTS[315] is Vffen in component ENOL (molar_per_minute). * CONSTANTS[316] is Ken_2pg in component ENOL (molar). * CONSTANTS[317] is Ken_pep in component ENOL (molar). * CONSTANTS[318] is Vfen in component ENOL (molar_per_minute). * ALGEBRAIC[270] is Vben in component ENOL (molar_per_minute). * ALGEBRAIC[272] is v_ENOL in component ENOL (molar_per_minute). * STATES[19] is PEP in component differential_equations (molar). * CONSTANTS[319] is Vffpk in component PK (molar_per_minute). * CONSTANTS[320] is Kpk_pep in component PK (molar). * CONSTANTS[321] is Kpk_adp in component PK (molar). * CONSTANTS[322] is Kpk_pyr in component PK (molar). * CONSTANTS[323] is Kpk_atp in component PK (molar). * ALGEBRAIC[273] is Vfpk in component PK (molar_per_minute). * ALGEBRAIC[274] is Vbpk in component PK (molar_per_minute). * ALGEBRAIC[275] is v_PK in component PK (molar_per_minute). * STATES[20] is PYR in component differential_equations (molar). * CONSTANTS[324] is Vffldh in component LDH (molar_per_minute). * CONSTANTS[325] is Kldh_pyr in component LDH (molar). * CONSTANTS[326] is Kldh_nadh in component LDH (molar). * CONSTANTS[327] is Kldh_lac in component LDH (molar). * CONSTANTS[328] is Kldh_nad in component LDH (molar). * ALGEBRAIC[276] is Vfldh in component LDH (molar_per_minute). * ALGEBRAIC[277] is Vbldh in component LDH (molar_per_minute). * ALGEBRAIC[278] is v_LDH in component LDH (molar_per_minute). * STATES[21] is LAC in component differential_equations (molar). * ALGEBRAIC[279] is VmaxATPase in component ATPase (molar_per_minute). * CONSTANTS[54] is Katp_ATPase in component ATPase (molar). * ALGEBRAIC[284] is ATPase in component ATPase (molar_per_minute). * CONSTANTS[329] is VforCK in component creatine_kinase (molar_per_minute). * CONSTANTS[330] is Kck_pcr in component creatine_kinase (molar). * CONSTANTS[331] is Kck_iatp in component creatine_kinase (molar). * CONSTANTS[332] is Kck_iadp in component creatine_kinase (molar). * CONSTANTS[55] is Kck_ipcr in component creatine_kinase (molar). * CONSTANTS[333] is Kck_cr in component creatine_kinase (molar). * ALGEBRAIC[285] is VrevCK in component creatine_kinase (molar_per_minute). * ALGEBRAIC[286] is CK in component creatine_kinase (molar_per_minute). * STATES[22] is Cr in component differential_equations (molar). * STATES[23] is PCr in component differential_equations (molar). * CONSTANTS[334] is Vfadk in component adenylate_kinase (molar_per_minute). * CONSTANTS[335] is Kadk_amp in component adenylate_kinase (molar). * CONSTANTS[336] is Kadk_atp in component adenylate_kinase (molar). * CONSTANTS[337] is Kadk_adp in component adenylate_kinase (molar). * ALGEBRAIC[287] is Vbadk in component adenylate_kinase (molar_per_minute). * ALGEBRAIC[290] is ADK in component adenylate_kinase (molar_per_minute). * CONSTANTS[338] is carnosine in component buffer_capacity (molar). * CONSTANTS[339] is tris in component buffer_capacity (molar). * CONSTANTS[340] is acetate in component buffer_capacity (molar). * ALGEBRAIC[291] is bufcapfixed in component buffer_capacity (molar). * ALGEBRAIC[292] is bufcapmetab in component buffer_capacity (molar). * ALGEBRAIC[293] is protons_consumed in component buffer_capacity (molar_per_minute). * ALGEBRAIC[288] is CKprtflux in component buffer_capacity (molar_per_minute). * ALGEBRAIC[280] is glycprtflux in component buffer_capacity (molar_per_minute). * ALGEBRAIC[294] is pHODEterm1 in component buffer_capacity (per_minute). * ALGEBRAIC[295] is pHODEterm2 in component buffer_capacity (per_molar). * ALGEBRAIC[296] is denom_mgODE in component buffer_capacity (dimensionless). * ALGEBRAIC[297] is RHSterm1_mgODE in component buffer_capacity (molar). * ALGEBRAIC[298] is denomMgpHODE in component buffer_capacity (dimensionless). * ALGEBRAIC[311] is RHSterm2_mgODE in component differential_equations (molar_per_minute). * CONSTANTS[33] is fixmg in component differential_equations (dimensionless). * CONSTANTS[341] is fixpH in component differential_equations (dimensionless). * STATES[24] is protonload in component differential_equations (molar). * ALGEBRAIC[300] is dATPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[301] is dADPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[302] is dAMPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[306] is dDHAPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[305] is dFBPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[304] is dG1Pdt in component differential_equations (molar_per_minute). * ALGEBRAIC[307] is dG3Pdt in component differential_equations (molar_per_minute). * ALGEBRAIC[310] is dLACdt in component differential_equations (molar_per_minute). * ALGEBRAIC[308] is dP2Gdt in component differential_equations (molar_per_minute). * ALGEBRAIC[299] is dPCrdt in component differential_equations (molar_per_minute). * ALGEBRAIC[309] is dPEPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[303] is dPidt in component differential_equations (molar_per_minute). * ALGEBRAIC[289] is dCrdt in component differential_equations (molar_per_minute). * ALGEBRAIC[281] is dNADdt in component differential_equations (molar_per_minute). * ALGEBRAIC[282] is dNADHdt in component differential_equations (molar_per_minute). * ALGEBRAIC[236] is dGlydt in component differential_equations (molar_per_minute). * ALGEBRAIC[243] is dG6Pdt in component differential_equations (molar_per_minute). * ALGEBRAIC[250] is dF6Pdt in component differential_equations (molar_per_minute). * ALGEBRAIC[263] is dGAPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[267] is dBGPdt in component differential_equations (molar_per_minute). * ALGEBRAIC[271] is dP3Gdt in component differential_equations (molar_per_minute). * ALGEBRAIC[283] is dPYRdt in component differential_equations (molar_per_minute). * RATES[23] is d/dt PCr in component differential_equations (molar). * RATES[22] is d/dt Cr in component differential_equations (molar). * RATES[14] is d/dt NAD in component differential_equations (molar). * RATES[15] is d/dt NADH in component differential_equations (molar). * RATES[10] is d/dt ATP in component differential_equations (molar). * RATES[9] is d/dt ADP in component differential_equations (molar). * RATES[5] is d/dt AMP in component differential_equations (molar). * RATES[3] is d/dt Pi in component differential_equations (molar). * RATES[4] is d/dt Gly in component differential_equations (molar). * RATES[2] is d/dt G1P in component differential_equations (molar). * RATES[6] is d/dt G6P in component differential_equations (molar). * RATES[7] is d/dt F6P in component differential_equations (molar). * RATES[8] is d/dt FBP in component differential_equations (molar). * RATES[11] is d/dt DHAP in component differential_equations (molar). * RATES[13] is d/dt G3P in component differential_equations (molar). * RATES[12] is d/dt GAP in component differential_equations (molar). * RATES[16] is d/dt BPG in component differential_equations (molar). * RATES[17] is d/dt P3G in component differential_equations (molar). * RATES[18] is d/dt P2G in component differential_equations (molar). * RATES[19] is d/dt PEP in component differential_equations (molar). * RATES[20] is d/dt PYR in component differential_equations (molar). * RATES[21] is d/dt LAC in component differential_equations (molar). * RATES[1] is d/dt Mg in component differential_equations (molar). * RATES[0] is d/dt pH_calc in component differential_equations (dimensionless). * RATES[24] is d/dt protonload in component differential_equations (molar). */ void initConsts(double* CONSTANTS, double* RATES, double *STATES) { STATES[0] = 7.8; CONSTANTS[0] = 8.314e-3; CONSTANTS[1] = 298.15; STATES[1] = 5.132658807e-4; STATES[2] = 1e-9; STATES[3] = 0.03; STATES[4] = 0.04; STATES[5] = 1e-9; STATES[6] = 1e-9; STATES[7] = 1e-9; STATES[8] = 1e-9; STATES[9] = 1e-9; STATES[10] = 0.005; STATES[11] = 1e-9; STATES[12] = 1e-9; STATES[13] = 1e-9; STATES[14] = 0.0005; STATES[15] = 1e-9; STATES[16] = 1e-9; STATES[17] = 1e-9; STATES[18] = 1e-9; STATES[19] = 1e-9; STATES[20] = 1e-9; STATES[21] = 1e-9; STATES[22] = 0.029999999; STATES[23] = 1e-9; STATES[24] = 0; CONSTANTS[2] = 1.00000; CONSTANTS[3] = 7.40000; CONSTANTS[4] = 0.0500000; CONSTANTS[5] = 0.400000; CONSTANTS[6] = 0.00170000; CONSTANTS[7] = 0.00470000; CONSTANTS[8] = 0.00270000; CONSTANTS[9] = 0.00460000; CONSTANTS[10] = 0.00740000; CONSTANTS[11] = 0.00266055; CONSTANTS[12] = 0.0200000; CONSTANTS[13] = 1.75052; CONSTANTS[14] = 0.00402000; CONSTANTS[15] = 0.00270000; CONSTANTS[16] = 0.000870000; CONSTANTS[17] = 6.00000e-05; CONSTANTS[18] = 0.0100000; CONSTANTS[19] = 0.0100000; CONSTANTS[20] = 13.0000; CONSTANTS[21] = 0.00390000; CONSTANTS[22] = 0.00000; CONSTANTS[23] = 0.000100000; CONSTANTS[24] = 0.00500000; CONSTANTS[25] = 29.0000; CONSTANTS[26] = 0.00000; CONSTANTS[27] = 0.00000; CONSTANTS[28] = 0.00000; CONSTANTS[29] = 0.00000; CONSTANTS[30] = 0.00000; CONSTANTS[31] = 0.00000; CONSTANTS[32] = 0.00000; CONSTANTS[33] = 1.00000; CONSTANTS[34] = CONSTANTS[2]; CONSTANTS[35] = CONSTANTS[3]; CONSTANTS[36] = 0.00400000; CONSTANTS[37] = CONSTANTS[24]; CONSTANTS[38] = CONSTANTS[25]; CONSTANTS[39] = CONSTANTS[6]; CONSTANTS[40] = CONSTANTS[7]; CONSTANTS[41] = CONSTANTS[8]; CONSTANTS[42] = CONSTANTS[9]; CONSTANTS[43] = CONSTANTS[10]; CONSTANTS[44] = CONSTANTS[11]; CONSTANTS[45] = CONSTANTS[12]; CONSTANTS[46] = CONSTANTS[13]; CONSTANTS[47] = CONSTANTS[14]; CONSTANTS[48] = CONSTANTS[15]; CONSTANTS[49] = CONSTANTS[16]; CONSTANTS[50] = CONSTANTS[17]; CONSTANTS[51] = CONSTANTS[18]; CONSTANTS[52] = CONSTANTS[19]; CONSTANTS[53] = CONSTANTS[20]; CONSTANTS[54] = CONSTANTS[23]; CONSTANTS[55] = CONSTANTS[21]; CONSTANTS[56] = 0.00200000/1.50000; CONSTANTS[57] = 0.000150000; CONSTANTS[58] = 0.0101000; CONSTANTS[59] = 0.000200000; CONSTANTS[60] = 0.0150000; CONSTANTS[61] = 0.00150000; CONSTANTS[62] = 0.00440000; CONSTANTS[63] = 0.480000; CONSTANTS[64] = 6.30000e-05; CONSTANTS[65] = 3.00000e-05; CONSTANTS[66] = 0.880000; CONSTANTS[67] = 0.000480000; CONSTANTS[68] = 0.000119000; CONSTANTS[69] = 0.0560000; CONSTANTS[70] = 0.000180000; CONSTANTS[71] = 0.0200000; CONSTANTS[72] = 8.00000e-05; CONSTANTS[73] = 0.000250000; CONSTANTS[74] = 0.00402000; CONSTANTS[75] = 0.00270000; CONSTANTS[76] = 0.0106591; CONSTANTS[77] = 5.00000e-05; CONSTANTS[78] = 0.00200000; CONSTANTS[79] = 0.00100000; CONSTANTS[80] = 12.0000; CONSTANTS[81] = 0.000320000; CONSTANTS[82] = 0.000610000; CONSTANTS[83] = 0.0825000; CONSTANTS[84] = 0.000180000; CONSTANTS[85] = 1.20000e-05; CONSTANTS[86] = 0.000220000; CONSTANTS[87] = 8.00000e-06; CONSTANTS[88] = 1.26500; CONSTANTS[89] = 2.50000e-06; CONSTANTS[90] = 9.00000e-05; CONSTANTS[91] = 0.000290000; CONSTANTS[92] = 8.00000e-07; CONSTANTS[93] = 3.30000e-06; CONSTANTS[94] = 1.12000; CONSTANTS[95] = 0.00200000; CONSTANTS[96] = 8.00000e-06; CONSTANTS[97] = 0.00120000; CONSTANTS[98] = 0.000350000; CONSTANTS[99] = 1.12000; CONSTANTS[100] = 0.000200000; CONSTANTS[101] = 1.40000e-05; CONSTANTS[102] = 0.192000; CONSTANTS[103] = 0.000100000; CONSTANTS[104] = 0.000370000; CONSTANTS[105] = 1.44000; CONSTANTS[106] = 8.00000e-05; CONSTANTS[107] = 0.000300000; CONSTANTS[108] = 0.00705000; CONSTANTS[109] = 0.00113000; CONSTANTS[110] = 1.92000; CONSTANTS[111] = 0.000335000; CONSTANTS[112] = 2.00000e-06; CONSTANTS[113] = 0.0170000; CONSTANTS[114] = 0.000849000; CONSTANTS[115] = 0.500000; CONSTANTS[116] = 0.00111000; CONSTANTS[117] = 0.00350000; CONSTANTS[118] = 0.000135000; CONSTANTS[119] = 0.00380000; CONSTANTS[120] = 0.880000; CONSTANTS[121] = 0.000320000; CONSTANTS[122] = 0.000270000; CONSTANTS[123] = 0.000350000; CONSTANTS[124] = 0.100000; CONSTANTS[125] = CONSTANTS[124]; CONSTANTS[126] = 0.0150000; CONSTANTS[127] = 0.0250000; CONSTANTS[128] = 0.0100000; CONSTANTS[129] = 303.150; CONSTANTS[130] = CONSTANTS[129]; CONSTANTS[131] = 0.0800000; CONSTANTS[132] = 1.00000; CONSTANTS[133] = CONSTANTS[131]; CONSTANTS[134] = 1.00000; CONSTANTS[135] = 1.47750; CONSTANTS[136] = 1.60000; CONSTANTS[137] = ( CONSTANTS[135]* pow(CONSTANTS[125], 1.0 / 2))/(1.00000+ CONSTANTS[136]* pow(CONSTANTS[125], 1.0 / 2)); CONSTANTS[138] = 0.100000; CONSTANTS[139] = 1.17582; CONSTANTS[140] = ( 1.00000*CONSTANTS[139]*( pow(CONSTANTS[138], 1.0 / 2)/(1.00000+ CONSTANTS[136]* pow(CONSTANTS[138], 1.0 / 2)) - pow(CONSTANTS[125], 1.0 / 2)/(1.00000+ CONSTANTS[136]* pow(CONSTANTS[125], 1.0 / 2))))/log(10.0000); CONSTANTS[141] = (1.00000/CONSTANTS[130] - 1.00000/CONSTANTS[1])/( log(10.0000)*CONSTANTS[0]); CONSTANTS[142] = 2.91482; CONSTANTS[143] = ( CONSTANTS[142]* pow(CONSTANTS[125], 1.0 / 2))/(1.00000+ CONSTANTS[136]* pow(CONSTANTS[125], 1.0 / 2)); CONSTANTS[144] = 0.500000; CONSTANTS[145] = 3.00000; CONSTANTS[146] = - 2.90000; CONSTANTS[147] = CONSTANTS[145]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[148] = CONSTANTS[146]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[149] = 6.75000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[147]; CONSTANTS[150] = 1.65000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[148]; CONSTANTS[151] = 1.00000; CONSTANTS[152] = - 1096.10; CONSTANTS[153] = - 5.00000; CONSTANTS[154] = - 18.0000; CONSTANTS[155] = - 1.00000; CONSTANTS[156] = CONSTANTS[153]+ CONSTANTS[137]*((pow(4.