Is it possible to factor y=9x^2 - 21x + 10 y=9x221x+10? If so, what are the factors?

2 Answers
EZ as pi
Jul 31, 2016

y = (3x-2)(3x-5)y=(3x2)(3x5)

Explanation:

Find the factors of 9 and 10 which combine and add up to 21. The signs will be the same, they are both minus.

One clue is to look at the size of the coefficient of the middle term.

2121 is quite small compared to 9 and 109and10 which multiply to give 9090.

That is an indication that we are using the "middle factors"

Factors of 9: 1, 3 9. Factors of 10: 1,2,5,10.

Try the cross-products of 3 and 33and3 and 2 and 52and5 first.

" 3 2 "rArr 3 xx2 = 6 3 2 3×2=6
" 3 5 "rArr 3 xx5 = 15 " "6+15 = 21 3 5 3×5=15 6+15=21

The numbers in the top row are in one bracket.
The numbers in the bottom row are in one bracket.

(3x-2)(3x-5)(3x2)(3x5)

Multiply out for yourself to see how the numbers work.

Ratnaker Mehta
Jul 31, 2016

y=(3x-5)(3x-2)y=(3x5)(3x2)

Explanation:

To determine that a given quadratic polynomial like ax^2+bx+cax2+bx+c

can be factorised or not in RR, we can use the following test :-

The pol. can have factors in RR iff Delta=b^2-4ac>=0.

In our case, Delta=(-21)^2-4*9*10=441-360=81>=0.

Therefore, the poly. y can be factorised in RR.

Observe that, 9xx10=90, so to factorise the given expression, we

should find 2 factors of 90, such that the sum of these factors

be 21=middle term.

We find, 15xx6=90, and, 15+6=21.

Hence, y=9x^2-21x+10=9x^2-15x-6x+10

=3x(3x-5)-2(3x-5)=(3x-5)(3x-2)

Enjoy Maths.!

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