Angle between given vectors is \displaystyle{55.55}^{{o}} Explanation: If we have two vectors \displaystyle\vec{{u}}={2}\hat{{i}}-\hat{{j}} and \displaystyle\vec{{v}}={6}\hat{{i}}+{4}\hat{{j}} ...

See the explanation below Explanation: The \displaystyle{2} vectors are \displaystyle\vec{{u}}={2}\vec{{i}} \displaystyle\vec{{v}}=\vec{{j}} \displaystyle{\left({a}\right)} ...

Let x_1,x_2,x_3,x_4,x_5 be linearly independent. Take U=span(x_1,x_2),V=span(x_1+x_4,x_5), W=span(x_1-x_4,x_5) . Verify that the hypothesis is satisfied but x_1 \in U \cap (V+W) .

Your calculation for a) is essentially correct, but it misses an argument why \sum_{1 \leqslant t \leqslant m/2}\chi(t)(m-t) = \sum_{1 \leqslant t < m/2} \chi(t)(m-t).\tag{\ast} The argument is ...

\left( \begin{array}{rr} 2 & -1 \\ -1 & 2 \\ 3 & -1 \end{array} \right) \; \; \left( \begin{array}{r} x \\ y \end{array} \right) \; = \; \left( \begin{array}{r} 5 \\ -4 \\ -1 \end{array} \right) ...

As explained bellow, I've found the following points: u=(12,8),\qquad v=(-2,6),\qquad w=(2,-2). The associated position vectors are: \mathbf{u}=12\,\mathbf{\hat{e}}_{1}+8\,\mathbf{\hat{e}}_{2} ,\quad \mathbf{v}=-2\,\mathbf{\hat{e}}_{1}+6\,\mathbf{\hat{e}}_{2},\quad \mathbf{w}=2\,\mathbf{\hat{e}}_{1}-2\,\mathbf{\hat{e}}_{2} . ...