Lee E. Oct 18, 2014 Multiply each row of the first matrix by each column of the second matrix. \displaystyle{\left(-{4}\cdot-{6}\right)}+{\left({5}\cdot\frac{{1}}{{2}}\right)} will be ...

If T(i)=(1,1) and T(j)=(2,-1) and e_1=i-j=(1,-1) and e_2=3i+j=(3,1), then T(e_1)=T(i-j)=T(i)-T(j)=(-1,2)=a_1e_1+b_1e_2 \,\text{(say)} and T(e_2)=T(3i+j)=3(1,1)+(2,-1)=(5,2)=a_2e_1+b_2e_2\,\text{(say)}. ...

The density of your distribution is \exp \left( {-1 \over 2(1-1/16)} \left[ x^2 + y^2 + {xy \over 2} \right] \right) multiplied by a normalizing constant. (See Wikipedia ; you have \mu_x = \mu_y = 0, \sigma_x = \sigma_y = 1, \rho = -1/4 ...

Your example shows that the conjecture is false: For any A and B there exist C and D with A=C+D and B=C-D.

You have an ODE of the form \dot{x} (t) = A (t) \, x(t) which a control theorist would call a "linear time-varying (LTV) unforced system" (unforced because there is no control input). The general ...

Your A is selfadjoint, so the Moore-Penrose inverse will be simply the inverse of the restriction to the orthogonal complement of the kernel. You have A= 2 P_1 + 0\,(I-P_1), where P_1=\begin{bmatrix} 1/2&1/2\\ 1/2&1/2\end{bmatrix} ...