To introduce new logarithmic functions

To demonstrate basic arithmetic operations

To highlight unique challenges in differentiation

To provide practice problems for students

It reduces the number of steps required

It eliminates the need for a calculator

It ensures the answer is always correct

It allows for the use of differentials

Memorizing formulas

Rewriting expressions

Using a calculator

Ignoring constants

By providing exact numerical answers

By offering step-by-step solutions

By visualizing the relationship between functions

By simplifying complex calculations

1/3x

3/x

3/3x

1/x

It shifts vertically

It reflects horizontally

It becomes a straight line

It disappears

To make the graph symmetrical

To avoid using a calculator

To simplify the calculation

To ensure the function is defined