# Deciding if Numbers are Equal or Approximately Equal

Many real-life problems involve numbers that are not convenient to work with without calculator assistance. Many calculator-solved problems give an approximate solution, not an exact solution, and the purpose of this section is to increase your awareness of the difference between the two.

When two numbers $\,x\,$ and $\,y\,$ live at the same place on the number line, we say ‘$\,x\,$ equals $\,y\,$’ and write ‘$\,x = y\,$’. However, when two numbers $\,x\,$ and $\,y\,$ are just close to each other, but not equal, we say that ‘$\,x\,$ is approximately equal to $\,y\,$’.

Here, you will compare two numbers,
and decide if they are *equal*,
or *approximately equal*.

## Examples

## Practice

Do not use your calculator for these problems.