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(3.00000, 2.00000)); CONSTANTS[157] = CONSTANTS[154]+ CONSTANTS[137]*((pow(4.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(2.00000, 2.00000)); CONSTANTS[158] = CONSTANTS[155]+ CONSTANTS[137]*((pow(4.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(3.00000, 2.00000)); CONSTANTS[159] = 6.48000+ (CONSTANTS[140]/1.00000)*((pow(4.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(3.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[156]; CONSTANTS[160] = 4.19000+ (CONSTANTS[140]/1.00000)*((pow(4.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(2.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[157]; CONSTANTS[161] = 1.17000+ (CONSTANTS[140]/1.00000)*((pow(4.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(3.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[158]; CONSTANTS[162] = 12.0000; CONSTANTS[163] = - 2768.10; CONSTANTS[164] = 1.00000; CONSTANTS[165] = - 3.00000; CONSTANTS[166] = - 15.0000; CONSTANTS[167] = CONSTANTS[165]+ CONSTANTS[137]*((pow(3.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(2.00000, 2.00000)); CONSTANTS[168] = CONSTANTS[166]+ CONSTANTS[137]*((pow(3.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[169] = 6.38000+ (CONSTANTS[140]/1.00000)*((pow(3.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(2.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[167]; CONSTANTS[170] = 3.25000+ (CONSTANTS[140]/1.00000)*((pow(3.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[168]; CONSTANTS[171] = 12.0000; CONSTANTS[172] = - 1906.13; CONSTANTS[173] = - 3.00000; CONSTANTS[174] = - 7.50000; CONSTANTS[175] = CONSTANTS[173]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[176] = CONSTANTS[174]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[177] = 6.29000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[175]; CONSTANTS[178] = 1.92000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[176]; CONSTANTS[179] = 12.0000; CONSTANTS[180] = - 1040.45; CONSTANTS[181] = 0.310000; CONSTANTS[182] = 2.66000; CONSTANTS[183] = 8.19000; CONSTANTS[184] = CONSTANTS[182]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[185] = CONSTANTS[183]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[186] = 4.50000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[184]; CONSTANTS[187] = 1.60000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[185]; CONSTANTS[188] = 8.00000; CONSTANTS[189] = 2.30000; CONSTANTS[190] = 9.00000; CONSTANTS[191] = - 1.70000; CONSTANTS[192] = - 12.0000; CONSTANTS[193] = CONSTANTS[191]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[194] = CONSTANTS[192]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[195] = 6.09000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[193]; CONSTANTS[196] = 2.48000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(2.00000, 2.00000)) - pow(0.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[194]; CONSTANTS[197] = 11.0000; CONSTANTS[198] = - 1756.87; CONSTANTS[199] = 6.11000; CONSTANTS[200] = 11.0000; CONSTANTS[201] = - 1763.94; CONSTANTS[202] = 5.89000; CONSTANTS[203] = 11.0000; CONSTANTS[204] = - 1760.80; CONSTANTS[205] = 6.40000; CONSTANTS[206] = 5.92000; CONSTANTS[207] = 2.70000; CONSTANTS[208] = 10.0000; CONSTANTS[209] = - 2601.40; CONSTANTS[210] = 6.45000; CONSTANTS[211] = 5.00000; CONSTANTS[212] = - 1288.60; CONSTANTS[213] = 1.63000; CONSTANTS[214] = - 3.10000; CONSTANTS[215] = CONSTANTS[214]+ CONSTANTS[137]*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000)); CONSTANTS[216] = 6.22000+ (CONSTANTS[140]/1.00000)*((pow(2.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(1.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[215]; CONSTANTS[217] = 7.00000; CONSTANTS[218] = - 1339.25; CONSTANTS[219] = 5.90000; CONSTANTS[220] = 1.57000; CONSTANTS[221] = 5.00000; CONSTANTS[222] = - 1296.26; CONSTANTS[223] = 7.50000; CONSTANTS[224] = 4.00000; CONSTANTS[225] = - 2356.14; CONSTANTS[226] = 6.21000; CONSTANTS[227] = 4.00000; CONSTANTS[228] = - 1502.54; CONSTANTS[229] = 7.00000; CONSTANTS[230] = 2.45000; CONSTANTS[231] = 1.18000; CONSTANTS[232] = 4.00000; CONSTANTS[233] = - 1496.38; CONSTANTS[234] = 6.35000; CONSTANTS[235] = 2.26000; CONSTANTS[236] = 1.08000; CONSTANTS[237] = 2.00000; CONSTANTS[238] = - 1263.65; CONSTANTS[239] = 2.49000; CONSTANTS[240] = 3.00000; CONSTANTS[241] = - 472.270; CONSTANTS[242] = 0.980000; CONSTANTS[243] = - 0.330000; CONSTANTS[244] = CONSTANTS[243]+ CONSTANTS[137]*((pow(1.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[245] = 3.67000+ (CONSTANTS[140]/1.00000)*((pow(1.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(0.00000, 2.00000))+ CONSTANTS[141]*CONSTANTS[244]; CONSTANTS[246] = 5.00000; CONSTANTS[247] = - 516.720; CONSTANTS[248] = - 10.0000; CONSTANTS[249] = 26.0000; CONSTANTS[250] = 0.00000; CONSTANTS[251] = 27.0000; CONSTANTS[252] = 22.6500; CONSTANTS[253] = 2.00000; CONSTANTS[254] = - 237.190; CONSTANTS[255] = 1.00000; CONSTANTS[256] = 0.00000; CONSTANTS[257] = 2.58000e+08; CONSTANTS[258] = - 17.5500; CONSTANTS[259] = CONSTANTS[258]+ CONSTANTS[137]*(((pow(2.00000, 2.00000)+pow(3.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(4.00000, 2.00000)) - pow(0.00000, 2.00000)); CONSTANTS[260] = exp(log(CONSTANTS[257])+( CONSTANTS[139]* pow(CONSTANTS[125], 1.0 / 2)*(((pow(2.00000, 2.00000)+pow(3.00000, 2.00000)+pow(1.00000, 2.00000)) - pow(4.00000, 2.00000)) - pow(0.00000, 2.00000)))/(1.00000+ CONSTANTS[136]* pow(CONSTANTS[125], 1.0 / 2))); CONSTANTS[261] = pow(10.0000, arbitrary_log(CONSTANTS[260], 10) - CONSTANTS[141]*CONSTANTS[259]); CONSTANTS[262] = - CONSTANTS[0]*CONSTANTS[130]*log(CONSTANTS[261]); CONSTANTS[263] = CONSTANTS[4]; CONSTANTS[264] = CONSTANTS[36]; CONSTANTS[265] = CONSTANTS[56]; CONSTANTS[266] = CONSTANTS[57]; CONSTANTS[267] = CONSTANTS[58]; CONSTANTS[268] = CONSTANTS[59]; CONSTANTS[269] = CONSTANTS[60]; CONSTANTS[270] = CONSTANTS[61]; CONSTANTS[271] = CONSTANTS[62]; CONSTANTS[272] = CONSTANTS[63]; CONSTANTS[273] = CONSTANTS[64]; CONSTANTS[274] = CONSTANTS[65]; CONSTANTS[275] = CONSTANTS[66]; CONSTANTS[276] = CONSTANTS[67]; CONSTANTS[277] = CONSTANTS[68]; CONSTANTS[278] = CONSTANTS[69]; CONSTANTS[279] = CONSTANTS[70]; CONSTANTS[280] = CONSTANTS[71]; CONSTANTS[281] = CONSTANTS[72]; CONSTANTS[282] = CONSTANTS[74]; CONSTANTS[283] = CONSTANTS[73]; CONSTANTS[284] = CONSTANTS[75]; CONSTANTS[285] = ( CONSTANTS[279]*CONSTANTS[281])/( CONSTANTS[280]*CONSTANTS[283]); CONSTANTS[286] = CONSTANTS[76]; CONSTANTS[287] = CONSTANTS[77]; CONSTANTS[288] = CONSTANTS[78]; CONSTANTS[289] = CONSTANTS[79]; CONSTANTS[290] = CONSTANTS[80]; CONSTANTS[291] = CONSTANTS[81]; CONSTANTS[292] = CONSTANTS[82]; CONSTANTS[293] = CONSTANTS[290]; CONSTANTS[294] = CONSTANTS[83]; CONSTANTS[295] = CONSTANTS[84]; CONSTANTS[296] = CONSTANTS[85]; CONSTANTS[297] = CONSTANTS[86]; CONSTANTS[298] = CONSTANTS[87]; CONSTANTS[299] = CONSTANTS[294]; CONSTANTS[300] = CONSTANTS[88]; CONSTANTS[301] = CONSTANTS[89]; CONSTANTS[302] = CONSTANTS[90]; CONSTANTS[303] = CONSTANTS[91]; CONSTANTS[304] = CONSTANTS[92]; CONSTANTS[305] = CONSTANTS[93]; CONSTANTS[306] = CONSTANTS[94]; CONSTANTS[307] = CONSTANTS[95]; CONSTANTS[308] = CONSTANTS[96]; CONSTANTS[309] = CONSTANTS[97]; CONSTANTS[310] = CONSTANTS[98]; CONSTANTS[311] = CONSTANTS[306]; CONSTANTS[312] = CONSTANTS[99]; CONSTANTS[313] = CONSTANTS[100]; CONSTANTS[314] = CONSTANTS[101]; CONSTANTS[315] = CONSTANTS[102]; CONSTANTS[316] = CONSTANTS[103]; CONSTANTS[317] = CONSTANTS[104]; CONSTANTS[318] = CONSTANTS[315]; CONSTANTS[319] = CONSTANTS[105]; CONSTANTS[320] = CONSTANTS[106]; CONSTANTS[321] = CONSTANTS[107]; CONSTANTS[322] = CONSTANTS[108]; CONSTANTS[323] = CONSTANTS[109]; CONSTANTS[324] = CONSTANTS[110]; CONSTANTS[325] = CONSTANTS[111]; CONSTANTS[326] = CONSTANTS[112]; CONSTANTS[327] = CONSTANTS[113]; CONSTANTS[328] = CONSTANTS[114]; CONSTANTS[329] = CONSTANTS[115]; CONSTANTS[330] = CONSTANTS[116]; CONSTANTS[331] = CONSTANTS[117]; CONSTANTS[332] = CONSTANTS[118]; CONSTANTS[333] = CONSTANTS[119]; CONSTANTS[334] = CONSTANTS[120]; CONSTANTS[335] = CONSTANTS[121]; CONSTANTS[336] = CONSTANTS[122]; CONSTANTS[337] = CONSTANTS[123]; CONSTANTS[338] = CONSTANTS[127]; CONSTANTS[339] = CONSTANTS[126]; CONSTANTS[340] = CONSTANTS[128]; CONSTANTS[341] = CONSTANTS[132]; } void computeRates(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC) { ALGEBRAIC[220] = (CONSTANTS[38] != 45.0000 ? CONSTANTS[5] : VOI<40.0000 ? 0.00100000 : VOI>=40.0000&&VOI<80.0000 ? 0.00400000 : VOI>=80.0000&&VOI<100.000 ? 0.0100000 : VOI>=100.000 ? 0.0400000 : 0.0/0.0); ALGEBRAIC[221] = 1.00000+STATES[4]/CONSTANTS[39]+STATES[3]/CONSTANTS[264]+( STATES[4]*STATES[3])/( CONSTANTS[39]*CONSTANTS[40])+STATES[4]/CONSTANTS[266]+STATES[2]/CONSTANTS[41]+( STATES[4]*STATES[2])/( CONSTANTS[267]*CONSTANTS[266]); ALGEBRAIC[0] = (VOI<=1.00000||VOI>1.00000&&CONSTANTS[34]==0.00000 ? STATES[0] : CONSTANTS[35]); ALGEBRAIC[222] = 1.40400/(1.00000+pow(10.0000, 5.94000 - ALGEBRAIC[0])+pow(10.0000, ALGEBRAIC[0] - 7.29000)); ALGEBRAIC[224] = (( ALGEBRAIC[222]*CONSTANTS[263]*STATES[3])/( CONSTANTS[265]*CONSTANTS[264]))/ALGEBRAIC[221]; ALGEBRAIC[1] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[150])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[144]); ALGEBRAIC[60] = 1.00000+ pow(10.0000, - ALGEBRAIC[0])*pow(10.0000, CONSTANTS[195])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[196]); ALGEBRAIC[11] = (CONSTANTS[152]+ CONSTANTS[151]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[151]); ALGEBRAIC[69] = (CONSTANTS[198]+ CONSTANTS[197]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[197]); ALGEBRAIC[169] = 655.700+ CONSTANTS[248]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]; ALGEBRAIC[182] = (ALGEBRAIC[169]+ALGEBRAIC[69]) - ALGEBRAIC[11]; ALGEBRAIC[183] = ( exp(- ALGEBRAIC[182]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[60])/ALGEBRAIC[1]; ALGEBRAIC[223] = ( ALGEBRAIC[222]*CONSTANTS[263]*CONSTANTS[266]*CONSTANTS[267])/( CONSTANTS[265]*CONSTANTS[264]*ALGEBRAIC[183]); ALGEBRAIC[225] = (( ALGEBRAIC[223]*STATES[4])/( CONSTANTS[266]*CONSTANTS[267]))/ALGEBRAIC[221]; ALGEBRAIC[226] = ALGEBRAIC[220]*( STATES[4]*ALGEBRAIC[224] - STATES[2]*ALGEBRAIC[225]); ALGEBRAIC[227] = 1.00000 - ALGEBRAIC[220]; ALGEBRAIC[228] = (pow(STATES[5]/CONSTANTS[44], CONSTANTS[46])/CONSTANTS[45])/(1.00000+pow(STATES[5]/CONSTANTS[44], CONSTANTS[46])/CONSTANTS[45]); ALGEBRAIC[229] = 1.00000+STATES[4]/CONSTANTS[269]+STATES[3]/CONSTANTS[42]+STATES[4]/CONSTANTS[271]+STATES[2]/CONSTANTS[43]+( STATES[4]*STATES[3])/( CONSTANTS[269]*CONSTANTS[268])+( STATES[4]*STATES[2])/( CONSTANTS[270]*CONSTANTS[271]); ALGEBRAIC[230] = 1.75000/(1.00000+pow(10.0000, 6.12000 - ALGEBRAIC[0])+pow(10.0000, ALGEBRAIC[0] - 7.03000)); ALGEBRAIC[232] = (( ALGEBRAIC[230]*ALGEBRAIC[228]*CONSTANTS[263]*STATES[3])/( CONSTANTS[269]*CONSTANTS[268]))/ALGEBRAIC[229]; ALGEBRAIC[231] = ( ALGEBRAIC[230]*CONSTANTS[263]*CONSTANTS[270]*CONSTANTS[271])/( CONSTANTS[269]*CONSTANTS[268]*ALGEBRAIC[183]); ALGEBRAIC[233] = (( ALGEBRAIC[228]*ALGEBRAIC[231]*STATES[4])/( CONSTANTS[270]*CONSTANTS[271]))/ALGEBRAIC[229]; ALGEBRAIC[234] = ALGEBRAIC[227]*( STATES[4]*ALGEBRAIC[232] - STATES[2]*ALGEBRAIC[233]); ALGEBRAIC[236] = - (ALGEBRAIC[226]+ALGEBRAIC[234]); RATES[4] = ALGEBRAIC[236]; ALGEBRAIC[235] = ( CONSTANTS[272]*1.32900)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+6.64000)+pow(10.0000, ALGEBRAIC[0] - 