Consider the case where d \equiv 5 \bmod 12 is prime. From p^2 - mq^2 = -1 we obtain that p, q \equiv \pm 1 \bmod 2. Since (p+q\sqrt{m})^2 = p^2 + mq^2 + 2pq\sqrt{m}, the square of the ...

\displaystyle{12}{x}^{{3}}{y}^{{4}} Explanation: When you multiply numbers with variable terms, each term has to be multiplied by like terms. \displaystyle{3}{x}^{{2}}{y}\times{4}{x}{y}^{{3}} ...

Hint: D_v=\nabla f(x,y)\cdot v=\left\|\nabla f(x,y)\right\|\left\|v\right\|\cos(\phi) where \phi is the angle between the gradient and the given vector.

\displaystyle-{8}{x}^{{5}}{y}^{{4}} Explanation: \displaystyle-{2}{x}^{{4}}{y}^{{2}}\times{4}{x}{y}^{{2}} \displaystyle\therefore=-{8}{x}^{{{4}+{1}}}{y}^{{{2}+{2}}} \displaystyle\therefore=-{8}{x}^{{5}}{y}^{{4}}

\displaystyle{50}{x}^{{3}}{y}^{{12}} Explanation: First, you multiply \displaystyle{5}\times{10} to get \displaystyle{50} . Then you have to add the exponents. So for \displaystyle{x} ...

AM-GM gives 12 = \frac{3}{2} x + \frac{3}{2} x + \frac{4}{3} y + \frac{4}{3} y + \frac{4}{3} y \ge 5 \left( \frac{16}{3} x^2 y^3 \right)^{1/5} hence x^2 y^3 \le \frac{3}{16} \left( \frac{12}{5} \right)^5 = 6 \cdot \left( \frac{6}{5} \right)^5 ...