Solution
Solution
Solution steps
Simplify
Treat as a constant
Apply the chain rule:
Multiply fractions:
Popular Examples
x^2y^'-2xy=3y^4integral of x/8 sqrt(64+x^2)tangent of y=x^2+2,(1,3)tangent of integral of (\sqrt[5]{x}+\sqrt[6]{x})limit as x approaches 0 of 1/(x^2(x-7))
Frequently Asked Questions (FAQ)
What is (\partial}{\partial x}(e^{\frac{-y)/x}) ?
The answer to (\partial}{\partial x}(e^{\frac{-y)/x}) is (e^{-y/x}y)/(x^2)