Question

How do you simplify `(x-2)/2 - x/6 + -2`?

Answer 1

`(x - 9)/3`

Explanation:

To simplify this expression we need to add the fractions.

To add fractions we need to get each fraction over a common denominator, in this case `color(red)(6)`

To get each term over a common denominator we must multiply the fraction by the correct form of `1`:

`(color(blue)(3/3) xx (x - 2)/2) - x/6 + (color(green)(6/6) xx -2)`

`(color(blue)(3) xx (x - 2))/(color(blue)(3) xx 2) - x/6 + (color(green)(6) xx -2)/color(green)(6)`

`(3x - 6)/6 - x/6 + -12/6`

`(3x - 6)/6 - x/6 - 12/6`

We can now add the numerators to give:

`(3x - 6 - x - 12)/6`

Next we can group like terms in the numerator:

`(3x - x - 6 - 12)/6`

Then we can combine like terms in the numerator:

`((3 - 1)x - 18)/6`

`((3 - 1)x - 18)/6`

`(2x - 18)/6`

Because 2, 18 and 6 are all divisible by `color(red)(2)` we can still factor the terms:

`(color(red)(2)(x - 9))/(color(red)(2) xx 3)`

`(color(purple)(cancel(color(red)(2)))(x - 9))/(color(purple)(cancel(color(red)(2))) xx 3)`

`(x - 9)/3`