Question

How do you simplify `\frac { 2b - 10y } { 3b } - \frac { 7b - 7y } { 3b }`?

Answer 1

`-(5b+3y)/(3b)`

Explanation:

`"since the fractions have a "color(blue)"common denominator"`

`"we can subtract their numerators leaving the denominator"`

`rArr((2b-10y)-(7b-7y))/(3b)`

`=(2b-10y-7b+7y)/(3b)`

`=(-5b-3y)/(3b)`

`=-(5b+3y)/(3b)`

Answer 2

`(-5b-3y)/(3b)`

Explanation:

Since the denominator is the same, we just need to add the numerators above the common denominator.

`(2b-10y)/(3b)-(7b-7y)/(3b)`

`((2b-10y)-(7b-7y))/(3b)`

Open the brackets and simplify. The product of two negatives is a positive and the product of a negative and a positive is a negative.

`(2b-10y-7b+7y)/(3b)`

`(2b-7b-10y+7y)/(3b)`

`(-5b-3y)/(3b)`

This can also be written as:

`-((5b+3y))/(3b)`