Differentiation of Exponential Functions

It provides exact solutions for all types of equations.

It simplifies the process of integration.

It eliminates the need for understanding derivatives.

It allows for the differentiation of complex functions without substitution.

Simplify the function first.

Integrate the entire function.

Differentiate the outside function.

Differentiate the inside function.

It has no effect on the derivative.

It is considered after differentiating the main function.

It changes the derivative to a positive value.

It is ignored during differentiation.

It causes the graph to shift upwards.

It results in exponential growth.

It leads to exponential decay.

It has no effect on the graph.

A trigonometric function

A logarithmic function

Another exponential function

A polynomial function

A function that increases over time

A function that oscillates

A function that remains constant

A function that decreases over time

The derivative oscillates.

The derivative becomes positive.

The derivative remains unchanged.

The derivative becomes negative.