\displaystyle\lim_{{{y}\to{0}}}\frac{{{4}^{{y}}}}{{y}^{{2}}}=+\infty Explanation: When evaluating a one-sided limit, you need to be careful when a quantity is approaching zero since its sign is ...

Hint g=\log\frac{(2y+1)^5}{\sqrt{y^2+1}}=5\log(2y+1)-\frac 12 \log(y^2+1) g'=5 \frac 2{2y+1}-\frac 12 \frac {2y}{y^2+1}=\frac {10}{2y+1}-\frac {y}{y^2+1}=\frac{8 y^2-y+10}{(2y+1)(y^2+1)}

See the picture. F_1F_2=38\Rightarrow c=19. The major half-axis is a=16,\; hence b^2=19^2-16^2=105, from where the equation \frac{y^2}{256}-\frac{x^2}{105}=1.

Since (x_1,y_1) lie on hyperbola, they satisfy the equation \frac{x^2}{a^2}-\frac{y^2}{b^2} = 1 \frac{x_1^2}{a^2}-\frac{y_1^2}{b^2} = 1 \implies\frac{xx_1}{a^2} - \frac{yy_1}{b^2} = 1

You can apply the chain rule like this: \frac{dy^5}{dy} = \frac{dy^5}{dy^2}\frac{dy^2}{dy} 5y^4 = \frac{dy^5}{dy^2} 2y \frac{dy^5}{dy^2} = \frac{5y^4}{2y} = \frac{5}{2}y^3.

If p|a, then x^2\equiv y^2+a\pmod{p} if and only if x^2\equiv y^2\pmod{p}, if and only if x^2-y^2\equiv 0\pmod{p}, if and only if (x+y)(x-y)\equiv 0\pmod{p}, if and only if uv\equiv 0\pmod{p} ...