A constant volume process is also known as an isochoric process. An example is when heat is added to a gas in a container with fixed walls.
Because the walls can't move, the gas can not do work:
W = 0
In that case the First Law states:
Q = ΔEint
The P-V diagram for this process is simple - it's a vertical line going up if heat is added, and going down if heat is removed.
In the case of a monatomic ideal gas:
Eint = (3/2)NkT = (3/2)nRT
Therefore Q = ΔEint = (3/2) nRΔT
A constant temperature process is an isothermal process. An example is when a gas in a container that is immersed in a constant-temperature bath is allowed to expand slowly, or is compressed slowly.
If the temperature is constant there is no change in internal energy.
ΔEint = 0
In that case the First Law states:
Q = W
The P-V diagram for this process follows an isotherm, a line of constant temperature.
In the case of an ideal gas at constant temperature, the pressure is inversely proportional to the volume:
P = nRT/V, so:
W = ∫ P dV = nRT ∫ (1/V) dV
The integral of 1/V is ln(V), and ln(A)-ln(B) = ln(A/B).
Therefore:
Q = W = nRT ln(Vf / Vi )
A constant pressure process is called an isobaric process. An example is a gas in a container sealed with a piston that is free to slide up and down.
If heat is added the temperature goes up and the system expands, so work is done.
The full First Law applies:
ΔEint = Q - W
The P-V diagram for this process is a horizontal line, so the work done is simply:
W = P ΔV = nR ΔT
For a monatomic ideal gas:
ΔEint = (3/2) nR ΔT
Plugging this into the First Law gives:
Q = ΔEint + W
Q = (3/2) nR ΔT + nR ΔT = (5/2)nR ΔT