Microsoft Math Solver

sqrt(e(-2x))  Simplified Root :      e-1 • sqrt(x)  Simplify :  sqrt(e(-2x))  Simplify the Variable part of the SQRT Rules for simplifing variables which may be raised to a power:    (1) variables ...

x^2 = e^x is not the same equation as x = \sqrt{e^x}, as there are two solutions to every square root, as both negative and positive answers are valid solutions. A way to solve this problem ...

1) let u = ( 1 + e^x ), du/dx = e^x , y = ln u , dy/du = 1/u, dy/dx = dy/du * du/dx = 1/u *  e^x dy/du = 1/ ( 1 + e^x ) * e^x 2) y = 2 (e^x) ^{1/2}, dy/dx = 2 (e^x) ^{1/2} * 1/2 ...

For the exponential function, \frac{d}{dx}\left(e^{f(x)}\right) = e^{f(x)}f'(x). Here, e^{f(x)} = e^{3\sqrt x}, so f(x) = 3\sqrt x = 3x^{1/2}. So then we must have \frac{d}{dx}\left(e^{3\sqrt{x}}\right) = e^{3\sqrt{x}}\left(\frac{3}{2}x^{-1/2}\right) = \frac{3e^{3\sqrt x}}{2\sqrt x} ...

\displaystyle{f{{\left({x}\right)}}}=\frac{{2}}{{3}}{\sqrt[{{3}}]{{{e}^{{{2}{x}}}}}} Explanation: According to chain rule when \displaystyle{f}={f{{\left({g{{\left({h}{\left({x}\right)}\right)}}}\right)}}} ...

\displaystyle{y}'={e}^{{{\left({2}-\sqrt{{{x}}}\right)}^{{2}}}}-\frac{{{2}{e}^{{{\left({2}-\sqrt{{{x}}}\right)}^{{2}}}}}}{\sqrt{{{x}}}} Explanation: This function can be simplified to \displaystyle{e}^{{{4}-{4}\sqrt{{{x}}}+{x}}} ...