if u=x^3*y*e^z find dou/dox
You asked:
Given \(u = {x}^{3} \cdot y \cdot {e}^{z}\) evaluate the expression \(\frac{d o u}{d o x}\).
MathBot Answer:
\[\frac{d o u}{d o x} = \frac{d o \cdot {x}^{3} \cdot y \cdot {e}^{z}}{d o x} = x^{2} y e^{z}\]
\(e\) is Euler's number, a mathematical constant that is approximately \(2.71828\).