1.A van der Waals gas obeys the equation of state (P+n2aV2)(V−nb)=nRT\left(P + \frac{n^2 a}{V^2}\right)(V - nb) = nRT(P+V2n2a)(V−nb)=nRT. Its internal energy is given by U=CT−n2aVU = CT - \frac{n^2 a}{V}U=CT−Vn2a. The equation of a quasistatic adiabat for this gas is given bya.TC/nRV=T^{C/nR}V = TC/nRV= constantb.T(C+nR)/nRV=T^{(C+nR)/nR}V = T(C+nR)/nRV= constantc.TC/nR(V−nb)=T^{C/nR}(V - nb) = TC/nR(V−nb)= constantd.P(C+nR)/nR(V−nb)=P^{(C+nR)/nR}(V - nb) = P(C+nR)/nR(V−nb)= constantLogin to continueOnly logged in users canattempt or see the solution.