Question

How do you divide `(v ^ { 2} + v - 39) \div ( v - 6)`?

Answer 1

The quotient is `=v+7` and the remainder is `=3`

Explanation:

We perform a long division

`color(white)(aaaa)` `v-6` `color(white)(aaaa)` `|` `v^2+v-39` `color(white)(aaaa)` `|` `v+7`

`color(white)(aaaaaaaaaaaaaa)` `v^2-6v`

`color(white)(aaaaaaaaaaaaaaa)` `0+7v-39`

`color(white)(aaaaaaaaaaaaaaaaa)` `+7v-42`

`color(white)(aaaaaaaaaaaaaaaaaaa)` `+0+3`

The quotient is `=v+7` and the remainder is `=3`

`(v^2+v-39)/(v-6)=(v+7)+3/(v-6)`

Answer 2

`v+7+3/(v-6)`

Explanation:

`"one way is to use the divisor as a factor in the numerator"`

`"consider the numerator"`

`color(red)(v)(v-6)color(magenta)(+6v)+v-39`

`=color(red)(v)(v-6)color(red)(+7)(v-6)color(magenta)(+42)-39`

`=color(red)(v)(v-6)color(red)(+7)(v-6)+3`

`"quotient "=color(red)(v+7)," remander "=3`

`rArr(v^2+v-39)/(v-6)=v+7+3/(v-6)`