Note that Q(x) = (x-1)^2, which means that (x-1) \mid P(x) and (x-1) \mid P'(x). In other words x=1 is a zero of both P(x) and P'(x). So after all you're left to solve the system of linear ...

To get a feel for this kind of relation, consider a short exact sequence 0 \rightarrow V_1 \rightarrow V_2 \rightarrow V_3 \rightarrow 0 of finite-dimensional vector spaces over a field. What is ...

Your map f is never injective if N \neq 0, since its fibres have cardinality |N| by the virtue of f(b)=f(b+n) for all n \in N. Thus |B| = |B'| \cdot |N|, which is greater than |B'| ...

Since T(1)=-2x+3x^2, \;\;T(x)=-2-x^2, \;\;T(x^2)=11+x+4x^2, we can reduce the matrix A=\begin{bmatrix}0&-2&11\\-2&0&1\\3&-1&4\end{bmatrix} to get R=\begin{bmatrix}1&0&-\frac{1}{2}\\0&1&-\frac{11}{2}\\0&0&0\end{bmatrix} ...

Look at the graphs of: x^2y = -1 x^2y = 2 Solve for y = \dots, and plot them both. Those are the borders of your interval in the preimage, and it should be quite easy to decide which areas ...

If \mathbf Q=\begin{bmatrix}\mathbf q_1 & \mathbf q_2 & \mathbf q_3\end{bmatrix} and \mathbf 1 = \begin{bmatrix}1 \\ 1 \\ 1\end{bmatrix}, then \mathbf{Q1} = \mathbf q_11 + \mathbf q_21 + \mathbf q_31 = \sum_{i=1}^3\mathbf q_i. ...