The work done by Four moles of a monatomic ideal gas (γ = 5/3) in expanding adiabatically is 870 J. The initial temperature and volume of the gas are 355 K and 0.190 m³. What is the final temperature of the gas.
The work done by Four moles of a monatomic ideal gas (γ = 5/3) in expanding...
The work done by four moles of a monatomic ideal gas (γ = 5/3) in expanding adiabatically is 810 J. The initial temperature and volume of the gas are 365 K and 0.130 m³. What is the final volume of the gas? [Hint: For an adiabatic process => T1V1γ-1 = T2V2γ-1] The answer isn't 0.13
The work done by two moles of a monatomic ideal gas (γ = 5/3) in expanding adiabatically is 920 J. The initial temperature and volume of the gas are 365 K and 0.110 m³. What is the final volume of the gas? [Hint: For an adiabatic process => T1V1γ-1 = T2V2γ-1]
The work done by two moles of a monatomic ideal gas (γ = 5/3) in expanding adiabatically is 920 J. The initial temperature and volume of the gas are 390 K and 0.120 m³. What is the final volume of the gas? [Hint: For an adiabatic process => T1V1γ-1 = T2V2γ-1]
Twenty moles of a monatomic ideal gas (γ = 5/3) undergo an adiabatic process. The initial pressure is 400 kPa and the initial temperature is 450 K. The final temperature of the gas is 320 K. In the situation above, the final volume of the gas, in SI units, is closest to: 0.19 0.35 0.23 0.27 0.31
Four moles of an ideal monatomic gas are at a temperature of 335 K. Then, 2400 J of heat is added to the gas, and 830 J of work is done on it. What is the final temperature of the gas?
A monatomic ideal gas that is initially at a pressure of 1.54 times 10^5 Pa and with a volume of 8.00 times 10^-2 m^3 is compressed adiabatically to a volume of 3.90 times 10^-2 m^3. What is the final pressure? P = ______ Pa How much work is done by the gas during the compression? W = ________ J What is the ratio of the final temperature of the gas to its initial temperature?
Twenty moles of an ideal monatomic gas at 1000 K having a volume of 100 liters perform 1000 J of work while isothermally and reversibly expanding. Show how to compute the initial gas pressure, P1, final gas volume, V2, ΔU and ΔH.
Three moles of an ideal monatomic gas are at a temperature of 308 K. Then 2490 J of heat is added to the gas, and 773 J of work is done on it. What is the final temperature of the gas?
As a 9.00-mol sample of a monatomic ideal gas expands adiabatically, the work done on it is -2.50 103 . The initial temperature and pressure of the gas are 480 K and 2.40 atm. Calculate the following. (a) the final temperature 480 x Your response is within 10% of the correct value. This may be due to roundoff error, or you could have a mistake in your calculation. Carry out all intermediate results to at least four-digit accuracy to minimize...
Suppose 3.00 moles of a monatomic ideal gas expand adiabatically, and its temperature decreases from 397 to 258 K. Determine (a) the work done (including the algebraic sign) by the gas, and (b) the change in its internal energy.