Factor 9y^2-12y+4

(3y-2)^2
(3y-2)(3y+2)
(3y-4)(y+1)

To factor the polynomial, find the binomials which multiply to make it. This can be done for any polynomial [tex]ax^2+bx+c[/tex] by finding numbers that multiply to a*c and add to b.

a*c=36 b=-12

36: 1, 2, 3, 4, 6. 6. 9, 12, 18, 36

Since -6*-6 = 36 and -6 + -6 = -12, split -12y in [tex]9y^2-12y+4[/tex] to [tex]9y^2-6y-6y+4[/tex].

Next, factor by grouping by finding GCF between pairs of terms:

[tex](9y^2-6y)+(-6y+4)\\3y(3y-2)-2(3y-2)\\(3y-2)(3y-2)\\(3y-2)^2[/tex]

(3y-2)^2 is the solution.

zainebamir540 zainebamir540 · Answer 2 · 2019-02-07T08:42:53+01:00

zainebamir540 zainebamir540

07-02-2019

Answer:

Choice a is correct answer.

Step-by-step explanation:

Given expression is:

9y²-12y+4

We have to find its factor.

Split the middle term of above expression so that their sum should be -12 and their product should be 36.

9y²-6y-6y+4

Making two groups and taking common,we get

3y(3y-2)-2(3y-2)

Taking (3y-2) as common,we get

(3y-2)(3y-2)

(3y-2)² which is the answer.

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Factor 9y^2-12y+4 (3y-2)^2 (3y-2)(3y+2) (3y-4)(y+1)

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Factor 9y^2-12y+4

(3y-2)^2
(3y-2)(3y+2)
(3y-4)(y+1)