How do you simplify (x^2-12x+36)/(4x-24)x212x+364x24?

2 Answers
Tony B
Oct 21, 2015

((x-6))/4(x6)4

Explanation:

Look for potential of parts of the numerator also occurring in the denominator so that you can cancel out.

Consider the numerator: x^2-12x+36x212x+36

To get anything at all that starts to looks like the denominator we have to factorise. Lets try it!

Try: (x+6)(x-6)(x+6)(x6)

That does not work. Why is that?
Look at the constants: (-6) times (+6) (6)×(+6) gives -3636. That is wrong so we need to change something.

Try: (x-6)(x-6) = x^2 -12x +36(x6)(x6)=x212x+36 Now we have found the factors.

Substitute this into our original equation giving:

((x-6)(x-6))/(4x-24)(x6)(x6)4x24

We will have found what we want if we factor out 4 from the denominator giving:

((x-6)(x-6))/(4(x-6))(x6)(x6)4(x6)

Write as:

((x-6))/4 times ((x-6))/((x-6))(x6)4×(x6)(x6)

But:

((x-6))/((x-6)) = 1(x6)(x6)=1

giving:

((x-6))/4(x6)4

Meave60
Oct 21, 2015

The answer is (x-6)/4x64.

Explanation:

The numerator (x^2-12x+36)(x212x+36) is in the form a^2-2ab+b^2a22ab+b2, where a=x and b=6a=xandb=6.

Rewrite the numerator.

((x^2)-2(x)(6)+(6^2))/(4x-24)(x2)2(x)(6)+(62)4x24

Apply the square of a difference (a-b)^2=a^2-2ab+b^2(ab)2=a22ab+b2.

(x-6)^2/(4x-24)(x6)24x24

Factor 44 out of the denominator.

(x-6)^2/(4(x-6))(x6)24(x6)

Rewrite the numerator.

((x-6)(x-6))/(4(x-6))(x6)(x6)4(x6)

Cancel (x-6)(x6) from the numerator and denominator.

((cancel(x-6))(x-6))/(4cancel((x-6))=

(x-6)/4

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