8.36000)); ALGEBRAIC[70] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199]); ALGEBRAIC[75] = (CONSTANTS[201]+ CONSTANTS[200]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[200]); ALGEBRAIC[185] = ALGEBRAIC[75] - ALGEBRAIC[69]; ALGEBRAIC[186] = ( exp(- ALGEBRAIC[185]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[70])/ALGEBRAIC[60]; ALGEBRAIC[237] = ( ALGEBRAIC[235]*CONSTANTS[274])/( CONSTANTS[273]*ALGEBRAIC[186]); ALGEBRAIC[238] = (( ALGEBRAIC[235]*STATES[2])/CONSTANTS[273] - ( ALGEBRAIC[237]*STATES[6])/CONSTANTS[274])/(1.00000+STATES[2]/CONSTANTS[273]+STATES[6]/CONSTANTS[274]); ALGEBRAIC[239] = CONSTANTS[275]/(1.00000+pow(10.0000, - ALGEBRAIC[0]+6.94000)+pow(10.0000, ALGEBRAIC[0] - 9.35000)); ALGEBRAIC[76] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202]); ALGEBRAIC[81] = (CONSTANTS[204]+ CONSTANTS[203]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[203]); ALGEBRAIC[188] = ALGEBRAIC[81] - ALGEBRAIC[75]; ALGEBRAIC[189] = ( exp(- ALGEBRAIC[188]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[76])/ALGEBRAIC[70]; ALGEBRAIC[240] = (( ALGEBRAIC[239]*CONSTANTS[276])/CONSTANTS[277])*ALGEBRAIC[189]; ALGEBRAIC[241] = (( ALGEBRAIC[240]*STATES[6])/CONSTANTS[276] - ( ALGEBRAIC[239]*STATES[7])/CONSTANTS[277])/(1.00000+STATES[7]/CONSTANTS[277]+STATES[6]/CONSTANTS[276]); ALGEBRAIC[243] = ALGEBRAIC[238] - ALGEBRAIC[241]; RATES[6] = ALGEBRAIC[243]; ALGEBRAIC[242] = CONSTANTS[278]/(1.00000+pow(ALGEBRAIC[0]/6.80000, - 30.0000)); ALGEBRAIC[12] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[160])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[161]); ALGEBRAIC[23] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[170])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[164]); ALGEBRAIC[82] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[207]); ALGEBRAIC[22] = (CONSTANTS[163]+ CONSTANTS[162]*CONSTANTS[0]*CONSTANTS[130]*log(10.0000)*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[162]); ALGEBRAIC[34] = (CONSTANTS[172]+ CONSTANTS[171]*CONSTANTS[0]*CONSTANTS[130]*log(10.0000)*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[171]); ALGEBRAIC[92] = (CONSTANTS[209]+ CONSTANTS[208]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[208]); ALGEBRAIC[173] = CONSTANTS[256]+ CONSTANTS[255]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]; ALGEBRAIC[191] = ((ALGEBRAIC[92]+ALGEBRAIC[34]+ALGEBRAIC[173]) - ALGEBRAIC[81]) - ALGEBRAIC[22]; ALGEBRAIC[192] = ( exp(- ALGEBRAIC[191]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[82]*ALGEBRAIC[23])/( ALGEBRAIC[76]*ALGEBRAIC[12]*pow(10.0000, - ALGEBRAIC[0])); ALGEBRAIC[244] = ( ALGEBRAIC[242]*CONSTANTS[282]*CONSTANTS[284])/( CONSTANTS[279]*CONSTANTS[281]*ALGEBRAIC[192]); ALGEBRAIC[245] = CONSTANTS[53]*pow(( ((1.00000+STATES[10]/CONSTANTS[49])/(1.00000+( CONSTANTS[51]*STATES[10])/CONSTANTS[49]))*(1.00000+( CONSTANTS[52]*STATES[5])/CONSTANTS[50]))/(1.00000+STATES[5]/CONSTANTS[50]), 4.00000); ALGEBRAIC[246] = (1.00000+STATES[7]/CONSTANTS[279])*(1.00000+STATES[10]/CONSTANTS[281])+STATES[8]/CONSTANTS[282]+ (STATES[9]/CONSTANTS[284])*(1.00000+STATES[8]/CONSTANTS[282]); ALGEBRAIC[247] = (1.00000+STATES[7]/CONSTANTS[280])*(1.00000+STATES[10]/CONSTANTS[283])+STATES[8]/CONSTANTS[47]+ (STATES[9]/CONSTANTS[48])*(1.00000+STATES[8]/CONSTANTS[47]); ALGEBRAIC[248] = ( ((( ALGEBRAIC[242]*STATES[7]*STATES[10])/( CONSTANTS[279]*CONSTANTS[281]))/ALGEBRAIC[246] - (( ALGEBRAIC[244]*STATES[9]*STATES[8])/( CONSTANTS[284]*CONSTANTS[282]))/ALGEBRAIC[246])*(1.00000+ CONSTANTS[285]*ALGEBRAIC[245]*pow(ALGEBRAIC[247]/ALGEBRAIC[246], 3.00000)))/(1.00000+ ALGEBRAIC[245]*pow(ALGEBRAIC[247]/ALGEBRAIC[246], 4.00000)); ALGEBRAIC[250] = ALGEBRAIC[241] - ALGEBRAIC[248]; RATES[7] = ALGEBRAIC[250]; ALGEBRAIC[249] = ( CONSTANTS[286]*1.01300)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.32000)+pow(10.0000, ALGEBRAIC[0] - 9.15000)); ALGEBRAIC[93] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210]); ALGEBRAIC[109] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[220]); ALGEBRAIC[98] = (CONSTANTS[212]+ CONSTANTS[211]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[211]); ALGEBRAIC[118] = (CONSTANTS[222]+ CONSTANTS[221]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[221]); ALGEBRAIC[194] = (ALGEBRAIC[118]+ALGEBRAIC[98]) - ALGEBRAIC[92]; ALGEBRAIC[195] = ( 1.00000*exp(- ALGEBRAIC[194]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[93]*ALGEBRAIC[82])/ALGEBRAIC[109]; ALGEBRAIC[251] = ( ALGEBRAIC[249]*CONSTANTS[289]*CONSTANTS[288])/( CONSTANTS[287]*ALGEBRAIC[195]); ALGEBRAIC[252] = (( ALGEBRAIC[249]*STATES[8])/CONSTANTS[287] - ( ALGEBRAIC[251]*STATES[12]*STATES[11])/( CONSTANTS[289]*CONSTANTS[288]))/(1.00000+STATES[8]/CONSTANTS[287]+STATES[12]/CONSTANTS[289]+STATES[11]/CONSTANTS[288]); ALGEBRAIC[197] = ALGEBRAIC[118] - ALGEBRAIC[98]; ALGEBRAIC[198] = ( exp(- ALGEBRAIC[197]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[109])/ALGEBRAIC[93]; ALGEBRAIC[253] = ( CONSTANTS[293]*CONSTANTS[292])/( CONSTANTS[291]*ALGEBRAIC[198]); ALGEBRAIC[254] = (( CONSTANTS[293]*STATES[12])/CONSTANTS[291] - ( ALGEBRAIC[253]*STATES[11])/CONSTANTS[292])/(1.00000+STATES[12]/CONSTANTS[291]+STATES[11]/CONSTANTS[292]); ALGEBRAIC[258] = 1.00000+STATES[3]/CONSTANTS[303]+STATES[12]/CONSTANTS[301]+STATES[14]/CONSTANTS[302]+( STATES[12]*STATES[14])/( CONSTANTS[301]*CONSTANTS[302])+( STATES[12]*STATES[14]*STATES[3])/( CONSTANTS[301]*CONSTANTS[302]*CONSTANTS[303])+STATES[16]/CONSTANTS[304]+STATES[15]/CONSTANTS[305]+( STATES[16]*STATES[15])/( CONSTANTS[305]*CONSTANTS[304]); ALGEBRAIC[259] = CONSTANTS[300]*0.000700000*exp( ALGEBRAIC[0]*0.897900); ALGEBRAIC[119] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223]); ALGEBRAIC[124] = (CONSTANTS[225]+ CONSTANTS[224]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[224]); ALGEBRAIC[170] = (CONSTANTS[250]+ CONSTANTS[249]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[249]); ALGEBRAIC[171] = (CONSTANTS[252]+ CONSTANTS[251]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[251]); ALGEBRAIC[200] = (((ALGEBRAIC[124]+ALGEBRAIC[171]+ALGEBRAIC[173]) - ALGEBRAIC[11]) - ALGEBRAIC[98]) - ALGEBRAIC[170]; ALGEBRAIC[201] = ( exp(- ALGEBRAIC[200]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[119])/( ALGEBRAIC[1]*ALGEBRAIC[93]*pow(10.0000, - ALGEBRAIC[0])*1.00000); ALGEBRAIC[260] = ( ALGEBRAIC[259]*CONSTANTS[304]*CONSTANTS[305])/( CONSTANTS[301]*CONSTANTS[303]*CONSTANTS[302]*ALGEBRAIC[201]); ALGEBRAIC[261] = (( ALGEBRAIC[259]*STATES[12]*STATES[14]*STATES[3])/( CONSTANTS[302]*CONSTANTS[301]*CONSTANTS[303]) - ( ALGEBRAIC[260]*STATES[16]*STATES[15])/( CONSTANTS[304]*CONSTANTS[305]))/ALGEBRAIC[258]; ALGEBRAIC[263] = (ALGEBRAIC[252] - ALGEBRAIC[254]) - ALGEBRAIC[261]; RATES[12] = ALGEBRAIC[263]; ALGEBRAIC[125] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+6.21000); ALGEBRAIC[130] = (CONSTANTS[228]+ CONSTANTS[227]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[227]); ALGEBRAIC[206] = ((ALGEBRAIC[22]+ALGEBRAIC[130]) - ALGEBRAIC[124]) - ALGEBRAIC[34]; ALGEBRAIC[207] = ( exp(- ALGEBRAIC[206]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[12]*ALGEBRAIC[125])/( ALGEBRAIC[119]*ALGEBRAIC[23]); ALGEBRAIC[262] = (( CONSTANTS[311]*CONSTANTS[307]*CONSTANTS[308])/( CONSTANTS[309]*CONSTANTS[310]))*ALGEBRAIC[207]; ALGEBRAIC[264] = 1.00000+STATES[9]/CONSTANTS[308]+STATES[16]/CONSTANTS[307]+( STATES[16]*STATES[9])/( CONSTANTS[307]*CONSTANTS[308])+STATES[17]/CONSTANTS[309]+STATES[10]/CONSTANTS[310]+( STATES[17]*STATES[10])/( CONSTANTS[309]*CONSTANTS[310]); ALGEBRAIC[265] = (( ALGEBRAIC[262]*STATES[16]*STATES[9])/( CONSTANTS[308]*CONSTANTS[307]) - ( CONSTANTS[311]*STATES[10]*STATES[17])/( CONSTANTS[310]*CONSTANTS[309]))/ALGEBRAIC[264]; ALGEBRAIC[267] = ALGEBRAIC[261] - ALGEBRAIC[265]; RATES[16] = ALGEBRAIC[267]; ALGEBRAIC[266] = ( CONSTANTS[312]*0.989000)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.62000)+pow(10.0000, ALGEBRAIC[0] - 8.74000)); ALGEBRAIC[131] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[230])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[231]); ALGEBRAIC[141] = (CONSTANTS[233]+ CONSTANTS[232]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[232]); ALGEBRAIC[209] = ALGEBRAIC[141] - ALGEBRAIC[130]; ALGEBRAIC[210] = ( exp(- ALGEBRAIC[209]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[131])/ALGEBRAIC[125]; ALGEBRAIC[268] = ( ALGEBRAIC[266]*CONSTANTS[314])/( CONSTANTS[313]*ALGEBRAIC[210]); ALGEBRAIC[269] = (( ALGEBRAIC[266]*STATES[17])/CONSTANTS[313] - ( ALGEBRAIC[268]*STATES[18])/CONSTANTS[314])/(1.00000+STATES[17]/CONSTANTS[313]+STATES[18]/CONSTANTS[314]); ALGEBRAIC[271] = ALGEBRAIC[265] - ALGEBRAIC[269]; RATES[17] = ALGEBRAIC[271]; ALGEBRAIC[255] = (1.00000+STATES[13]/CONSTANTS[295]+STATES[15]/CONSTANTS[298])*(1.00000+STATES[11]/CONSTANTS[297]+STATES[14]/CONSTANTS[298]); ALGEBRAIC[99] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[213]); ALGEBRAIC[108] = (CONSTANTS[218]+ CONSTANTS[217]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[217]); ALGEBRAIC[203] = ((ALGEBRAIC[173]+ALGEBRAIC[171]+ALGEBRAIC[118]) - ALGEBRAIC[170]) - ALGEBRAIC[108]; ALGEBRAIC[204] = ( exp(- ALGEBRAIC[203]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[109])/( ALGEBRAIC[99]*pow(10.0000, - ALGEBRAIC[0])); ALGEBRAIC[256] = ( CONSTANTS[299]*CONSTANTS[295]*CONSTANTS[296]*ALGEBRAIC[204])/( CONSTANTS[297]*CONSTANTS[298]); ALGEBRAIC[257] = (( ALGEBRAIC[256]*STATES[13]*STATES[14])/( CONSTANTS[295]*CONSTANTS[296]) - ( CONSTANTS[299]*STATES[11]*STATES[15])/( CONSTANTS[297]*CONSTANTS[298]))/ALGEBRAIC[255]; ALGEBRAIC[276] = CONSTANTS[324]*( - 0.113400*ALGEBRAIC[0]+1.60690); ALGEBRAIC[153] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239]); ALGEBRAIC[159] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[242]); ALGEBRAIC[158] = (CONSTANTS[241]+ CONSTANTS[240]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[240]); ALGEBRAIC[168] = (CONSTANTS[247]+ CONSTANTS[246]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[246]); ALGEBRAIC[218] = (((ALGEBRAIC[168]+ALGEBRAIC[170]) - ALGEBRAIC[158]) - ALGEBRAIC[171]) - ALGEBRAIC[173]; ALGEBRAIC[219] = ( exp(- ALGEBRAIC[218]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[159]*pow(10.0000, - ALGEBRAIC[0]))/ALGEBRAIC[153]; ALGEBRAIC[277] = ( ALGEBRAIC[276]*CONSTANTS[327]*CONSTANTS[328])/( CONSTANTS[325]*CONSTANTS[326]*ALGEBRAIC[219]); ALGEBRAIC[278] = (( ALGEBRAIC[276]*STATES[20]*STATES[15])/( CONSTANTS[325]*CONSTANTS[326]) - ( ALGEBRAIC[277]*STATES[21]*STATES[14])/( CONSTANTS[327]*CONSTANTS[328]))/(1.00000+STATES[20]/CONSTANTS[325]+STATES[15]/CONSTANTS[326]+( STATES[20]*STATES[15])/( CONSTANTS[325]*CONSTANTS[326])+STATES[21]/CONSTANTS[327]+STATES[14]/CONSTANTS[328]+( STATES[21]*STATES[14])/( CONSTANTS[327]*CONSTANTS[328])); ALGEBRAIC[281] = (- ALGEBRAIC[261] - ALGEBRAIC[257])+ALGEBRAIC[278]; RATES[14] = ALGEBRAIC[281]; ALGEBRAIC[282] = (ALGEBRAIC[261]+ALGEBRAIC[257]) - ALGEBRAIC[278]; RATES[15] = ALGEBRAIC[282]; ALGEBRAIC[273] = ( CONSTANTS[319]*1.05000)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.58000)+pow(10.0000, ALGEBRAIC[0] - 8.79000)); ALGEBRAIC[142] = 1.00000+pow(10.0000, CONSTANTS[234] - ALGEBRAIC[0])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[235])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[236]); ALGEBRAIC[152] = (CONSTANTS[238]+ CONSTANTS[237]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[237]); ALGEBRAIC[215] = (((ALGEBRAIC[158]+ALGEBRAIC[22]) - ALGEBRAIC[173]) - ALGEBRAIC[152]) - ALGEBRAIC[34]; ALGEBRAIC[216] = ( exp(- ALGEBRAIC[215]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[153]*ALGEBRAIC[12]*pow(10.0000, - ALGEBRAIC[0]))/( ALGEBRAIC[142]*ALGEBRAIC[23]); ALGEBRAIC[274] = ( ALGEBRAIC[273]*CONSTANTS[322]*CONSTANTS[323])/( CONSTANTS[320]*CONSTANTS[321]*ALGEBRAIC[216]); ALGEBRAIC[275] = (( ALGEBRAIC[273]*STATES[19]*STATES[9])/( CONSTANTS[320]*CONSTANTS[321]) - ( ALGEBRAIC[274]*STATES[20]*STATES[10])/( CONSTANTS[322]*CONSTANTS[323]))/(1.00000+STATES[19]/CONSTANTS[320]+STATES[9]/CONSTANTS[321]+( STATES[19]*STATES[9])/( CONSTANTS[320]*CONSTANTS[321])+STATES[10]/CONSTANTS[323]+STATES[20]/CONSTANTS[322]+( STATES[20]*STATES[10])/( CONSTANTS[322]*CONSTANTS[323])); ALGEBRAIC[283] = ALGEBRAIC[275] - ALGEBRAIC[278]; RATES[20] = ALGEBRAIC[283]; ALGEBRAIC[45] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[187])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[181]); ALGEBRAIC[55] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189]); ALGEBRAIC[176] = ( exp(- CONSTANTS[262]/( CONSTANTS[0]*CONSTANTS[130]))*pow(10.0000, - ALGEBRAIC[0])*ALGEBRAIC[12]*ALGEBRAIC[55])/( ALGEBRAIC[45]*ALGEBRAIC[23]); ALGEBRAIC[285] = ( (CONSTANTS[329]/ALGEBRAIC[176])*CONSTANTS[331]*CONSTANTS[333])/( CONSTANTS[332]*CONSTANTS[330]); ALGEBRAIC[286] = (( ALGEBRAIC[285]*STATES[10]*STATES[22])/( CONSTANTS[331]*CONSTANTS[333]) - ( CONSTANTS[329]*STATES[9]*STATES[23])/( CONSTANTS[332]*CONSTANTS[330]))/(1.00000+STATES[9]/CONSTANTS[332]+STATES[23]/CONSTANTS[55]+( STATES[23]*STATES[9])/( CONSTANTS[332]*CONSTANTS[330])+STATES[10]/CONSTANTS[331]+( STATES[22]*STATES[10])/( CONSTANTS[333]*CONSTANTS[331])); ALGEBRAIC[289] = - ALGEBRAIC[286]; RATES[22] = ALGEBRAIC[289]; ALGEBRAIC[13] = 