Transformations of Logarithmic Functions

It determines the horizontal shift.

It affects the vertical stretch or compression.

It controls the base of the logarithm.

It shifts the graph vertically.

a log base b of (x - h) + k

a log base b of (x) - h - k

a log base b of (x) + h + k

a log base b of (x + h) - k

A shift to the left by 2 units.

A vertical shift downwards by 2 units.

A shift to the right by 2 units.

A vertical shift upwards by 2 units.

Reflect the graph over the x-axis.

Identify the base of the logarithm.

Create a table of values for the parent function.

Apply the vertical shift.

Divide the original x-values by the shift value.

Add the shift value to the original x-values.

Subtract the shift value from the original x-values.

Multiply the original x-values by the shift value.

Add the shift value to the original y-values.

Subtract the shift value from the original y-values.

Multiply the original y-values by the shift value.

Divide the original y-values by the shift value.

It reflects the graph over the x-axis.

It shifts the graph to the right.

It reflects the graph over the y-axis.

It shifts the graph upwards.

It becomes positive.

It becomes negative.

It remains the same.

It is multiplied by 2.

Reflection changes the sign of y-values.

Reflection is more complex.

Reflection affects the x-values.

Reflection is not important.

To avoid using a table of values.

To simplify the function.

To ensure the graph is plotted correctly.

To change the base of the logarithm.