You can write the derivative as 2(x-1)(2-x)^2-2(x-1)^2(2-x)=2(x-1)(2-x)((x-1)-(2-x))=2(x-1)(2-x)(2x-3) which makes it easy to see where the derivative is zero. As the function is very large when ...

I will assume that a and b are \ge 0, but are not both 0. Take the square root(s). We get \sqrt{a} \,x=\pm\sqrt{b}(x-10). Now we have two linear equations. Deal with them separately. The ...

It's possible to do with a mixed-integer linear program: just add the constraint -a_i x \le b + A(1-y_i) where y_1, y_2, \dots, y_M all take values in \{0,1\}, and A is a large constant ...

Note that (x - 1)(x + 1) \equiv 0 \mod{2^k} will imply that x must be an odd integer. So we may assume that x = 2m + 1. Putting value of x in the equation we have 4m(m+1) \equiv 0 \mod{2^k} ...

Clearing up a terminological uncertainty first: A homotopy is, by definition, continuous in both variables. Now to the problem. To simplify notation, let's say s = 0, and a = 0. If we assume f = F(\,\cdot\,,0) ...

First lets answer your first question. "A fair coin is flipped until it lands on tails. Each time the coin is flipped, the player receives one point. What is the expected number of points the player ...