1.00000/ALGEBRAIC[12]; ALGEBRAIC[14] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])*ALGEBRAIC[13]; ALGEBRAIC[15] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[160])*ALGEBRAIC[13]; ALGEBRAIC[16] = (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[161])*ALGEBRAIC[13]; ALGEBRAIC[17] = 0.00000*ALGEBRAIC[13]+ 1.00000*ALGEBRAIC[14]+ 0.00000*ALGEBRAIC[15]+ 0.00000*ALGEBRAIC[16]; ALGEBRAIC[24] = 1.00000/ALGEBRAIC[23]; ALGEBRAIC[25] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])*ALGEBRAIC[24]; ALGEBRAIC[26] = (( ALGEBRAIC[24]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[170]); ALGEBRAIC[27] = (( ALGEBRAIC[24]*CONSTANTS[133])/CONSTANTS[134])*pow(10.0000, CONSTANTS[164]); ALGEBRAIC[28] = 0.00000*ALGEBRAIC[24]+ 1.00000*ALGEBRAIC[25]+ 0.00000*ALGEBRAIC[26]+ 0.00000*ALGEBRAIC[27]; ALGEBRAIC[46] = 1.00000/ALGEBRAIC[45]; ALGEBRAIC[48] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])*ALGEBRAIC[46]; ALGEBRAIC[50] = ALGEBRAIC[48]; ALGEBRAIC[56] = 1.00000/ALGEBRAIC[55]; ALGEBRAIC[57] = ALGEBRAIC[56]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189]); ALGEBRAIC[58] = 0.00000*ALGEBRAIC[56]+ 1.00000*ALGEBRAIC[57]; ALGEBRAIC[174] = (((ALGEBRAIC[17]+ALGEBRAIC[58]) - ALGEBRAIC[50]) - ALGEBRAIC[28])+(((CONSTANTS[162]+CONSTANTS[190]) - CONSTANTS[188]) - CONSTANTS[171]); ALGEBRAIC[35] = 1.00000+pow(10.0000, CONSTANTS[177] - ALGEBRAIC[0])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[178]); ALGEBRAIC[36] = 1.00000/ALGEBRAIC[35]; ALGEBRAIC[37] = ALGEBRAIC[36]*pow(10.0000, CONSTANTS[177] - ALGEBRAIC[0]); ALGEBRAIC[38] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[178])*ALGEBRAIC[36]; ALGEBRAIC[39] = 0.00000*ALGEBRAIC[36]+ALGEBRAIC[37]+ 0.00000*ALGEBRAIC[38]; ALGEBRAIC[178] = (( 2.00000*ALGEBRAIC[28] - ALGEBRAIC[17]) - ALGEBRAIC[39])+(( 2.00000*CONSTANTS[171] - CONSTANTS[162]) - CONSTANTS[179]); ALGEBRAIC[2] = 1.00000/ALGEBRAIC[1]; ALGEBRAIC[3] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])*ALGEBRAIC[2]; ALGEBRAIC[6] = 1.00000*ALGEBRAIC[3]; ALGEBRAIC[61] = 1.00000/ALGEBRAIC[60]; ALGEBRAIC[62] = ALGEBRAIC[61]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195]); ALGEBRAIC[64] = ALGEBRAIC[62]; ALGEBRAIC[181] = (ALGEBRAIC[64] - ALGEBRAIC[6])+(1.00000 - CONSTANTS[151]); ALGEBRAIC[71] = 1.00000/ALGEBRAIC[70]; ALGEBRAIC[72] = ALGEBRAIC[71]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199]); ALGEBRAIC[73] = ALGEBRAIC[72]; ALGEBRAIC[184] = (ALGEBRAIC[73] - ALGEBRAIC[64])+(CONSTANTS[200] - CONSTANTS[197]); ALGEBRAIC[77] = 1.00000/ALGEBRAIC[76]; ALGEBRAIC[78] = ALGEBRAIC[77]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202]); ALGEBRAIC[79] = ALGEBRAIC[78]; ALGEBRAIC[187] = (ALGEBRAIC[79] - ALGEBRAIC[73])+(CONSTANTS[203] - CONSTANTS[200]); ALGEBRAIC[83] = 1.00000/ALGEBRAIC[82]; ALGEBRAIC[84] = ALGEBRAIC[83]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]); ALGEBRAIC[85] = ALGEBRAIC[83]*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]); ALGEBRAIC[87] = ALGEBRAIC[84]+ 2.00000*ALGEBRAIC[85]; ALGEBRAIC[190] = (((((ALGEBRAIC[28]+ALGEBRAIC[87]) - ALGEBRAIC[79]) - ALGEBRAIC[17])+CONSTANTS[171]+CONSTANTS[208]) - CONSTANTS[203]) - CONSTANTS[162]; ALGEBRAIC[94] = 1.00000/ALGEBRAIC[93]; ALGEBRAIC[95] = ALGEBRAIC[94]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210]); ALGEBRAIC[96] = ALGEBRAIC[95]; ALGEBRAIC[110] = 1.00000/ALGEBRAIC[109]; ALGEBRAIC[111] = ALGEBRAIC[110]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219]); ALGEBRAIC[113] = ALGEBRAIC[111]; ALGEBRAIC[193] = ((ALGEBRAIC[113]+ALGEBRAIC[96]) - ALGEBRAIC[87])+((CONSTANTS[221]+CONSTANTS[211]) - CONSTANTS[208]); ALGEBRAIC[196] = (ALGEBRAIC[113] - ALGEBRAIC[96])+(CONSTANTS[221] - CONSTANTS[211]); ALGEBRAIC[120] = 1.00000/ALGEBRAIC[119]; ALGEBRAIC[121] = ALGEBRAIC[120]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223]); ALGEBRAIC[122] = ALGEBRAIC[121]; ALGEBRAIC[199] = ((ALGEBRAIC[122] - ALGEBRAIC[96]) - ALGEBRAIC[6])+((((CONSTANTS[224]+CONSTANTS[251]) - CONSTANTS[211]) - CONSTANTS[151]) - CONSTANTS[249]); ALGEBRAIC[100] = 1.00000/ALGEBRAIC[99]; ALGEBRAIC[101] = ALGEBRAIC[100]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216]); ALGEBRAIC[103] = ALGEBRAIC[101]; ALGEBRAIC[202] = (ALGEBRAIC[113] - ALGEBRAIC[103])+(((CONSTANTS[221]+CONSTANTS[251]) - CONSTANTS[249]) - CONSTANTS[217]); ALGEBRAIC[126] = 1.00000/ALGEBRAIC[125]; ALGEBRAIC[127] = ALGEBRAIC[126]*pow(10.0000, - ALGEBRAIC[0]+6.21000); ALGEBRAIC[128] = ALGEBRAIC[127]; ALGEBRAIC[205] = (((ALGEBRAIC[128]+ALGEBRAIC[17]) - ALGEBRAIC[122]) - ALGEBRAIC[28])+(((CONSTANTS[227]+CONSTANTS[162]) - CONSTANTS[224]) - CONSTANTS[171]); ALGEBRAIC[132] = 1.00000/ALGEBRAIC[131]; ALGEBRAIC[133] = ALGEBRAIC[132]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229]); ALGEBRAIC[136] = ALGEBRAIC[133]; ALGEBRAIC[208] = (ALGEBRAIC[136] - ALGEBRAIC[128])+(CONSTANTS[232] - CONSTANTS[227]); ALGEBRAIC[143] = 1.00000/ALGEBRAIC[142]; ALGEBRAIC[144] = ALGEBRAIC[143]*pow(10.0000, CONSTANTS[234] - ALGEBRAIC[0]); ALGEBRAIC[147] = ALGEBRAIC[144]; ALGEBRAIC[211] = (ALGEBRAIC[147] - ALGEBRAIC[136])+((CONSTANTS[253]+CONSTANTS[237]) - CONSTANTS[232]); ALGEBRAIC[154] = 1.00000/ALGEBRAIC[153]; ALGEBRAIC[155] = ALGEBRAIC[154]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239]); ALGEBRAIC[156] = ALGEBRAIC[155]; ALGEBRAIC[214] = (((ALGEBRAIC[156]+ALGEBRAIC[17]) - ALGEBRAIC[147]) - ALGEBRAIC[28])+(((CONSTANTS[240]+CONSTANTS[162]) - CONSTANTS[237]) - CONSTANTS[171]); ALGEBRAIC[160] = 1.00000/ALGEBRAIC[159]; ALGEBRAIC[161] = ALGEBRAIC[160]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245]); ALGEBRAIC[163] = ALGEBRAIC[161]; ALGEBRAIC[217] = (ALGEBRAIC[163] - ALGEBRAIC[156])+(((CONSTANTS[246]+CONSTANTS[249]) - CONSTANTS[240]) - CONSTANTS[251]); ALGEBRAIC[172] = (CONSTANTS[254]+ CONSTANTS[253]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(0.00000 - CONSTANTS[253]); ALGEBRAIC[212] = (ALGEBRAIC[172]+ALGEBRAIC[152]) - ALGEBRAIC[141]; ALGEBRAIC[213] = ( exp(- ALGEBRAIC[212]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[142])/ALGEBRAIC[131]; ALGEBRAIC[270] = ( CONSTANTS[318]*CONSTANTS[317])/( CONSTANTS[316]*ALGEBRAIC[213]); ALGEBRAIC[272] = (( CONSTANTS[318]*STATES[18])/CONSTANTS[316] - ( ALGEBRAIC[270]*STATES[19])/CONSTANTS[317])/(1.00000+STATES[19]/CONSTANTS[317]+STATES[18]/CONSTANTS[316]); ALGEBRAIC[44] = (CONSTANTS[180]+ CONSTANTS[179]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[179]); ALGEBRAIC[179] = ( 2.00000*ALGEBRAIC[34] - ALGEBRAIC[22]) - ALGEBRAIC[44]; ALGEBRAIC[180] = ( exp(- ALGEBRAIC[179]/( CONSTANTS[0]*CONSTANTS[130]))*pow(ALGEBRAIC[23], 2.00000))/( ALGEBRAIC[12]*ALGEBRAIC[35]); ALGEBRAIC[287] = ( CONSTANTS[334]*pow(CONSTANTS[337], 2.00000))/( CONSTANTS[335]*CONSTANTS[336]*ALGEBRAIC[180]); ALGEBRAIC[290] = (( CONSTANTS[334]*STATES[10]*STATES[5])/( CONSTANTS[336]*CONSTANTS[335]) - ALGEBRAIC[287]*pow(STATES[9]/CONSTANTS[337], 2.00000))/(1.00000+STATES[10]/CONSTANTS[336]+STATES[5]/CONSTANTS[335]+( STATES[10]*STATES[5])/( CONSTANTS[336]*CONSTANTS[335])+( 2.00000*STATES[9])/CONSTANTS[337]+pow(STATES[9], 2.00000)/pow(CONSTANTS[337], 2.00000)); ALGEBRAIC[293] = ALGEBRAIC[174]*- ALGEBRAIC[286]+ ALGEBRAIC[178]*ALGEBRAIC[290]+ ALGEBRAIC[184]*ALGEBRAIC[238]+ ALGEBRAIC[181]*(ALGEBRAIC[226]+ALGEBRAIC[234])+ ALGEBRAIC[187]*ALGEBRAIC[241]+ ALGEBRAIC[190]*ALGEBRAIC[248]+ ALGEBRAIC[193]*ALGEBRAIC[252]+ ALGEBRAIC[196]*ALGEBRAIC[254]+ ALGEBRAIC[199]*ALGEBRAIC[261]+ ALGEBRAIC[205]*ALGEBRAIC[265]+ ALGEBRAIC[208]*ALGEBRAIC[269]+ ALGEBRAIC[211]*ALGEBRAIC[272]+ ALGEBRAIC[214]*ALGEBRAIC[275]+ ALGEBRAIC[217]*ALGEBRAIC[278]+ ALGEBRAIC[202]*ALGEBRAIC[257]; RATES[24] = - ALGEBRAIC[293]; ALGEBRAIC[299] = ALGEBRAIC[286]; RATES[23] = ALGEBRAIC[299]; ALGEBRAIC[279] = (CONSTANTS[38] != 5.00000&&CONSTANTS[38] != 45.0000 ? CONSTANTS[22] : CONSTANTS[38] != 5.00000&&CONSTANTS[38]==45.0000&&VOI>=110.000 ? CONSTANTS[22] : CONSTANTS[38]==5.00000&&VOI>30.0000 ? CONSTANTS[22] : 0.00000); ALGEBRAIC[284] = ( ALGEBRAIC[279]*STATES[10])/(CONSTANTS[54]+STATES[10]); ALGEBRAIC[300] = (((- ALGEBRAIC[286] - ALGEBRAIC[290]) - ALGEBRAIC[248])+ALGEBRAIC[265]+ALGEBRAIC[275]) - ALGEBRAIC[284]; RATES[10] = ALGEBRAIC[300]; ALGEBRAIC[301] = (((ALGEBRAIC[286]+ 2.00000*ALGEBRAIC[290]+ALGEBRAIC[248]) - ALGEBRAIC[265]) - ALGEBRAIC[275])+ALGEBRAIC[284]; RATES[9] = ALGEBRAIC[301]; ALGEBRAIC[302] = - ALGEBRAIC[290]; RATES[5] = ALGEBRAIC[302]; ALGEBRAIC[303] = (- (ALGEBRAIC[226]+ALGEBRAIC[234]) - ALGEBRAIC[261])+ALGEBRAIC[284]; RATES[3] = ALGEBRAIC[303]; ALGEBRAIC[304] = (ALGEBRAIC[226]+ALGEBRAIC[234]) - ALGEBRAIC[238]; RATES[2] = ALGEBRAIC[304]; ALGEBRAIC[305] = ALGEBRAIC[248] - ALGEBRAIC[252]; RATES[8] = ALGEBRAIC[305]; ALGEBRAIC[306] = ALGEBRAIC[252]+ALGEBRAIC[254]+ALGEBRAIC[257]; RATES[11] = ALGEBRAIC[306]; ALGEBRAIC[307] = - ALGEBRAIC[257]; RATES[13] = ALGEBRAIC[307]; ALGEBRAIC[308] = ALGEBRAIC[269] - ALGEBRAIC[272]; RATES[18] = ALGEBRAIC[308]; ALGEBRAIC[309] = ALGEBRAIC[272] - ALGEBRAIC[275]; RATES[19] = ALGEBRAIC[309]; ALGEBRAIC[310] = ALGEBRAIC[278]; RATES[21] = ALGEBRAIC[310]; ALGEBRAIC[291] = ( log(10.0000)*CONSTANTS[338]*pow(10.0000, - ALGEBRAIC[0] - 6.87000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 6.87000), 2.00000)+( log(10.0000)*CONSTANTS[339]*pow(10.0000, - ALGEBRAIC[0] - 8.30000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 8.30000), 2.00000)+( log(10.0000)*CONSTANTS[340]*pow(10.0000, - ALGEBRAIC[0] - 4.80000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 4.80000), 2.00000); ALGEBRAIC[7] = ( pow(10.0000, CONSTANTS[149])*(ALGEBRAIC[1] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])))/( CONSTANTS[134]*pow(ALGEBRAIC[1], 2.00000)); ALGEBRAIC[18] = ( pow(10.0000, CONSTANTS[159])*(ALGEBRAIC[12] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])))/( CONSTANTS[134]*pow(ALGEBRAIC[12], 2.00000)); ALGEBRAIC[29] = ( pow(10.0000, CONSTANTS[169])*(ALGEBRAIC[23] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])))/( CONSTANTS[134]*pow(ALGEBRAIC[23], 2.00000)); ALGEBRAIC[40] = ( pow(10.0000, CONSTANTS[177])*(ALGEBRAIC[35] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[177])))/( CONSTANTS[134]*pow(ALGEBRAIC[35], 2.00000)); ALGEBRAIC[51] = ( pow(10.0000, CONSTANTS[186])*(ALGEBRAIC[45] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])))/( CONSTANTS[134]*pow(ALGEBRAIC[45], 2.00000)); ALGEBRAIC[59] = ( pow(10.0000, CONSTANTS[189])*(ALGEBRAIC[55] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189])))/( CONSTANTS[134]*pow(ALGEBRAIC[55], 2.00000)); ALGEBRAIC[65] = ( pow(10.0000, CONSTANTS[195])*(ALGEBRAIC[60] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195])))/( CONSTANTS[134]*pow(ALGEBRAIC[60], 2.00000)); ALGEBRAIC[74] = ( pow(10.0000, CONSTANTS[199])*(ALGEBRAIC[70] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199])))/( CONSTANTS[134]*pow(ALGEBRAIC[70], 2.00000)); ALGEBRAIC[80] = ( pow(10.0000, CONSTANTS[202])*(ALGEBRAIC[76] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202])))/( CONSTANTS[134]*pow(ALGEBRAIC[76], 2.00000)); ALGEBRAIC[88] = ( ALGEBRAIC[82]*(pow(10.0000, CONSTANTS[205])+ 2.00000*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])) - (pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+ 2.00000*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]))*(pow(10.0000, CONSTANTS[205])+ 2.00000*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])))/( CONSTANTS[134]*pow(ALGEBRAIC[82], 2.00000)); ALGEBRAIC[97] = ( pow(10.0000, CONSTANTS[210])*(ALGEBRAIC[93] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210])))/( CONSTANTS[134]*pow(ALGEBRAIC[93], 