Question

Write a rational expression that simplifies to (x-1)/(x+2), x≠-4, -2

Answer 1

Answer:
`((x+4)(x-1))/((x+4)(x+2))` which is the same as
`(x^2+3x-4)/(x^2+6x+8)`

If the math notation does not load properly, or the font size is too small, then it says ( (x+4)(x-1) )/( (x+4)(x+2) ) which is the same as (x^2+3x-4)/(x^2+6x+8)

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Step-by-step explanation:

We see that x cannot equal -2, as this prevents the denominator (x+2) from becoming zero. If x = -4, then x+4 = 0. So x not allowed to be -4 means (x+4) is prevented in being zero, and this is the missing factor in the denominator. We can never divide by zero.

Multiply top and bottom of this given fraction by (x+4) to get
`((x+4)(x-1))/((x+4)(x+2))`

Note how the (x+4) terms divide and cancel to get back to the original fraction given. The portion
`x \\e -4` sticks around to make sure the domains line up properly.

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Optionally you can expand out each product in the numerator and denominator to get

(x+4)(x-1) = x^2-x+4x-4 = x^2+3x-4

(x+4)(x+2) = x^2+2x+4x+8 = x^2+6x+8

I used the FOIL rule

So,
`((x+4)(x-1))/((x+4)(x+2)) = (x^2+3x-4)/(x^2+6x+8)`