The derivative of the e-function.

Definition

The e-function, also called the exponential function, has the form f(x) = e^x. Here, e is a mathematical constant, approximately 2.71828.

The special thing about the e-function is that its derivative is identical to the function itself. This means:

f'(x) = e^x

Scheme

To differentiate an exponential function of the form f(x) = a \cdot e^{b \cdot x} multiply by the constant b. The differentiation rule is:

f'(x) = a \cdot b \cdot e^{b \cdot x}

Besides the e-function, there are also other exponential functions, such as f(x) = a^x. The derivative of such functions is:

f'(x) = a^x \cdot \ln(a)

Example for the derivation of exponential functions

Function: f(x) = 2^x

Derivative: f'(x) = 2^x \cdot \ln(2)

Function: g(x) = 3 \cdot e^{2x}

Derivative: g'(x) = 6 \cdot e^{2x}

★The derivative of the e-function is e^x.
★For other exponential functions a^x, the natural logarithm of the base, i.e. \ln(a), is multiplied.

1 / 2

Differentiate

f(x) = 5 \cdot e^{-3x} .

2 / 2

Differentiate

g(x) = -2 \cdot 1{,}5^{-x} .

rockettutor.com

Cancel your trial online at any time