2.00000)); ALGEBRAIC[104] = ( pow(10.0000, CONSTANTS[216])*(ALGEBRAIC[99] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216])))/( CONSTANTS[134]*pow(ALGEBRAIC[99], 2.00000)); ALGEBRAIC[114] = ( pow(10.0000, CONSTANTS[219])*(ALGEBRAIC[109] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219])))/( CONSTANTS[134]*pow(ALGEBRAIC[109], 2.00000)); ALGEBRAIC[123] = ( pow(10.0000, CONSTANTS[223])*(ALGEBRAIC[119] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223])))/( CONSTANTS[134]*pow(ALGEBRAIC[119], 2.00000)); ALGEBRAIC[129] = ( pow(10.0000, CONSTANTS[226])*(ALGEBRAIC[125] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[226])))/( CONSTANTS[134]*pow(ALGEBRAIC[125], 2.00000)); ALGEBRAIC[137] = ( pow(10.0000, CONSTANTS[229])*(ALGEBRAIC[131] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229])))/( CONSTANTS[134]*pow(ALGEBRAIC[131], 2.00000)); ALGEBRAIC[148] = ( pow(10.0000, CONSTANTS[234])*(ALGEBRAIC[142] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[234])))/( CONSTANTS[134]*pow(ALGEBRAIC[142], 2.00000)); ALGEBRAIC[157] = ( pow(10.0000, CONSTANTS[239])*(ALGEBRAIC[153] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239])))/( CONSTANTS[134]*pow(ALGEBRAIC[153], 2.00000)); ALGEBRAIC[164] = ( pow(10.0000, CONSTANTS[245])*(ALGEBRAIC[159] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245])))/( CONSTANTS[134]*pow(ALGEBRAIC[159], 2.00000)); ALGEBRAIC[292] = log(10.0000)*pow(10.0000, - ALGEBRAIC[0])*CONSTANTS[134]*(1.00000+ ALGEBRAIC[7]*STATES[3]+ ALGEBRAIC[18]*STATES[10]+ ALGEBRAIC[29]*STATES[9]+ ALGEBRAIC[40]*STATES[5]+ ALGEBRAIC[51]*STATES[23]+ ALGEBRAIC[59]*STATES[22]+ ALGEBRAIC[65]*STATES[2]+ ALGEBRAIC[74]*STATES[6]+ ALGEBRAIC[80]*STATES[7]+ ALGEBRAIC[88]*STATES[8]+ ALGEBRAIC[97]*STATES[12]+ ALGEBRAIC[114]*STATES[11]+ ALGEBRAIC[104]*STATES[13]+ ALGEBRAIC[123]*STATES[16]+ ALGEBRAIC[129]*STATES[17]+ ALGEBRAIC[137]*STATES[18]+ ALGEBRAIC[148]*STATES[19]+ ALGEBRAIC[157]*STATES[20]+ ALGEBRAIC[164]*STATES[21]); ALGEBRAIC[294] = ALGEBRAIC[293]/(ALGEBRAIC[291]+ALGEBRAIC[292]); ALGEBRAIC[8] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[149]+CONSTANTS[150]))/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[19] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[159]+CONSTANTS[160]))/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[31] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[169]+CONSTANTS[170]))/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[41] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[177]+CONSTANTS[178]))/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[52] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[186]+CONSTANTS[187]))/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[66] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[195]+CONSTANTS[196]))/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[89] = ( - (pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+ 2.00000*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]))*pow(10.0000, CONSTANTS[207]))/( CONSTANTS[134]*pow(ALGEBRAIC[82], 2.00000)); ALGEBRAIC[105] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[216]+CONSTANTS[213]))/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[115] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[219]+CONSTANTS[220]))/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[138] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[229]+CONSTANTS[230]))/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[149] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[234]+CONSTANTS[235]))/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[165] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[245]+CONSTANTS[242]))/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[295] = ( ALGEBRAIC[8]*STATES[3]+ ALGEBRAIC[19]*STATES[10]+ ALGEBRAIC[31]*STATES[9]+ ALGEBRAIC[41]*STATES[5]+ ALGEBRAIC[52]*STATES[23]+ CONSTANTS[26]*STATES[22]+ ALGEBRAIC[66]*STATES[2]+ CONSTANTS[27]*STATES[6]+ CONSTANTS[28]*STATES[7]+ ALGEBRAIC[89]*STATES[8]+ CONSTANTS[29]*STATES[12]+ ALGEBRAIC[115]*STATES[11]+ ALGEBRAIC[105]*STATES[13]+ CONSTANTS[30]*STATES[16]+ CONSTANTS[31]*STATES[17]+ ALGEBRAIC[138]*STATES[18]+ ALGEBRAIC[149]*STATES[19]+ CONSTANTS[32]*STATES[20]+ ALGEBRAIC[165]*STATES[21])/(ALGEBRAIC[291]+ALGEBRAIC[292]); ALGEBRAIC[10] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149]+CONSTANTS[150])*log(10.0000))/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[21] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159]+CONSTANTS[160])*log(10.0000))/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[33] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169]+CONSTANTS[170])*log(10.0000))/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[43] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[177]+CONSTANTS[178])*log(10.0000))/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[54] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186]+CONSTANTS[187])*log(10.0000))/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[68] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195]+CONSTANTS[196])*log(10.0000))/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[91] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[207])*( ALGEBRAIC[82]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])*log(10.0000) - pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])*2.00000*log(10.0000)))/pow(ALGEBRAIC[82], 2.00000); ALGEBRAIC[107] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216]+CONSTANTS[213])*log(10.0000))/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[117] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219]+CONSTANTS[220])*log(10.0000))/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[140] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229]+CONSTANTS[230])*log(10.0000))/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[151] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[234]+CONSTANTS[235])*log(10.0000))/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[167] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245]+CONSTANTS[242])*log(10.0000))/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[9] = (( ALGEBRAIC[1]*pow(10.0000, CONSTANTS[150]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[150]))/CONSTANTS[134])/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[20] = (( ALGEBRAIC[12]*pow(10.0000, CONSTANTS[160]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[160]))/CONSTANTS[134])/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[32] = (( ALGEBRAIC[23]*pow(10.0000, CONSTANTS[170]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[170]))/CONSTANTS[134])/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[42] = (( ALGEBRAIC[35]*pow(10.0000, CONSTANTS[178]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[178]))/CONSTANTS[134])/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[53] = (( ALGEBRAIC[45]*pow(10.0000, CONSTANTS[187]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[187]))/CONSTANTS[134])/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[67] = (( ALGEBRAIC[60]*pow(10.0000, CONSTANTS[196]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[196]))/CONSTANTS[134])/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[90] = (( ALGEBRAIC[82]*pow(10.0000, CONSTANTS[207]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[207]))/CONSTANTS[134])/pow(ALGEBRAIC[82], 2.00000); ALGEBRAIC[106] = (( ALGEBRAIC[99]*pow(10.0000, CONSTANTS[213]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[213]))/CONSTANTS[134])/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[116] = (( ALGEBRAIC[109]*pow(10.0000, CONSTANTS[220]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[220]))/CONSTANTS[134])/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[139] = (( ALGEBRAIC[131]*pow(10.0000, CONSTANTS[230]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[230]))/CONSTANTS[134])/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[150] = (( ALGEBRAIC[142]*pow(10.0000, CONSTANTS[235]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[235]))/CONSTANTS[134])/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[166] = (( ALGEBRAIC[159]*pow(10.0000, CONSTANTS[242]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[242]))/CONSTANTS[134])/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[296] = - 1.00000 - ( ALGEBRAIC[20]*STATES[10]+ ALGEBRAIC[32]*STATES[9]+ ALGEBRAIC[42]*STATES[5]+ ALGEBRAIC[9]*STATES[3]+ ALGEBRAIC[53]*STATES[23]+ ALGEBRAIC[67]*STATES[2]+ ALGEBRAIC[90]*STATES[8]+ ALGEBRAIC[106]*STATES[13]+ ALGEBRAIC[116]*STATES[11]+ ALGEBRAIC[150]*STATES[19]+ ALGEBRAIC[139]*STATES[18]+ ALGEBRAIC[166]*STATES[21]); ALGEBRAIC[297] = ( ALGEBRAIC[21]*STATES[10]+ ALGEBRAIC[33]*STATES[9]+ ALGEBRAIC[43]*STATES[5]+ ALGEBRAIC[10]*STATES[3]+ ALGEBRAIC[54]*STATES[23]+ ALGEBRAIC[68]*STATES[2]+ ALGEBRAIC[91]*STATES[8]+ ALGEBRAIC[107]*STATES[13]+ ALGEBRAIC[117]*STATES[11]+ ALGEBRAIC[151]*STATES[19]+ ALGEBRAIC[140]*STATES[18]+ ALGEBRAIC[167]*STATES[21])/ALGEBRAIC[296]; ALGEBRAIC[5] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[150])*ALGEBRAIC[2]; ALGEBRAIC[49] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[187])*ALGEBRAIC[46]; ALGEBRAIC[63] = (( ALGEBRAIC[61]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[196]); ALGEBRAIC[86] = (( ALGEBRAIC[83]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[207]); ALGEBRAIC[102] = (( ALGEBRAIC[100]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[213]); ALGEBRAIC[112] = (( ALGEBRAIC[110]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[220]); ALGEBRAIC[135] = (( ALGEBRAIC[132]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[230]); ALGEBRAIC[146] = (( ALGEBRAIC[143]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[235]); ALGEBRAIC[162] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[242])*ALGEBRAIC[160]; ALGEBRAIC[311] = ( ALGEBRAIC[15]*ALGEBRAIC[300]+ ALGEBRAIC[26]*ALGEBRAIC[301]+ ALGEBRAIC[38]*ALGEBRAIC[302]+ ALGEBRAIC[5]*ALGEBRAIC[303]+ ALGEBRAIC[49]*ALGEBRAIC[299]+ ALGEBRAIC[63]*ALGEBRAIC[304]+ ALGEBRAIC[86]*ALGEBRAIC[305]+ ALGEBRAIC[102]*ALGEBRAIC[307]+ ALGEBRAIC[112]*ALGEBRAIC[306]+ ALGEBRAIC[146]*ALGEBRAIC[309]+ ALGEBRAIC[135]*ALGEBRAIC[308]+ ALGEBRAIC[162]*ALGEBRAIC[310])/ALGEBRAIC[296]; RATES[1] = (VOI<=1.00000 ? ( CONSTANTS[33]*(ALGEBRAIC[311]+ ALGEBRAIC[297]*ALGEBRAIC[294]))/(1.00000 - ALGEBRAIC[297]*ALGEBRAIC[295]) : CONSTANTS[33]*ALGEBRAIC[311]); RATES[0] = ( CONSTANTS[341]*(ALGEBRAIC[294]+ ALGEBRAIC[311]*ALGEBRAIC[295]))/(1.00000 - ALGEBRAIC[297]*ALGEBRAIC[295]); } void computeVariables(double VOI, double* CONSTANTS, double* RATES, double* STATES, double* ALGEBRAIC) { ALGEBRAIC[220] = (CONSTANTS[38] != 45.0000 ? CONSTANTS[5] : VOI<40.0000 ? 0.00100000 : VOI>=40.0000&&VOI<80.0000 ? 0.00400000 : VOI>=80.0000&&VOI<100.000 ? 0.0100000 : VOI>=100.000 ? 