Question

How do you simplify `\frac { 11x ^ { 2} } { 33x } + \frac { 5x ^ { 2} } { 15x }`?

Answer 1

`= (2x)/3`

Explanation:

`((11x^2)/(33x)) + ((5x^2)/(15x))`

`= ((11*x*x)/(11*3*x)) + ((5*x*x)/(5*3*x))`

`= ((cancel(11*x)*x)/ (cancel(11*x)*3)) + ((cancel(5*x)*x) / (cancel(5*x)*3))`

`=(x/3) + (x/3)`
`= (2x)/3`

Answer 2

`(2x)/3`

Explanation:

1) First cancel any factors that are in common in the numerators and in their own denominators.
Because this is an addition problem (not a multiplication problem), you can cancel common factors only within the same fraction.

For the first term
`(11 x^2)/(33x)`

`(11)/(33)` reduces to `(1)/(3)`

`(x^2) / (x)` reduces to `(x)/(1)`

So the first term simplifies to
`(1)/(3)` × `(x)/(1)`

`(x)/(3)`
................................

For the second term
`(5x^2)/(15x)`

`(5)/(15)` reduces to `(1)/(3)`

`(x^2)/(x)` reduces to `(x)/(1)`

So the second term simplifies to
`(1)/(3)` × `(x)/(1)`

`(x)/(3)`
..................

Now the problem has been simplified to
`(x)/(3)` + `(x)/(3)`

The fractions have a common denominator, so you can just add.
Add the numerators and keep the common denominator.
`(x + x) / (3)`

`(2x)/3`