Linear and Exponential Functions Concepts

To study polynomial functions

To learn about trigonometric functions

To understand the differences between linear and exponential functions

To explore quadratic functions

They are always increasing or always decreasing

They are represented by quadratic equations

They have a constant rate of change

They can both increase and decrease

The slope of the line

The y-intercept

The x-intercept

The rate of change

By checking if the y-values are added by a constant

By checking if the y-values are multiplied by a constant

By checking if the x-values are subtracted by a constant

By checking if the x-values are divided by a constant

The base of the exponential

The slope of the function

The value of y when x is 0

The value of y when x is 1

By multiplying the change in y by the change in x

By dividing the change in x by the change in y

By dividing the change in y by the change in x

By adding the change in y to the change in x

It increases

It becomes zero

It decreases

It remains constant

Because the exponential function has a constant slope

Because the exponential function's rate of change increases

Because the linear function's rate of change decreases

Because the linear function decreases over time