37)Given the values of ΔH∘rxn, ΔS∘rxn, and T below, determine ΔSuniv.
1) ΔH∘rxn=− 90 kJ , ΔSrxn=− 145 J/K , T= 309 K
2) ΔH∘rxn=− 90 kJ , ΔSrxn=− 145 J/K , T= 753 K
3) ΔH∘rxn=+ 90 kJ , ΔSrxn=− 145 J/K , T= 309 K
4) ΔH∘rxn=− 90 kJ , ΔSrxn=+ 145 J/K , T= 408 K
37)Given the values of ΔH∘rxn, ΔS∘rxn, and T below, determine ΔSuniv. 1) ΔH∘rxn=− 90 kJ ,...
Given the values of ΔH∘rxn , ΔS∘rxn , and T below, determine ΔSuniv . 1. ΔH∘rxn= 83 kJ , ΔSrxn= 152 J/K , T= 308K (spontaneous or nonspontaneous ) 2. ΔH∘rxn= 83 kJ , ΔSrxn= 152 J/K , T= 752 K (spontaneous or nonspontaneous ) 3. ΔH∘rxn= 83 kJ , ΔSrxn=− 152 J/K , T= 308 K (spontaneous or nonspontaneous ) 4. ΔH∘rxn=− 83 kJ , ΔSrxn= 152 J/K , T= 397 K (spontaneous or nonspontaneous )
Given the values of ΔH∘rxn, ΔS∘rxn, and T below, determine ΔSuniv. ΔH∘rxn=− 80 kJ , ΔSrxn=− 155 J/K , T= 300 K ΔH∘rxn=− 80 kJ , ΔSrxn=− 155 J/K , T= 750 K ΔH∘rxn=+ 80 kJ , ΔSrxn=− 155 J/K , T= 300 K ΔH∘rxn=− 80 kJ , ΔSrxn=+ 155 J/K , T= 404 K
Given the values of ΔH∘rxn, ΔS∘rxn, and T below, determine ΔSuniv and whether they are spontaneous or nonspontaneous: A. ΔH∘rxn= 80 kJ , ΔSrxn= 143 J/K , T= 290 K B. ΔH∘rxn= 80 kJ , ΔSrxn= 143 J/K , T= 764 K C. ΔH∘rxn= 80 kJ , ΔSrxn=− 143 J/K , T= 290 K D. ΔH∘rxn=− 80 kJ , ΔSrxn= 143 J/K , T= 396 K
Given the values of ΔH∘rxn,ΔS∘rxn, and T below, determine ΔSuniv A) ΔH∘rxn = 125 kJ , ΔS∘rxn = −257 J/K , T= 296 K . B) ΔH∘rxn= −125 kJ, ΔS∘rxn= 257 J/K, T=296 K. C) ΔH∘rxn= −125 kJ, ΔS∘rxn= -257 J/K, T=296 K. D) ΔH∘rxn= −125 kJ, ΔS∘rxn= -257 J/K, T=561 K.
Given the values of ΔH∘rxn, ΔS∘rxn, and T, determine ΔSuniv. Part A ΔH∘rxn=+84 kJ , ΔSrxn=+141 J/K , T= 308 K Express your answer as an integer. Part B ΔH∘rxn=+84 kJ , ΔSrxn=+141 J/K , T= 754 K Express your answer as an integer. Part C ΔH∘rxn=+84 kJ , ΔSrxn=− 141 J/K , T= 308 K Express your answer as an integer. Part D ΔH∘rxn=− 84 kJ , ΔSrxn=+ 141 J/K , T= 403 K Express your answer as an...
Given the values of ΔH∘rxn, ΔS∘rxn, and T below, determine ΔSuniv. Part A: ΔH∘rxn=− 89 kJ , ΔSrxn=− 144 J/K , T= 306 K. Express your answer using two significant figures. Part B: ΔH∘rxn=− 89 kJ , ΔSrxn=− 144 J/K , T= 756 K. Express your answer using one significant figure. Part C: ΔH∘rxn=+ 89 kJ , ΔSrxn=− 144 J/K , T= 306 K. Express your answer using two significant figures. Part D: ΔH∘rxn=− 89 kJ , ΔSrxn=+ 144 J/K...
determine ΔSuniv. given ΔH∘rxn=− 83 kJ , ΔSrxn=− 140 J/K , T= 291 K
Given the values of ΔHorxn, ΔSorxn, and T below, determine ΔSuniv. ΔHorxn= -95 kJ , ΔSorxn= -157 J/K , T= 855 K (HINT: Use the equation on page 876, ΔSuniv = ΔS - ΔH / T ). Group of answer choices -45.9 J/K -111.1 J/K -157 J/K +238.7 J/K -268.11 J/K
Calculate the change in Gibbs free energy for each of the following sets of ΔH∘rxn, ΔS∘rxn, and T, assuming that all reactants and products are in their standard states. ΔH∘rxn = −90.kJ, ΔS∘rxn = −150J/K, T = 301K ΔH∘rxn = 90.kJ, ΔS∘rxn = −150J/K, T = 301K ΔH∘rxn = −90.kJ, ΔS∘rxn = −150J/K, T = 856K ΔH∘rxn = −90.kJ, ΔS∘rxn = 150J/K, T = 401K
Part A: ΔH∘rxn= 121 kJ ; ΔS∘rxn=− 246 J/K ; T= 291 K Express your answer as an integer. Part B: ΔH∘rxn=− 121 kJ ; ΔS∘rxn= 246 J/K ; T= 291 K Express your answer as an integer. Part C: ΔH∘rxn=− 121 kJ ; ΔS∘rxn=− 246 J/K ; T= 291 K Express your answer as an integer. Part D: ΔH∘rxn=− 121 kJ ; ΔS∘rxn=− 246 J/K ; T= 600 K Express your answer as an integer. Part E: Predict whether...