Linearity of differentiation

This property of the derivative, follows from the sum rule in differentiation and the constant factor rule in differentiation. Thus we can say that the act of differentiation linear, or the differential operator is a linear operator.

Let f and g be functions. Now consider:

${\displaystyle {d \over dx}(af(x)+bg(x))}$

By the sum rule in differentiation, this is:

${\displaystyle {d \over dx}(af(x))+{d \over dx}(bg(x))}$

By the constant factor rule in differentiation, this reduces to:

${\displaystyle af\ '(x)+bg'(x)}$

Hence we have:

${\displaystyle {d \over dx}(af(x)+bg(x))=af\ '(x)+bg'(x)}$

Omitting the brackets, this is often written as:

${\displaystyle (af+bg)'=af\ '+bg'}$