Douglas K. Sep 24, 2017 Given: \displaystyle{A}={\left[\begin{array}{cc} {2}&{x}\\{y}&{3}\end{array}\right]} and \displaystyle{B}={\left[\begin{array}{cc} {y}&-{3}\\{5}&{2}{x}\end{array}\right]} ...

This is called an associative law of multiplication. See the proof below. Explanation: (1) \displaystyle{N}{v}={\left[\begin{array}{cc} {e}&{f}\\{g}&{h}\end{array}\right]}\cdot{\left[\begin{array}{c} {x}\\{y}\end{array}\right]}={\left[\begin{array}{c} {e}{x}+{f}{y}\\{g}{x}+{h}{y}\end{array}\right]} ...

Write the equation as : \frac{dx}{dv}=\frac{v}{F(x)} Then integrating, you get v^2(x)/2=\int_0^x F(p)dp Hence, for every value of x, you have a +v and -v value of v(x). Hence there is symmetry ...

When you got that the x-intercept of the line is 3, it already means that when x=3, y=z=0. So your '?' in (3, ?,?) are both 0. For another part, you got the direction ratios to be (0,b,b). ...

You have the following linear program (LP) \begin{array}{ll} \text{minimize} & x_1 + x_2 + x_3 + x_4\\ \text{subject to} & 0.2 x_1 + 0.3 x_2 + 0.9 x_3 + 0.5 x_4 \geq 1\\ & 0.1 x_1 + 0.4 x_2 + 0.3 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.3 x_2 + 0.3 x_3 + 0.4 x_4 \geq 1\\ & 0.4 x_1 + 0.9 x_2 + 0.1 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.3 x_2 + 0.9 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.3 x_2 + 0.6 x_3 + 0.1 x_4 \geq 1\\ & 0.2 x_1 + 0.3 x_2 + 0.9 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.4 x_2 + 0.9 x_3 + 0.2 x_4 \geq 1\\ & 0.6 x_1 + 0.4 x_2 + 0.1 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.7 x_2 + 0.9 x_3 + 0.9 x_4 \geq 1\\ & 0.2 x_1 + 0.3 x_2 + 0.5 x_3 + 0.6 x_4 \geq 1\\ & x_1, x_2, x_3, x_4 \geq 0\end{array} ...

Suppose that we have a solution x(t),y(t) to x'=f(x,y) y'=g(x,y). Define \tilde f(t) to satisfy the differential equation \tilde f'(t)=h(x(\tilde f(t)),y(\tilde f(t))). Notice that, ...