0.0400000 : 0.0/0.0); ALGEBRAIC[221] = 1.00000+STATES[4]/CONSTANTS[39]+STATES[3]/CONSTANTS[264]+( STATES[4]*STATES[3])/( CONSTANTS[39]*CONSTANTS[40])+STATES[4]/CONSTANTS[266]+STATES[2]/CONSTANTS[41]+( STATES[4]*STATES[2])/( CONSTANTS[267]*CONSTANTS[266]); ALGEBRAIC[0] = (VOI<=1.00000||VOI>1.00000&&CONSTANTS[34]==0.00000 ? STATES[0] : CONSTANTS[35]); ALGEBRAIC[222] = 1.40400/(1.00000+pow(10.0000, 5.94000 - ALGEBRAIC[0])+pow(10.0000, ALGEBRAIC[0] - 7.29000)); ALGEBRAIC[224] = (( ALGEBRAIC[222]*CONSTANTS[263]*STATES[3])/( CONSTANTS[265]*CONSTANTS[264]))/ALGEBRAIC[221]; ALGEBRAIC[1] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[150])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[144]); ALGEBRAIC[60] = 1.00000+ pow(10.0000, - ALGEBRAIC[0])*pow(10.0000, CONSTANTS[195])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[196]); ALGEBRAIC[11] = (CONSTANTS[152]+ CONSTANTS[151]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[151]); ALGEBRAIC[69] = (CONSTANTS[198]+ CONSTANTS[197]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[197]); ALGEBRAIC[169] = 655.700+ CONSTANTS[248]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]; ALGEBRAIC[182] = (ALGEBRAIC[169]+ALGEBRAIC[69]) - ALGEBRAIC[11]; ALGEBRAIC[183] = ( exp(- ALGEBRAIC[182]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[60])/ALGEBRAIC[1]; ALGEBRAIC[223] = ( ALGEBRAIC[222]*CONSTANTS[263]*CONSTANTS[266]*CONSTANTS[267])/( CONSTANTS[265]*CONSTANTS[264]*ALGEBRAIC[183]); ALGEBRAIC[225] = (( ALGEBRAIC[223]*STATES[4])/( CONSTANTS[266]*CONSTANTS[267]))/ALGEBRAIC[221]; ALGEBRAIC[226] = ALGEBRAIC[220]*( STATES[4]*ALGEBRAIC[224] - STATES[2]*ALGEBRAIC[225]); ALGEBRAIC[227] = 1.00000 - ALGEBRAIC[220]; ALGEBRAIC[228] = (pow(STATES[5]/CONSTANTS[44], CONSTANTS[46])/CONSTANTS[45])/(1.00000+pow(STATES[5]/CONSTANTS[44], CONSTANTS[46])/CONSTANTS[45]); ALGEBRAIC[229] = 1.00000+STATES[4]/CONSTANTS[269]+STATES[3]/CONSTANTS[42]+STATES[4]/CONSTANTS[271]+STATES[2]/CONSTANTS[43]+( STATES[4]*STATES[3])/( CONSTANTS[269]*CONSTANTS[268])+( STATES[4]*STATES[2])/( CONSTANTS[270]*CONSTANTS[271]); ALGEBRAIC[230] = 1.75000/(1.00000+pow(10.0000, 6.12000 - ALGEBRAIC[0])+pow(10.0000, ALGEBRAIC[0] - 7.03000)); ALGEBRAIC[232] = (( ALGEBRAIC[230]*ALGEBRAIC[228]*CONSTANTS[263]*STATES[3])/( CONSTANTS[269]*CONSTANTS[268]))/ALGEBRAIC[229]; ALGEBRAIC[231] = ( ALGEBRAIC[230]*CONSTANTS[263]*CONSTANTS[270]*CONSTANTS[271])/( CONSTANTS[269]*CONSTANTS[268]*ALGEBRAIC[183]); ALGEBRAIC[233] = (( ALGEBRAIC[228]*ALGEBRAIC[231]*STATES[4])/( CONSTANTS[270]*CONSTANTS[271]))/ALGEBRAIC[229]; ALGEBRAIC[234] = ALGEBRAIC[227]*( STATES[4]*ALGEBRAIC[232] - STATES[2]*ALGEBRAIC[233]); ALGEBRAIC[236] = - (ALGEBRAIC[226]+ALGEBRAIC[234]); ALGEBRAIC[235] = ( CONSTANTS[272]*1.32900)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+6.64000)+pow(10.0000, ALGEBRAIC[0] - 8.36000)); ALGEBRAIC[70] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199]); ALGEBRAIC[75] = (CONSTANTS[201]+ CONSTANTS[200]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[200]); ALGEBRAIC[185] = ALGEBRAIC[75] - ALGEBRAIC[69]; ALGEBRAIC[186] = ( exp(- ALGEBRAIC[185]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[70])/ALGEBRAIC[60]; ALGEBRAIC[237] = ( ALGEBRAIC[235]*CONSTANTS[274])/( CONSTANTS[273]*ALGEBRAIC[186]); ALGEBRAIC[238] = (( ALGEBRAIC[235]*STATES[2])/CONSTANTS[273] - ( ALGEBRAIC[237]*STATES[6])/CONSTANTS[274])/(1.00000+STATES[2]/CONSTANTS[273]+STATES[6]/CONSTANTS[274]); ALGEBRAIC[239] = CONSTANTS[275]/(1.00000+pow(10.0000, - ALGEBRAIC[0]+6.94000)+pow(10.0000, ALGEBRAIC[0] - 9.35000)); ALGEBRAIC[76] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202]); ALGEBRAIC[81] = (CONSTANTS[204]+ CONSTANTS[203]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[203]); ALGEBRAIC[188] = ALGEBRAIC[81] - ALGEBRAIC[75]; ALGEBRAIC[189] = ( exp(- ALGEBRAIC[188]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[76])/ALGEBRAIC[70]; ALGEBRAIC[240] = (( ALGEBRAIC[239]*CONSTANTS[276])/CONSTANTS[277])*ALGEBRAIC[189]; ALGEBRAIC[241] = (( ALGEBRAIC[240]*STATES[6])/CONSTANTS[276] - ( ALGEBRAIC[239]*STATES[7])/CONSTANTS[277])/(1.00000+STATES[7]/CONSTANTS[277]+STATES[6]/CONSTANTS[276]); ALGEBRAIC[243] = ALGEBRAIC[238] - ALGEBRAIC[241]; ALGEBRAIC[242] = CONSTANTS[278]/(1.00000+pow(ALGEBRAIC[0]/6.80000, - 30.0000)); ALGEBRAIC[12] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[160])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[161]); ALGEBRAIC[23] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[170])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[164]); ALGEBRAIC[82] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[207]); ALGEBRAIC[22] = (CONSTANTS[163]+ CONSTANTS[162]*CONSTANTS[0]*CONSTANTS[130]*log(10.0000)*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[162]); ALGEBRAIC[34] = (CONSTANTS[172]+ CONSTANTS[171]*CONSTANTS[0]*CONSTANTS[130]*log(10.0000)*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[171]); ALGEBRAIC[92] = (CONSTANTS[209]+ CONSTANTS[208]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[208]); ALGEBRAIC[173] = CONSTANTS[256]+ CONSTANTS[255]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]; ALGEBRAIC[191] = ((ALGEBRAIC[92]+ALGEBRAIC[34]+ALGEBRAIC[173]) - ALGEBRAIC[81]) - ALGEBRAIC[22]; ALGEBRAIC[192] = ( exp(- ALGEBRAIC[191]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[82]*ALGEBRAIC[23])/( ALGEBRAIC[76]*ALGEBRAIC[12]*pow(10.0000, - ALGEBRAIC[0])); ALGEBRAIC[244] = ( ALGEBRAIC[242]*CONSTANTS[282]*CONSTANTS[284])/( CONSTANTS[279]*CONSTANTS[281]*ALGEBRAIC[192]); ALGEBRAIC[245] = CONSTANTS[53]*pow(( ((1.00000+STATES[10]/CONSTANTS[49])/(1.00000+( CONSTANTS[51]*STATES[10])/CONSTANTS[49]))*(1.00000+( CONSTANTS[52]*STATES[5])/CONSTANTS[50]))/(1.00000+STATES[5]/CONSTANTS[50]), 4.00000); ALGEBRAIC[246] = (1.00000+STATES[7]/CONSTANTS[279])*(1.00000+STATES[10]/CONSTANTS[281])+STATES[8]/CONSTANTS[282]+ (STATES[9]/CONSTANTS[284])*(1.00000+STATES[8]/CONSTANTS[282]); ALGEBRAIC[247] = (1.00000+STATES[7]/CONSTANTS[280])*(1.00000+STATES[10]/CONSTANTS[283])+STATES[8]/CONSTANTS[47]+ (STATES[9]/CONSTANTS[48])*(1.00000+STATES[8]/CONSTANTS[47]); ALGEBRAIC[248] = ( ((( ALGEBRAIC[242]*STATES[7]*STATES[10])/( CONSTANTS[279]*CONSTANTS[281]))/ALGEBRAIC[246] - (( ALGEBRAIC[244]*STATES[9]*STATES[8])/( CONSTANTS[284]*CONSTANTS[282]))/ALGEBRAIC[246])*(1.00000+ CONSTANTS[285]*ALGEBRAIC[245]*pow(ALGEBRAIC[247]/ALGEBRAIC[246], 3.00000)))/(1.00000+ ALGEBRAIC[245]*pow(ALGEBRAIC[247]/ALGEBRAIC[246], 4.00000)); ALGEBRAIC[250] = ALGEBRAIC[241] - ALGEBRAIC[248]; ALGEBRAIC[249] = ( CONSTANTS[286]*1.01300)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.32000)+pow(10.0000, ALGEBRAIC[0] - 9.15000)); ALGEBRAIC[93] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210]); ALGEBRAIC[109] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[220]); ALGEBRAIC[98] = (CONSTANTS[212]+ CONSTANTS[211]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[211]); ALGEBRAIC[118] = (CONSTANTS[222]+ CONSTANTS[221]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[221]); ALGEBRAIC[194] = (ALGEBRAIC[118]+ALGEBRAIC[98]) - ALGEBRAIC[92]; ALGEBRAIC[195] = ( 1.00000*exp(- ALGEBRAIC[194]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[93]*ALGEBRAIC[82])/ALGEBRAIC[109]; ALGEBRAIC[251] = ( ALGEBRAIC[249]*CONSTANTS[289]*CONSTANTS[288])/( CONSTANTS[287]*ALGEBRAIC[195]); ALGEBRAIC[252] = (( ALGEBRAIC[249]*STATES[8])/CONSTANTS[287] - ( ALGEBRAIC[251]*STATES[12]*STATES[11])/( CONSTANTS[289]*CONSTANTS[288]))/(1.00000+STATES[8]/CONSTANTS[287]+STATES[12]/CONSTANTS[289]+STATES[11]/CONSTANTS[288]); ALGEBRAIC[197] = ALGEBRAIC[118] - ALGEBRAIC[98]; ALGEBRAIC[198] = ( exp(- ALGEBRAIC[197]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[109])/ALGEBRAIC[93]; ALGEBRAIC[253] = ( CONSTANTS[293]*CONSTANTS[292])/( CONSTANTS[291]*ALGEBRAIC[198]); ALGEBRAIC[254] = (( CONSTANTS[293]*STATES[12])/CONSTANTS[291] - ( ALGEBRAIC[253]*STATES[11])/CONSTANTS[292])/(1.00000+STATES[12]/CONSTANTS[291]+STATES[11]/CONSTANTS[292]); ALGEBRAIC[258] = 1.00000+STATES[3]/CONSTANTS[303]+STATES[12]/CONSTANTS[301]+STATES[14]/CONSTANTS[302]+( STATES[12]*STATES[14])/( CONSTANTS[301]*CONSTANTS[302])+( STATES[12]*STATES[14]*STATES[3])/( CONSTANTS[301]*CONSTANTS[302]*CONSTANTS[303])+STATES[16]/CONSTANTS[304]+STATES[15]/CONSTANTS[305]+( STATES[16]*STATES[15])/( CONSTANTS[305]*CONSTANTS[304]); ALGEBRAIC[259] = CONSTANTS[300]*0.000700000*exp( ALGEBRAIC[0]*0.897900); ALGEBRAIC[119] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223]); ALGEBRAIC[124] = (CONSTANTS[225]+ CONSTANTS[224]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(16.0000 - CONSTANTS[224]); ALGEBRAIC[170] = (CONSTANTS[250]+ CONSTANTS[249]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[249]); ALGEBRAIC[171] = (CONSTANTS[252]+ CONSTANTS[251]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[251]); ALGEBRAIC[200] = (((ALGEBRAIC[124]+ALGEBRAIC[171]+ALGEBRAIC[173]) - ALGEBRAIC[11]) - ALGEBRAIC[98]) - ALGEBRAIC[170]; ALGEBRAIC[201] = ( exp(- ALGEBRAIC[200]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[119])/( ALGEBRAIC[1]*ALGEBRAIC[93]*pow(10.0000, - ALGEBRAIC[0])*1.00000); ALGEBRAIC[260] = ( ALGEBRAIC[259]*CONSTANTS[304]*CONSTANTS[305])/( CONSTANTS[301]*CONSTANTS[303]*CONSTANTS[302]*ALGEBRAIC[201]); ALGEBRAIC[261] = (( ALGEBRAIC[259]*STATES[12]*STATES[14]*STATES[3])/( CONSTANTS[302]*CONSTANTS[301]*CONSTANTS[303]) - ( ALGEBRAIC[260]*STATES[16]*STATES[15])/( CONSTANTS[304]*CONSTANTS[305]))/ALGEBRAIC[258]; ALGEBRAIC[263] = (ALGEBRAIC[252] - ALGEBRAIC[254]) - ALGEBRAIC[261]; ALGEBRAIC[125] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+6.21000); ALGEBRAIC[130] = (CONSTANTS[228]+ CONSTANTS[227]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[227]); ALGEBRAIC[206] = ((ALGEBRAIC[22]+ALGEBRAIC[130]) - ALGEBRAIC[124]) - ALGEBRAIC[34]; ALGEBRAIC[207] = ( exp(- ALGEBRAIC[206]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[12]*ALGEBRAIC[125])/( ALGEBRAIC[119]*ALGEBRAIC[23]); ALGEBRAIC[262] = (( CONSTANTS[311]*CONSTANTS[307]*CONSTANTS[308])/( CONSTANTS[309]*CONSTANTS[310]))*ALGEBRAIC[207]; ALGEBRAIC[264] = 1.00000+STATES[9]/CONSTANTS[308]+STATES[16]/CONSTANTS[307]+( STATES[16]*STATES[9])/( CONSTANTS[307]*CONSTANTS[308])+STATES[17]/CONSTANTS[309]+STATES[10]/CONSTANTS[310]+( STATES[17]*STATES[10])/( CONSTANTS[309]*CONSTANTS[310]); ALGEBRAIC[265] = (( ALGEBRAIC[262]*STATES[16]*STATES[9])/( CONSTANTS[308]*CONSTANTS[307]) - ( CONSTANTS[311]*STATES[10]*STATES[17])/( CONSTANTS[310]*CONSTANTS[309]))/ALGEBRAIC[264]; ALGEBRAIC[267] = ALGEBRAIC[261] - ALGEBRAIC[265]; ALGEBRAIC[266] = ( CONSTANTS[312]*0.989000)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.62000)+pow(10.0000, ALGEBRAIC[0] - 8.74000)); ALGEBRAIC[131] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[230])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[231]); ALGEBRAIC[141] = (CONSTANTS[233]+ CONSTANTS[232]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[232]); ALGEBRAIC[209] = ALGEBRAIC[141] - ALGEBRAIC[130]; ALGEBRAIC[210] = ( exp(- ALGEBRAIC[209]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[131])/ALGEBRAIC[125]; ALGEBRAIC[268] = ( ALGEBRAIC[266]*CONSTANTS[314])/( CONSTANTS[313]*ALGEBRAIC[210]); ALGEBRAIC[269] = (( ALGEBRAIC[266]*STATES[17])/CONSTANTS[313] - ( ALGEBRAIC[268]*STATES[18])/CONSTANTS[314])/(1.00000+STATES[17]/CONSTANTS[313]+STATES[18]/CONSTANTS[314]); ALGEBRAIC[271] = ALGEBRAIC[265] - ALGEBRAIC[269]; ALGEBRAIC[255] = (1.00000+STATES[13]/CONSTANTS[295]+STATES[15]/CONSTANTS[298])*(1.00000+STATES[11]/CONSTANTS[297]+STATES[14]/CONSTANTS[298]); ALGEBRAIC[99] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[213]); ALGEBRAIC[108] = (CONSTANTS[218]+ CONSTANTS[217]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[217]); ALGEBRAIC[203] = ((ALGEBRAIC[173]+ALGEBRAIC[171]+ALGEBRAIC[118]) - ALGEBRAIC[170]) - ALGEBRAIC[108]; ALGEBRAIC[204] = ( exp(- ALGEBRAIC[203]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[109])/( ALGEBRAIC[99]*pow(10.0000, - ALGEBRAIC[0])); ALGEBRAIC[256] = ( CONSTANTS[299]*CONSTANTS[295]*CONSTANTS[296]*ALGEBRAIC[204])/( CONSTANTS[297]*CONSTANTS[298]); ALGEBRAIC[257] = (( ALGEBRAIC[256]*STATES[13]*STATES[14])/( CONSTANTS[295]*CONSTANTS[296]) - ( CONSTANTS[299]*STATES[11]*STATES[15])/( CONSTANTS[297]*CONSTANTS[298]))/ALGEBRAIC[255]; ALGEBRAIC[276] = CONSTANTS[324]*( - 0.113400*ALGEBRAIC[0]+1.60690); ALGEBRAIC[153] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239]); ALGEBRAIC[159] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[242]); ALGEBRAIC[158] = (CONSTANTS[241]+ CONSTANTS[240]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[240]); ALGEBRAIC[168] = (CONSTANTS[247]+ CONSTANTS[246]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(1.00000 - CONSTANTS[246]); ALGEBRAIC[218] = (((ALGEBRAIC[168]+ALGEBRAIC[170]) - ALGEBRAIC[158]) - ALGEBRAIC[171]) - ALGEBRAIC[173]; ALGEBRAIC[219] = ( exp(- ALGEBRAIC[218]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[159]*pow(10.0000, - ALGEBRAIC[0]))/ALGEBRAIC[153]; ALGEBRAIC[277] = ( ALGEBRAIC[276]*CONSTANTS[327]*CONSTANTS[328])/( CONSTANTS[325]*CONSTANTS[326]*ALGEBRAIC[219]); ALGEBRAIC[278] = (( ALGEBRAIC[276]*STATES[20]*STATES[15])/( CONSTANTS[325]*CONSTANTS[326]) - ( ALGEBRAIC[277]*STATES[21]*STATES[14])/( CONSTANTS[327]*CONSTANTS[328]))/(1.00000+STATES[20]/CONSTANTS[325]+STATES[15]/CONSTANTS[326]+( STATES[20]*STATES[15])/( CONSTANTS[325]*CONSTANTS[326])+STATES[21]/CONSTANTS[327]+STATES[14]/CONSTANTS[328]+( STATES[21]*STATES[14])/( CONSTANTS[327]*CONSTANTS[328])); ALGEBRAIC[281] = (- ALGEBRAIC[261] - ALGEBRAIC[257])+ALGEBRAIC[278]; ALGEBRAIC[282] = (ALGEBRAIC[261]+ALGEBRAIC[257]) - ALGEBRAIC[278]; ALGEBRAIC[273] = ( CONSTANTS[319]*1.05000)/(1.00000+pow(10.0000, - ALGEBRAIC[0]+5.58000)+pow(10.0000, ALGEBRAIC[0] - 8.79000)); ALGEBRAIC[142] = 