Cross section Shell method V = \int\limits_{r=1}^4 2 \pi r \sqrt{r} dr = \frac{124 \pi }{5} Washer method V = \int\limits_{z=0}^1 \pi (4^2 - 1^2)\ dz + \int\limits_{z=1}^2 \pi (4^2 - z^2)\ dz = \frac{124 \pi }{5}

If the cross-sections perpendicular to the Y-axis are squares, then we know that the cross-sectional area at a height y, will be given by the square distance from the Y-axis to your line y=2-x. ...

In the second bullet, if x\in (1,2), then the integral limit for y should be (\frac{x}{2},1).

The standard method applies, as usual . To wit: Let u denote any bounded measurable function, then \mathrm E(u(Y))=\mathrm E(u(g(X)) hence \mathrm E(u(Y))=u(0)\mathrm P(X\leqslant0)+\int_0^1u(x^2)\frac14e^{-x}\mathrm dx+u(1)\mathrm P(X\geqslant1). ...

The surface associated to your triangle is defined by: \lambda_1\in[0,1],\ \lambda_2\in[0,1] such that \lambda_1+\lambda_2\le 1 t(\lambda_1,\lambda_2)=\lambda_1(v_2-v_1)+\lambda_2(v_3-v_1)+v1=(4\lambda_2,4\lambda_1,1) ...

It's almost correct, which often is the worst kind of incorrect because it hides so well. The idea is completely right, but your bounds are tighter than you can prove. Let's assume \alpha > 1, and ...