Let O = (0,0), A = (2,2), B = (3,0). The equation of the line that passes through O,A is: y = x, and the equation of the line that goes through A, B is: y = -2x+6. Thus: I = \displaystyle \int_{0}^2 \int_{y}^{\frac{6-y}{2}} y^2dxdy

\begin{array}{rcl} x &=& uv \\ y &=& u^2 \\ \dfrac{\partial(x, y)}{\partial(u,v)} &=& \begin{pmatrix}v&u\\2u&0\end{pmatrix} \\ \det \dfrac{\partial(x, y)}{\partial(u,v)} &=& -2u^2 \\ \mathrm dx \mathrm dy &=& 2u^2 \ \mathrm du \mathrm dv \\ \displaystyle \int \int_D \dfrac1y \mathrm dx \mathrm dy &=& \displaystyle \int_{v=1}^{v=\sqrt2} \int_{u=0}^{u=2v} \dfrac1{u^2} (2u^2)\ \mathrm du \mathrm dv \\ &=& \displaystyle 2 \int_{v=1}^{v=\sqrt2} \int_{u=0}^{u=2v} \mathrm du \mathrm dv \\ &=& \displaystyle 2 \int_{v=1}^{v=\sqrt2} 2v \mathrm dv \\ &=& \displaystyle 2 \\ \end{array}

Correct. As you mentioned in post and others mentioned in the comments, we can find the parameter t which relates y and x. The particle was moved along x = y, therefore this relation exists ...

You are correct in identifying the fact that the change-of-variables transformation maps a subset C of the (u, v)-plane diffeomorphically onto the subset D of the (x, y)-plane. The map is \phi(u, v) = (u + v, u - v), ...

Following Ted Shifrin's suggestion: \begin{split}\int_B (x')^2dx'dy'dz' & = \frac13\int_B ((x')^2 +(y')^2+(z')^2)\,dx'dy'dz' \\ &= \frac{1}{3} \int_0^1 \rho^2 (4\pi \rho^2) \,d\rho = \frac{4\pi}{15} \end{split} ...

Using Stokes Theorem: \int_{\partial\Sigma} y^2 dx + x dy = \iint_{\Sigma} d\left[y^2 dx + x dy\right]= \iint_{\Sigma} \left[-2y dx\, dy + dx\, dy\right]=\iint_{\Sigma} \left[-2y + 1\right] dx\, dy