1.00000+pow(10.0000, CONSTANTS[234] - ALGEBRAIC[0])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[235])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[236]); ALGEBRAIC[152] = (CONSTANTS[238]+ CONSTANTS[237]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(9.00000 - CONSTANTS[237]); ALGEBRAIC[215] = (((ALGEBRAIC[158]+ALGEBRAIC[22]) - ALGEBRAIC[173]) - ALGEBRAIC[152]) - ALGEBRAIC[34]; ALGEBRAIC[216] = ( exp(- ALGEBRAIC[215]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[153]*ALGEBRAIC[12]*pow(10.0000, - ALGEBRAIC[0]))/( ALGEBRAIC[142]*ALGEBRAIC[23]); ALGEBRAIC[274] = ( ALGEBRAIC[273]*CONSTANTS[322]*CONSTANTS[323])/( CONSTANTS[320]*CONSTANTS[321]*ALGEBRAIC[216]); ALGEBRAIC[275] = (( ALGEBRAIC[273]*STATES[19]*STATES[9])/( CONSTANTS[320]*CONSTANTS[321]) - ( ALGEBRAIC[274]*STATES[20]*STATES[10])/( CONSTANTS[322]*CONSTANTS[323]))/(1.00000+STATES[19]/CONSTANTS[320]+STATES[9]/CONSTANTS[321]+( STATES[19]*STATES[9])/( CONSTANTS[320]*CONSTANTS[321])+STATES[10]/CONSTANTS[323]+STATES[20]/CONSTANTS[322]+( STATES[20]*STATES[10])/( CONSTANTS[322]*CONSTANTS[323])); ALGEBRAIC[283] = ALGEBRAIC[275] - ALGEBRAIC[278]; ALGEBRAIC[45] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[187])+ (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[181]); ALGEBRAIC[55] = 1.00000+pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189]); ALGEBRAIC[176] = ( exp(- CONSTANTS[262]/( CONSTANTS[0]*CONSTANTS[130]))*pow(10.0000, - ALGEBRAIC[0])*ALGEBRAIC[12]*ALGEBRAIC[55])/( ALGEBRAIC[45]*ALGEBRAIC[23]); ALGEBRAIC[285] = ( (CONSTANTS[329]/ALGEBRAIC[176])*CONSTANTS[331]*CONSTANTS[333])/( CONSTANTS[332]*CONSTANTS[330]); ALGEBRAIC[286] = (( ALGEBRAIC[285]*STATES[10]*STATES[22])/( CONSTANTS[331]*CONSTANTS[333]) - ( CONSTANTS[329]*STATES[9]*STATES[23])/( CONSTANTS[332]*CONSTANTS[330]))/(1.00000+STATES[9]/CONSTANTS[332]+STATES[23]/CONSTANTS[55]+( STATES[23]*STATES[9])/( CONSTANTS[332]*CONSTANTS[330])+STATES[10]/CONSTANTS[331]+( STATES[22]*STATES[10])/( CONSTANTS[333]*CONSTANTS[331])); ALGEBRAIC[289] = - ALGEBRAIC[286]; ALGEBRAIC[13] = 1.00000/ALGEBRAIC[12]; ALGEBRAIC[14] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])*ALGEBRAIC[13]; ALGEBRAIC[15] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[160])*ALGEBRAIC[13]; ALGEBRAIC[16] = (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[161])*ALGEBRAIC[13]; ALGEBRAIC[17] = 0.00000*ALGEBRAIC[13]+ 1.00000*ALGEBRAIC[14]+ 0.00000*ALGEBRAIC[15]+ 0.00000*ALGEBRAIC[16]; ALGEBRAIC[24] = 1.00000/ALGEBRAIC[23]; ALGEBRAIC[25] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])*ALGEBRAIC[24]; ALGEBRAIC[26] = (( ALGEBRAIC[24]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[170]); ALGEBRAIC[27] = (( ALGEBRAIC[24]*CONSTANTS[133])/CONSTANTS[134])*pow(10.0000, CONSTANTS[164]); ALGEBRAIC[28] = 0.00000*ALGEBRAIC[24]+ 1.00000*ALGEBRAIC[25]+ 0.00000*ALGEBRAIC[26]+ 0.00000*ALGEBRAIC[27]; ALGEBRAIC[46] = 1.00000/ALGEBRAIC[45]; ALGEBRAIC[48] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])*ALGEBRAIC[46]; ALGEBRAIC[50] = ALGEBRAIC[48]; ALGEBRAIC[56] = 1.00000/ALGEBRAIC[55]; ALGEBRAIC[57] = ALGEBRAIC[56]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189]); ALGEBRAIC[58] = 0.00000*ALGEBRAIC[56]+ 1.00000*ALGEBRAIC[57]; ALGEBRAIC[174] = (((ALGEBRAIC[17]+ALGEBRAIC[58]) - ALGEBRAIC[50]) - ALGEBRAIC[28])+(((CONSTANTS[162]+CONSTANTS[190]) - CONSTANTS[188]) - CONSTANTS[171]); ALGEBRAIC[35] = 1.00000+pow(10.0000, CONSTANTS[177] - ALGEBRAIC[0])+ (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[178]); ALGEBRAIC[36] = 1.00000/ALGEBRAIC[35]; ALGEBRAIC[37] = ALGEBRAIC[36]*pow(10.0000, CONSTANTS[177] - ALGEBRAIC[0]); ALGEBRAIC[38] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[178])*ALGEBRAIC[36]; ALGEBRAIC[39] = 0.00000*ALGEBRAIC[36]+ALGEBRAIC[37]+ 0.00000*ALGEBRAIC[38]; ALGEBRAIC[178] = (( 2.00000*ALGEBRAIC[28] - ALGEBRAIC[17]) - ALGEBRAIC[39])+(( 2.00000*CONSTANTS[171] - CONSTANTS[162]) - CONSTANTS[179]); ALGEBRAIC[2] = 1.00000/ALGEBRAIC[1]; ALGEBRAIC[3] = pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])*ALGEBRAIC[2]; ALGEBRAIC[6] = 1.00000*ALGEBRAIC[3]; ALGEBRAIC[61] = 1.00000/ALGEBRAIC[60]; ALGEBRAIC[62] = ALGEBRAIC[61]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195]); ALGEBRAIC[64] = ALGEBRAIC[62]; ALGEBRAIC[181] = (ALGEBRAIC[64] - ALGEBRAIC[6])+(1.00000 - CONSTANTS[151]); ALGEBRAIC[71] = 1.00000/ALGEBRAIC[70]; ALGEBRAIC[72] = ALGEBRAIC[71]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199]); ALGEBRAIC[73] = ALGEBRAIC[72]; ALGEBRAIC[184] = (ALGEBRAIC[73] - ALGEBRAIC[64])+(CONSTANTS[200] - CONSTANTS[197]); ALGEBRAIC[77] = 1.00000/ALGEBRAIC[76]; ALGEBRAIC[78] = ALGEBRAIC[77]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202]); ALGEBRAIC[79] = ALGEBRAIC[78]; ALGEBRAIC[187] = (ALGEBRAIC[79] - ALGEBRAIC[73])+(CONSTANTS[203] - CONSTANTS[200]); ALGEBRAIC[83] = 1.00000/ALGEBRAIC[82]; ALGEBRAIC[84] = ALGEBRAIC[83]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]); ALGEBRAIC[85] = ALGEBRAIC[83]*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]); ALGEBRAIC[87] = ALGEBRAIC[84]+ 2.00000*ALGEBRAIC[85]; ALGEBRAIC[190] = (((((ALGEBRAIC[28]+ALGEBRAIC[87]) - ALGEBRAIC[79]) - ALGEBRAIC[17])+CONSTANTS[171]+CONSTANTS[208]) - CONSTANTS[203]) - CONSTANTS[162]; ALGEBRAIC[94] = 1.00000/ALGEBRAIC[93]; ALGEBRAIC[95] = ALGEBRAIC[94]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210]); ALGEBRAIC[96] = ALGEBRAIC[95]; ALGEBRAIC[110] = 1.00000/ALGEBRAIC[109]; ALGEBRAIC[111] = ALGEBRAIC[110]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219]); ALGEBRAIC[113] = ALGEBRAIC[111]; ALGEBRAIC[193] = ((ALGEBRAIC[113]+ALGEBRAIC[96]) - ALGEBRAIC[87])+((CONSTANTS[221]+CONSTANTS[211]) - CONSTANTS[208]); ALGEBRAIC[196] = (ALGEBRAIC[113] - ALGEBRAIC[96])+(CONSTANTS[221] - CONSTANTS[211]); ALGEBRAIC[120] = 1.00000/ALGEBRAIC[119]; ALGEBRAIC[121] = ALGEBRAIC[120]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223]); ALGEBRAIC[122] = ALGEBRAIC[121]; ALGEBRAIC[199] = ((ALGEBRAIC[122] - ALGEBRAIC[96]) - ALGEBRAIC[6])+((((CONSTANTS[224]+CONSTANTS[251]) - CONSTANTS[211]) - CONSTANTS[151]) - CONSTANTS[249]); ALGEBRAIC[100] = 1.00000/ALGEBRAIC[99]; ALGEBRAIC[101] = ALGEBRAIC[100]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216]); ALGEBRAIC[103] = ALGEBRAIC[101]; ALGEBRAIC[202] = (ALGEBRAIC[113] - ALGEBRAIC[103])+(((CONSTANTS[221]+CONSTANTS[251]) - CONSTANTS[249]) - CONSTANTS[217]); ALGEBRAIC[126] = 1.00000/ALGEBRAIC[125]; ALGEBRAIC[127] = ALGEBRAIC[126]*pow(10.0000, - ALGEBRAIC[0]+6.21000); ALGEBRAIC[128] = ALGEBRAIC[127]; ALGEBRAIC[205] = (((ALGEBRAIC[128]+ALGEBRAIC[17]) - ALGEBRAIC[122]) - ALGEBRAIC[28])+(((CONSTANTS[227]+CONSTANTS[162]) - CONSTANTS[224]) - CONSTANTS[171]); ALGEBRAIC[132] = 1.00000/ALGEBRAIC[131]; ALGEBRAIC[133] = ALGEBRAIC[132]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229]); ALGEBRAIC[136] = ALGEBRAIC[133]; ALGEBRAIC[208] = (ALGEBRAIC[136] - ALGEBRAIC[128])+(CONSTANTS[232] - CONSTANTS[227]); ALGEBRAIC[143] = 1.00000/ALGEBRAIC[142]; ALGEBRAIC[144] = ALGEBRAIC[143]*pow(10.0000, CONSTANTS[234] - ALGEBRAIC[0]); ALGEBRAIC[147] = ALGEBRAIC[144]; ALGEBRAIC[211] = (ALGEBRAIC[147] - ALGEBRAIC[136])+((CONSTANTS[253]+CONSTANTS[237]) - CONSTANTS[232]); ALGEBRAIC[154] = 1.00000/ALGEBRAIC[153]; ALGEBRAIC[155] = ALGEBRAIC[154]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239]); ALGEBRAIC[156] = ALGEBRAIC[155]; ALGEBRAIC[214] = (((ALGEBRAIC[156]+ALGEBRAIC[17]) - ALGEBRAIC[147]) - ALGEBRAIC[28])+(((CONSTANTS[240]+CONSTANTS[162]) - CONSTANTS[237]) - CONSTANTS[171]); ALGEBRAIC[160] = 1.00000/ALGEBRAIC[159]; ALGEBRAIC[161] = ALGEBRAIC[160]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245]); ALGEBRAIC[163] = ALGEBRAIC[161]; ALGEBRAIC[217] = (ALGEBRAIC[163] - ALGEBRAIC[156])+(((CONSTANTS[246]+CONSTANTS[249]) - CONSTANTS[240]) - CONSTANTS[251]); ALGEBRAIC[172] = (CONSTANTS[254]+ CONSTANTS[253]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(0.00000 - CONSTANTS[253]); ALGEBRAIC[212] = (ALGEBRAIC[172]+ALGEBRAIC[152]) - ALGEBRAIC[141]; ALGEBRAIC[213] = ( exp(- ALGEBRAIC[212]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[142])/ALGEBRAIC[131]; ALGEBRAIC[270] = ( CONSTANTS[318]*CONSTANTS[317])/( CONSTANTS[316]*ALGEBRAIC[213]); ALGEBRAIC[272] = (( CONSTANTS[318]*STATES[18])/CONSTANTS[316] - ( ALGEBRAIC[270]*STATES[19])/CONSTANTS[317])/(1.00000+STATES[19]/CONSTANTS[317]+STATES[18]/CONSTANTS[316]); ALGEBRAIC[44] = (CONSTANTS[180]+ CONSTANTS[179]*log(10.0000)*CONSTANTS[0]*CONSTANTS[130]*ALGEBRAIC[0]) - CONSTANTS[143]*(4.00000 - CONSTANTS[179]); ALGEBRAIC[179] = ( 2.00000*ALGEBRAIC[34] - ALGEBRAIC[22]) - ALGEBRAIC[44]; ALGEBRAIC[180] = ( exp(- ALGEBRAIC[179]/( CONSTANTS[0]*CONSTANTS[130]))*pow(ALGEBRAIC[23], 2.00000))/( ALGEBRAIC[12]*ALGEBRAIC[35]); ALGEBRAIC[287] = ( CONSTANTS[334]*pow(CONSTANTS[337], 2.00000))/( CONSTANTS[335]*CONSTANTS[336]*ALGEBRAIC[180]); ALGEBRAIC[290] = (( CONSTANTS[334]*STATES[10]*STATES[5])/( CONSTANTS[336]*CONSTANTS[335]) - ALGEBRAIC[287]*pow(STATES[9]/CONSTANTS[337], 2.00000))/(1.00000+STATES[10]/CONSTANTS[336]+STATES[5]/CONSTANTS[335]+( STATES[10]*STATES[5])/( CONSTANTS[336]*CONSTANTS[335])+( 2.00000*STATES[9])/CONSTANTS[337]+pow(STATES[9], 2.00000)/pow(CONSTANTS[337], 2.00000)); ALGEBRAIC[293] = ALGEBRAIC[174]*- ALGEBRAIC[286]+ ALGEBRAIC[178]*ALGEBRAIC[290]+ ALGEBRAIC[184]*ALGEBRAIC[238]+ ALGEBRAIC[181]*(ALGEBRAIC[226]+ALGEBRAIC[234])+ ALGEBRAIC[187]*ALGEBRAIC[241]+ ALGEBRAIC[190]*ALGEBRAIC[248]+ ALGEBRAIC[193]*ALGEBRAIC[252]+ ALGEBRAIC[196]*ALGEBRAIC[254]+ ALGEBRAIC[199]*ALGEBRAIC[261]+ ALGEBRAIC[205]*ALGEBRAIC[265]+ ALGEBRAIC[208]*ALGEBRAIC[269]+ ALGEBRAIC[211]*ALGEBRAIC[272]+ ALGEBRAIC[214]*ALGEBRAIC[275]+ ALGEBRAIC[217]*ALGEBRAIC[278]+ ALGEBRAIC[202]*ALGEBRAIC[257]; ALGEBRAIC[299] = ALGEBRAIC[286]; ALGEBRAIC[279] = (CONSTANTS[38] != 5.00000&&CONSTANTS[38] != 45.0000 ? CONSTANTS[22] : CONSTANTS[38] != 5.00000&&CONSTANTS[38]==45.0000&&VOI>=110.000 ? CONSTANTS[22] : CONSTANTS[38]==5.00000&&VOI>30.0000 ? CONSTANTS[22] : 0.00000); ALGEBRAIC[284] = ( ALGEBRAIC[279]*STATES[10])/(CONSTANTS[54]+STATES[10]); ALGEBRAIC[300] = (((- ALGEBRAIC[286] - ALGEBRAIC[290]) - ALGEBRAIC[248])+ALGEBRAIC[265]+ALGEBRAIC[275]) - ALGEBRAIC[284]; ALGEBRAIC[301] = (((ALGEBRAIC[286]+ 2.00000*ALGEBRAIC[290]+ALGEBRAIC[248]) - ALGEBRAIC[265]) - ALGEBRAIC[275])+ALGEBRAIC[284]; ALGEBRAIC[302] = - ALGEBRAIC[290]; ALGEBRAIC[303] = (- (ALGEBRAIC[226]+ALGEBRAIC[234]) - ALGEBRAIC[261])+ALGEBRAIC[284]; ALGEBRAIC[304] = (ALGEBRAIC[226]+ALGEBRAIC[234]) - ALGEBRAIC[238]; ALGEBRAIC[305] = ALGEBRAIC[248] - ALGEBRAIC[252]; ALGEBRAIC[306] = ALGEBRAIC[252]+ALGEBRAIC[254]+ALGEBRAIC[257]; ALGEBRAIC[307] = - ALGEBRAIC[257]; ALGEBRAIC[308] = ALGEBRAIC[269] - ALGEBRAIC[272]; ALGEBRAIC[309] = ALGEBRAIC[272] - ALGEBRAIC[275]; ALGEBRAIC[310] = ALGEBRAIC[278]; ALGEBRAIC[291] = ( log(10.0000)*CONSTANTS[338]*pow(10.0000, - ALGEBRAIC[0] - 6.87000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 6.87000), 2.00000)+( log(10.0000)*CONSTANTS[339]*pow(10.0000, - ALGEBRAIC[0] - 8.30000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 8.30000), 2.00000)+( log(10.0000)*CONSTANTS[340]*pow(10.0000, - ALGEBRAIC[0] - 4.80000))/pow(pow(10.0000, - ALGEBRAIC[0])+pow(10.0000, - 4.80000), 2.00000); ALGEBRAIC[7] = ( pow(10.0000, CONSTANTS[149])*(ALGEBRAIC[1] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149])))/( CONSTANTS[134]*pow(ALGEBRAIC[1], 2.00000)); ALGEBRAIC[18] = ( pow(10.0000, CONSTANTS[159])*(ALGEBRAIC[12] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159])))/( CONSTANTS[134]*pow(ALGEBRAIC[12], 2.00000)); ALGEBRAIC[29] = ( pow(10.0000, CONSTANTS[169])*(ALGEBRAIC[23] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169])))/( CONSTANTS[134]*pow(ALGEBRAIC[23], 2.00000)); ALGEBRAIC[40] = ( pow(10.0000, CONSTANTS[177])*(ALGEBRAIC[35] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[177])))/( CONSTANTS[134]*pow(ALGEBRAIC[35], 2.00000)); ALGEBRAIC[51] = ( pow(10.0000, CONSTANTS[186])*(ALGEBRAIC[45] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186])))/( CONSTANTS[134]*pow(ALGEBRAIC[45], 2.00000)); ALGEBRAIC[59] = ( pow(10.0000, CONSTANTS[189])*(ALGEBRAIC[55] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[189])))/( CONSTANTS[134]*pow(ALGEBRAIC[55], 2.00000)); ALGEBRAIC[65] = ( pow(10.0000, CONSTANTS[195])*(ALGEBRAIC[60] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195])))/( CONSTANTS[134]*pow(ALGEBRAIC[60], 