A transformation of 1 mole of an ideal gas is depicted in the figure below. Two paths are illustrated on the P-V diagram to take the gas from A to B through paths labelled a and B. The points A and B lie on an isotherm with a temperature denoted by To. You can assume that the specific heat at constant pressure and specific heat at constant volume are both constants. Pressure Isotherm T = To A Path a 1 2 Path B B Volume (a) What is the net heat flow into, or out of, the gas for path a in terms of the temperature To and the temperature T₁ at the point 1. (b) What is the net heat flow into, or out of, the gas for path 3 in terms of the temperature To and the temperature T₂ at the point 2. (c) Under what circumstances will the heat flow along path o always be greater than that along path B

Elements Of Electromagnetics
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Author:Sadiku, Matthew N. O.
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. A transformation of 1 mole of an ideal gas is depicted in the figure below. Two paths are
illustrated on the P-V diagram to take the gas from A to B through paths labelled a and 3.
The points A and B lie on an isotherm with a temperature denoted by To. You can assume that
the specific heat at constant pressure and specific heat at constant volume are both constants.
Pressure
Isotherm T = To
A
Path a
1
2
Path B
B
Volume
(a) What is the net heat flow into, or out of, the gas for path a in terms of the temperature To
and the temperature T₁ at the point 1.
(b) What is the net heat flow into, or out of, the gas for path 3 in terms of the temperature To
and the temperature T₂ at the point 2.
(c) Under what circumstances will the heat flow along path o always be greater than that along
path B
Transcribed Image Text:. A transformation of 1 mole of an ideal gas is depicted in the figure below. Two paths are illustrated on the P-V diagram to take the gas from A to B through paths labelled a and 3. The points A and B lie on an isotherm with a temperature denoted by To. You can assume that the specific heat at constant pressure and specific heat at constant volume are both constants. Pressure Isotherm T = To A Path a 1 2 Path B B Volume (a) What is the net heat flow into, or out of, the gas for path a in terms of the temperature To and the temperature T₁ at the point 1. (b) What is the net heat flow into, or out of, the gas for path 3 in terms of the temperature To and the temperature T₂ at the point 2. (c) Under what circumstances will the heat flow along path o always be greater than that along path B
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