Chain rule

In calculus, the chain rule describes the derivative of a "function of a function": the composition of two function, where the output z is a given function of an intermediate variable y which is in turn a given function of the input variable x.

Suppose that y is given as a function ${\displaystyle y=g(x)}$ and that z is given as a function ${\displaystyle z=f(y)}$. The rate at which z varies in terms of y is given by the derivative ${\displaystyle f'(y)}$, and the rate at which y varies in terms of x is given by the derivative ${\displaystyle g'(x)}$. So the rate at which z varies in terms of x is the product ${\displaystyle f'(y).g'(x)}$, and substituting ${\displaystyle y=g(x)}$ we have the chain rule

${\displaystyle (f\circ g)'=(f'\circ g).g'.\,}$

In traditional "d" notation we write

${\displaystyle {\frac {\mathrm {d} z}{\mathrm {d} x}}={\frac {\mathrm {d} z}{\mathrm {d} y}}\cdot {\frac {\mathrm {d} y}{\mathrm {d} x}}.\,}$

See also

• Chain (mathematics)