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]} ...

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} ...

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 ...

I did think about this problem for quite some time now and I don't think its provable in this environment. In order to know the rank of the matrix A, we need atleast one nonzero constant in every ...

The answer to the linked question shows that the curved side of the "cylinder" satisfies the equation (x-z)^2+4y^2=1 and its planar caps satisfy (x+z)^2=1. The red curves are the intersection ...