u = -2xy - 2x - 1 is wrong ! From u=-2xy+h(y)+C we get u_y=-2x+h'(y)=-G_x=-2x-1 , hence u=-2xy-y+c .

You have the right idea. When x=1, f(x)=f(1)=2 so at this x, f(f(x))=f(f(1))=f(2)=2-1=1 instead of 2. When x>1, f(x)=x-1 so at such x, f(f(x))=f(x-1)=\left\{ \begin{array}{c} 2 \quad\text{if} \;x-1=1\implies x=2\\ x-1-1 \quad \text{if}\; x-1>1 \implies x>2\\ \end{array} \right. ...

Since both the equations have infinite solutions, they must coincide with each other This gives: \frac{k}{a} = \frac{a}{k} = \frac{5}{k} Considering the equation \frac{a}{k} = \frac{5}{k} ...

Hint: The Frobenius norm of an m \times n matrix A is defined as the square root of the sum of the absolute squares of its elements. Example: Consider matrix A = \left( \begin{array}{ccc} ~~~~1 & -2 & ~~~~~~3 \\ -4 & ~~5 & ~-6 \\ ~~~7 & -8 & ~~~~~~9 \\ \end{array} \right) ...

Notice that U and W are linear independent, so span \{U,W\}=\mathbb{R}^2and \begin{bmatrix} H\\ K \end{bmatrix} \in \mathbb{R}^2 for all H,K \in\mathbb{R}. W and U are linear ...

I don't think the term \frac57\frac57\frac{10}{49} is right. \frac57\frac57 is the probability that both are greater than 1, but if that happens the probability that i<j is quite a bit bigger ...