Balanced reaction: 2 C12H10 (s) + 29 O2 (g) → 24 CO2 (g) + 10 H2O (g)
When .514 g of C12H10 undergoes combustion in a bomb calorimeter, the temperature increases from 25.8oC...
When .514 g of C12H10 undergoes combustion in a bomb calorimeter, the temperature increases from 25.8oC to 29.4oC. The heat capacity of the bomb and all of its contents is 5.86 kJ/oC. What is the heat released per mole of C12H10? Is the number you calculated ΔE or ΔH? Why? Is ΔE = ΔH for this reaction? Why? Balanced reaction: 2 C12H10 (s) + 29 O2 (g) → 24 CO2 (g) + 10 H2O (g) If ΔE and ΔH are...
When 0.459 g of biphenyl (C12H10)(C12H10) undergoes combustion in a bomb calorimeter, the temperature rises from 24.8 ∘C to 30.3 ∘C Find ΔErxn for the combustion of biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/∘CkJ/∘C.
When 0.605 g of biphenyl (C12H10) undergoes combustion in a bomb calorimeter, the temperature rises from 26.8 ∘C to 29.6 ∘C. Part A Find ΔErxn for the combustion of biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/∘C. Express the energy in kilojoules per mole to three significant figures.
When 0.612 g of biphenyl (C12H10) undergoes combustion in a bomb calorimeter, the temperature rises from 26.6 ∘C to 29.5 ∘C . Find ΔErxn for the combustion of biphenyl in kJ/mol biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/∘C . ΔErxn =
When 0.4768 g of biphenyl (C12H10) undergoes combustion in a bomb calorimeter, the temperature rises from 26.215 ∘C to 29.610∘C. Find ΔH∘comb for the combustion of biphenyl in kJmol−1. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.861 kJ∘C−1.
when 0.514 g of biphenyl (c12H10) undergoes combustion in a bomb calorimeter, the temperature rises from 25.8*Celcius to 29.4*Celcius. Find deltaE rxn for the combustion of biphenyl in kj/mol biphenyl. The heat capacity of the bomb calorimeter is 5.86 kj/*C.
When 0.514 g of biphenyl (C_12H_10) undergoes combustion in a bomb calorimeter, the temperature rises from 25.8 degree C to 29.4 degree C. Find DeltaE_rxn for the combustion of biphenyl in kJ/mol biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/degree C.
When 0.512 g of biphenyl undergoes combustion in a bomb calorimeter, the temperature rises from 24.8 C to 29.4 C. Find delta for the combustion of biphenyl in kJ/mol biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/C.
When 0.508 g of biphenyl (C 12 H 10 ) undergoes combustion in a bomb calorimeter, the temperature rises from 26.5 ∘ C to 29.8 ∘ C . Find Δ E rxn for the combustion of biphenyl. The heat capacity of the bomb calorimeter, determined in a separate experiment, is 5.86 kJ/ ∘ C . Express the energy in kilojoules per mole to three significant figures.
A 0.375-g sample of 2-naphthylacetic acid (C12H1002) is burned in a bomb calorimeter and the temperature increases from 25.80 °C to 28.00 °C. The calorimeter contains 1.06x103 g of water and the bomb has a heat capacity of 903 J/°C. Based on this experiment, calculate AE for the combustion reaction per mole of 2-naphthylacetic acid burned (kJ/mol). C12H1002()+27/2 O2(g) —>12 CO2(g) +5 H2O(1) AE = kJ/mol