Question

How do you solve `-\frac { 4a } { a + 8} = \frac { 12} { a - 13}`?

Answer 1

Cross multiply the fractions to get the answer.
`a=6+-2sqrt(22)`

Explanation:

1. `-(4a) / (a+8) = 12 / (a-13)` (Rewrite the equation)
2. `12(-a-8) = -4a(a-13)` (Cross multiply)
3. `-12a-96 = -4a^2+52a` (Simplify)
4. `4a^2-64a-96=0` (Set the equation equal to 0)
5. `4(a^2-16-24)=0` (Factor out the 4)
6. `a=16+-sqrt(256+96)/2` (Simplify using the quadratic formula)
7. `a=6+-(4sqrt(22))/2` (Simplify)
8. `a=6+-2sqrt(22)` (Final answer)

Answer 2

`a =6 " or " a=4`

Explanation:

Whenever you have an equation which has ONE term on each side and the term is a fraction, you can get rid of the fractions by cross-multiplying.

`color(blue)(-4a)/color(red)((a+8)) = color(red)(12)/color(blue)((a-13))`

`color(red)(12)xx color(red)((a+8))=color(blue)(-4a) xxcolor(blue)((a-13))" "larr`multiply out the brackets

`12a+96 = -4a^2+52a" "larr` a quadratic, so make it =0

`4a^2-52a+12a+96 =0`

`4a^2 -40a +96 =0" "larrdiv4`

`a^2 -10a+24 =0" "larr` find factors

`(a-6)(a-4)=0`

`a =6 " or " a=4`