how to differentiate logarithmic function: e^(2x^4 -5)^3

asked by guest
on Nov 23, 2024 at 8:13 pm



You asked:

Find the derivative of the function e(2x45)3{e}^{{\left( 2 {x}^{4} - 5 \right)}^{3}} with respect to xx.

MathBot Answer:

ddx[e(2x45)3]=24x3(2x45)2e(2x45)3\frac{d}{d x}\left[{e}^{{\left( 2 {x}^{4} - 5 \right)}^{3}}\right] = 24 x^{3} \left(2 x^{4} - 5\right)^{2} e^{\left(2 x^{4} - 5\right)^{3}}


ee is Euler's number, a mathematical constant that is approximately 2.718282.71828.