Question

How do you solve `2/(x-2) + 7/(x^2-4) = 5/x`?

Answer 1

`x= 5" and " -4/3`

Explanation:

Known: `a^2-b^2=(a-b)(a+b)`

So `x^2-4->x^2-2^2 -> (x-2)(x+2)`

Write the given equation as:

`2/(x-2)+7/[(x-2)(x+2)]=5/x`

`=>[2(x+2)+7]/[(x-2)(x+2)]=5/x`

`=>[2x+4+7]/[(x-2)(x+2)]=5/x`

Cross multiplying

`x(2x+11)=5(x-2)(x+2)`

`x(2x+11)=5(x^2-4)`

`2x^2+11x=5x^2-20`

`3x^2-11x-20=0`

not all the solutions are whole numbers

Using: `y=ax^2+bx+c` where a=3; b= -11; c=-20

`x=(-b+-sqrt(b^2-4ac))/(2a)`

`=>x=(11+-sqrt(11^2-4(3)(-20)))/(2(3))`

`x=(11+-sqrt(121+240))/6`

`x= (11+-19)/6`

`x= 5" and " -4/3`