See the solution process below: Explanation: This problem is a special form and can follow the rule: \displaystyle{\left({a}-{b}\right)}{\left({a}+{b}\right)}={a}^{{2}}-{b}^{{2}} Substituting \displaystyle\sqrt{{{x}}} ...

\displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}=-\sqrt{{\frac{{y}}{{x}}}} . Explanation: \displaystyle\sqrt{{x}}+\sqrt{{y}}={25} . \displaystyle\therefore\frac{{d}}{{\left.{d}{x}\right.}}{\left(\sqrt{{x}}+\sqrt{{y}}\right)}=\frac{{d}}{{\left.{d}{x}\right.}}{25}={0} ...

For Q 1.\sqrt x +\sqrt y=k\implies x+y+2\sqrt {x y}=k^2\implies 2\sqrt {x y}=k^2-(x+y)\implies \implies4 x y=k^4+(x+y)^2-2 k^2 (x+y)........(1). Make a change to the orthogonal co-ordinate ...

One family of infinite solutions of the diophantine equation z^2+zx=2x^2y is (x,y,z)=\left(n,\frac{mn(mn-1)}{2},n(mn-1)\right) with n,m\in\mathbb{Z}. If n,m\geq 2, then x,y,z\geq 2. Your ...

Let f^{-1}(3) = a. Then, 3 = f(a). So, this problem simplifies to solving the equation: \frac{1}{4}a^3 + a -1 = 3 Rearranging: \frac{1}{4}a^3 + a - 4 = 0 a^3 + 4a - 16 = 0 This is a ...

With implicit differentiation we get \frac{y'}{2\sqrt{y}}+\frac{1}{2\sqrt{x}}=0 so y'=-\frac{\sqrt{y}}{\sqrt{x}}=\frac{\sqrt{x}-1}{\sqrt{x}}=1-\frac{1}{\sqrt{x}} By doing y=(1-\sqrt{x})^2=1-2\sqrt{x}+x ...