2.00000)); ALGEBRAIC[74] = ( pow(10.0000, CONSTANTS[199])*(ALGEBRAIC[70] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[199])))/( CONSTANTS[134]*pow(ALGEBRAIC[70], 2.00000)); ALGEBRAIC[80] = ( pow(10.0000, CONSTANTS[202])*(ALGEBRAIC[76] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[202])))/( CONSTANTS[134]*pow(ALGEBRAIC[76], 2.00000)); ALGEBRAIC[88] = ( ALGEBRAIC[82]*(pow(10.0000, CONSTANTS[205])+ 2.00000*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])) - (pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+ 2.00000*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]))*(pow(10.0000, CONSTANTS[205])+ 2.00000*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])))/( CONSTANTS[134]*pow(ALGEBRAIC[82], 2.00000)); ALGEBRAIC[97] = ( pow(10.0000, CONSTANTS[210])*(ALGEBRAIC[93] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[210])))/( CONSTANTS[134]*pow(ALGEBRAIC[93], 2.00000)); ALGEBRAIC[104] = ( pow(10.0000, CONSTANTS[216])*(ALGEBRAIC[99] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216])))/( CONSTANTS[134]*pow(ALGEBRAIC[99], 2.00000)); ALGEBRAIC[114] = ( pow(10.0000, CONSTANTS[219])*(ALGEBRAIC[109] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219])))/( CONSTANTS[134]*pow(ALGEBRAIC[109], 2.00000)); ALGEBRAIC[123] = ( pow(10.0000, CONSTANTS[223])*(ALGEBRAIC[119] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[223])))/( CONSTANTS[134]*pow(ALGEBRAIC[119], 2.00000)); ALGEBRAIC[129] = ( pow(10.0000, CONSTANTS[226])*(ALGEBRAIC[125] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[226])))/( CONSTANTS[134]*pow(ALGEBRAIC[125], 2.00000)); ALGEBRAIC[137] = ( pow(10.0000, CONSTANTS[229])*(ALGEBRAIC[131] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229])))/( CONSTANTS[134]*pow(ALGEBRAIC[131], 2.00000)); ALGEBRAIC[148] = ( pow(10.0000, CONSTANTS[234])*(ALGEBRAIC[142] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[234])))/( CONSTANTS[134]*pow(ALGEBRAIC[142], 2.00000)); ALGEBRAIC[157] = ( pow(10.0000, CONSTANTS[239])*(ALGEBRAIC[153] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[239])))/( CONSTANTS[134]*pow(ALGEBRAIC[153], 2.00000)); ALGEBRAIC[164] = ( pow(10.0000, CONSTANTS[245])*(ALGEBRAIC[159] - pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245])))/( CONSTANTS[134]*pow(ALGEBRAIC[159], 2.00000)); ALGEBRAIC[292] = log(10.0000)*pow(10.0000, - ALGEBRAIC[0])*CONSTANTS[134]*(1.00000+ ALGEBRAIC[7]*STATES[3]+ ALGEBRAIC[18]*STATES[10]+ ALGEBRAIC[29]*STATES[9]+ ALGEBRAIC[40]*STATES[5]+ ALGEBRAIC[51]*STATES[23]+ ALGEBRAIC[59]*STATES[22]+ ALGEBRAIC[65]*STATES[2]+ ALGEBRAIC[74]*STATES[6]+ ALGEBRAIC[80]*STATES[7]+ ALGEBRAIC[88]*STATES[8]+ ALGEBRAIC[97]*STATES[12]+ ALGEBRAIC[114]*STATES[11]+ ALGEBRAIC[104]*STATES[13]+ ALGEBRAIC[123]*STATES[16]+ ALGEBRAIC[129]*STATES[17]+ ALGEBRAIC[137]*STATES[18]+ ALGEBRAIC[148]*STATES[19]+ ALGEBRAIC[157]*STATES[20]+ ALGEBRAIC[164]*STATES[21]); ALGEBRAIC[294] = ALGEBRAIC[293]/(ALGEBRAIC[291]+ALGEBRAIC[292]); ALGEBRAIC[8] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[149]+CONSTANTS[150]))/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[19] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[159]+CONSTANTS[160]))/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[31] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[169]+CONSTANTS[170]))/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[41] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[177]+CONSTANTS[178]))/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[52] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[186]+CONSTANTS[187]))/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[66] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[195]+CONSTANTS[196]))/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[89] = ( - (pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])+ 2.00000*pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206]))*pow(10.0000, CONSTANTS[207]))/( CONSTANTS[134]*pow(ALGEBRAIC[82], 2.00000)); ALGEBRAIC[105] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[216]+CONSTANTS[213]))/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[115] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[219]+CONSTANTS[220]))/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[138] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[229]+CONSTANTS[230]))/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[149] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[234]+CONSTANTS[235]))/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[165] = ( (- pow(10.0000, - ALGEBRAIC[0])/CONSTANTS[134])*pow(10.0000, CONSTANTS[245]+CONSTANTS[242]))/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[295] = ( ALGEBRAIC[8]*STATES[3]+ ALGEBRAIC[19]*STATES[10]+ ALGEBRAIC[31]*STATES[9]+ ALGEBRAIC[41]*STATES[5]+ ALGEBRAIC[52]*STATES[23]+ CONSTANTS[26]*STATES[22]+ ALGEBRAIC[66]*STATES[2]+ CONSTANTS[27]*STATES[6]+ CONSTANTS[28]*STATES[7]+ ALGEBRAIC[89]*STATES[8]+ CONSTANTS[29]*STATES[12]+ ALGEBRAIC[115]*STATES[11]+ ALGEBRAIC[105]*STATES[13]+ CONSTANTS[30]*STATES[16]+ CONSTANTS[31]*STATES[17]+ ALGEBRAIC[138]*STATES[18]+ ALGEBRAIC[149]*STATES[19]+ CONSTANTS[32]*STATES[20]+ ALGEBRAIC[165]*STATES[21])/(ALGEBRAIC[291]+ALGEBRAIC[292]); ALGEBRAIC[10] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[149]+CONSTANTS[150])*log(10.0000))/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[21] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[159]+CONSTANTS[160])*log(10.0000))/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[33] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[169]+CONSTANTS[170])*log(10.0000))/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[43] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[177]+CONSTANTS[178])*log(10.0000))/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[54] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[186]+CONSTANTS[187])*log(10.0000))/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[68] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[195]+CONSTANTS[196])*log(10.0000))/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[91] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[207])*( ALGEBRAIC[82]*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[205])*log(10.0000) - pow(10.0000, - 2.00000*ALGEBRAIC[0]+CONSTANTS[205]+CONSTANTS[206])*2.00000*log(10.0000)))/pow(ALGEBRAIC[82], 2.00000); ALGEBRAIC[107] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[216]+CONSTANTS[213])*log(10.0000))/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[117] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[219]+CONSTANTS[220])*log(10.0000))/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[140] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[229]+CONSTANTS[230])*log(10.0000))/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[151] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[234]+CONSTANTS[235])*log(10.0000))/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[167] = ( (STATES[1]/CONSTANTS[134])*pow(10.0000, - ALGEBRAIC[0]+CONSTANTS[245]+CONSTANTS[242])*log(10.0000))/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[9] = (( ALGEBRAIC[1]*pow(10.0000, CONSTANTS[150]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[150]))/CONSTANTS[134])/pow(ALGEBRAIC[1], 2.00000); ALGEBRAIC[20] = (( ALGEBRAIC[12]*pow(10.0000, CONSTANTS[160]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[160]))/CONSTANTS[134])/pow(ALGEBRAIC[12], 2.00000); ALGEBRAIC[32] = (( ALGEBRAIC[23]*pow(10.0000, CONSTANTS[170]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[170]))/CONSTANTS[134])/pow(ALGEBRAIC[23], 2.00000); ALGEBRAIC[42] = (( ALGEBRAIC[35]*pow(10.0000, CONSTANTS[178]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[178]))/CONSTANTS[134])/pow(ALGEBRAIC[35], 2.00000); ALGEBRAIC[53] = (( ALGEBRAIC[45]*pow(10.0000, CONSTANTS[187]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[187]))/CONSTANTS[134])/pow(ALGEBRAIC[45], 2.00000); ALGEBRAIC[67] = (( ALGEBRAIC[60]*pow(10.0000, CONSTANTS[196]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[196]))/CONSTANTS[134])/pow(ALGEBRAIC[60], 2.00000); ALGEBRAIC[90] = (( ALGEBRAIC[82]*pow(10.0000, CONSTANTS[207]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[207]))/CONSTANTS[134])/pow(ALGEBRAIC[82], 2.00000); ALGEBRAIC[106] = (( ALGEBRAIC[99]*pow(10.0000, CONSTANTS[213]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[213]))/CONSTANTS[134])/pow(ALGEBRAIC[99], 2.00000); ALGEBRAIC[116] = (( ALGEBRAIC[109]*pow(10.0000, CONSTANTS[220]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[220]))/CONSTANTS[134])/pow(ALGEBRAIC[109], 2.00000); ALGEBRAIC[139] = (( ALGEBRAIC[131]*pow(10.0000, CONSTANTS[230]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[230]))/CONSTANTS[134])/pow(ALGEBRAIC[131], 2.00000); ALGEBRAIC[150] = (( ALGEBRAIC[142]*pow(10.0000, CONSTANTS[235]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[235]))/CONSTANTS[134])/pow(ALGEBRAIC[142], 2.00000); ALGEBRAIC[166] = (( ALGEBRAIC[159]*pow(10.0000, CONSTANTS[242]))/CONSTANTS[134] - ( (STATES[1]/CONSTANTS[134])*pow(10.0000, 2.00000*CONSTANTS[242]))/CONSTANTS[134])/pow(ALGEBRAIC[159], 2.00000); ALGEBRAIC[296] = - 1.00000 - ( ALGEBRAIC[20]*STATES[10]+ ALGEBRAIC[32]*STATES[9]+ ALGEBRAIC[42]*STATES[5]+ ALGEBRAIC[9]*STATES[3]+ ALGEBRAIC[53]*STATES[23]+ ALGEBRAIC[67]*STATES[2]+ ALGEBRAIC[90]*STATES[8]+ ALGEBRAIC[106]*STATES[13]+ ALGEBRAIC[116]*STATES[11]+ ALGEBRAIC[150]*STATES[19]+ ALGEBRAIC[139]*STATES[18]+ ALGEBRAIC[166]*STATES[21]); ALGEBRAIC[297] = ( ALGEBRAIC[21]*STATES[10]+ ALGEBRAIC[33]*STATES[9]+ ALGEBRAIC[43]*STATES[5]+ ALGEBRAIC[10]*STATES[3]+ ALGEBRAIC[54]*STATES[23]+ ALGEBRAIC[68]*STATES[2]+ ALGEBRAIC[91]*STATES[8]+ ALGEBRAIC[107]*STATES[13]+ ALGEBRAIC[117]*STATES[11]+ ALGEBRAIC[151]*STATES[19]+ ALGEBRAIC[140]*STATES[18]+ ALGEBRAIC[167]*STATES[21])/ALGEBRAIC[296]; ALGEBRAIC[5] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[150])*ALGEBRAIC[2]; ALGEBRAIC[49] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[187])*ALGEBRAIC[46]; ALGEBRAIC[63] = (( ALGEBRAIC[61]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[196]); ALGEBRAIC[86] = (( ALGEBRAIC[83]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[207]); ALGEBRAIC[102] = (( ALGEBRAIC[100]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[213]); ALGEBRAIC[112] = (( ALGEBRAIC[110]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[220]); ALGEBRAIC[135] = (( ALGEBRAIC[132]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[230]); ALGEBRAIC[146] = (( ALGEBRAIC[143]*STATES[1])/CONSTANTS[134])*pow(10.0000, CONSTANTS[235]); ALGEBRAIC[162] = (STATES[1]/CONSTANTS[134])*pow(10.0000, CONSTANTS[242])*ALGEBRAIC[160]; ALGEBRAIC[311] = ( ALGEBRAIC[15]*ALGEBRAIC[300]+ ALGEBRAIC[26]*ALGEBRAIC[301]+ ALGEBRAIC[38]*ALGEBRAIC[302]+ ALGEBRAIC[5]*ALGEBRAIC[303]+ ALGEBRAIC[49]*ALGEBRAIC[299]+ ALGEBRAIC[63]*ALGEBRAIC[304]+ ALGEBRAIC[86]*ALGEBRAIC[305]+ ALGEBRAIC[102]*ALGEBRAIC[307]+ ALGEBRAIC[112]*ALGEBRAIC[306]+ ALGEBRAIC[146]*ALGEBRAIC[309]+ ALGEBRAIC[135]*ALGEBRAIC[308]+ ALGEBRAIC[162]*ALGEBRAIC[310])/ALGEBRAIC[296]; ALGEBRAIC[4] = (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[144])*ALGEBRAIC[2]; ALGEBRAIC[30] = ((ALGEBRAIC[28]+ALGEBRAIC[6]) - ALGEBRAIC[17])+(((CONSTANTS[171]+CONSTANTS[151]) - CONSTANTS[162]) - CONSTANTS[253]); ALGEBRAIC[47] = (CONSTANTS[133]/CONSTANTS[134])*pow(10.0000, CONSTANTS[181])*ALGEBRAIC[46]; ALGEBRAIC[134] = (( ALGEBRAIC[132]*CONSTANTS[133])/CONSTANTS[134])*pow(10.0000, CONSTANTS[231]); ALGEBRAIC[145] = (( ALGEBRAIC[143]*CONSTANTS[133])/CONSTANTS[134])*pow(10.0000, CONSTANTS[236]); ALGEBRAIC[175] = ((ALGEBRAIC[34]+ALGEBRAIC[11]+ALGEBRAIC[173]) - ALGEBRAIC[172]) - ALGEBRAIC[22]; ALGEBRAIC[177] = ( exp(- ALGEBRAIC[175]/( CONSTANTS[0]*CONSTANTS[130]))*ALGEBRAIC[23]*ALGEBRAIC[1])/( ALGEBRAIC[12]*pow(10.0000, - ALGEBRAIC[0])); ALGEBRAIC[280] = ALGEBRAIC[184]*ALGEBRAIC[238]+ ALGEBRAIC[181]*(ALGEBRAIC[226]+ALGEBRAIC[234])+ ALGEBRAIC[187]*ALGEBRAIC[241]+ ALGEBRAIC[190]*ALGEBRAIC[248]+ ALGEBRAIC[193]*ALGEBRAIC[252]+ ALGEBRAIC[196]*ALGEBRAIC[254]+ ALGEBRAIC[199]*ALGEBRAIC[261]+ ALGEBRAIC[205]*ALGEBRAIC[265]+ ALGEBRAIC[208]*ALGEBRAIC[269]+ ALGEBRAIC[211]*ALGEBRAIC[272]+ ALGEBRAIC[214]*ALGEBRAIC[275]+ ALGEBRAIC[217]*ALGEBRAIC[278]+ ALGEBRAIC[202]*ALGEBRAIC[257]; ALGEBRAIC[288] = ALGEBRAIC[174]*- ALGEBRAIC[286]; ALGEBRAIC[298] = 1.00000 - ALGEBRAIC[297]*ALGEBRAIC[295]; }