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26 February, 17:55

What is the quotient when (x+3) is divided into the polynomial 2x2+3x-9

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  1. 26 February, 18:02
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    Problem: 2x^2+3x-9

    For a polynomial of the form, ax^2+bx+c rewrite the middle term as the sum of two terms whose product a·c=2·-9=-18 and whose sum is b=3.

    Factor 3 out of 3x

    2x^2+3 (x) - 9

    Rewrite 3 as - 3 plus 6.

    2x^2 + (-3+6) x-9

    Apply the distributive property

    2x^2 (-3x+6x) - 9

    Remove the parentheses

    2x^2-3x+6x-9

    Factor out the greatest common factor from each group

    Group the first two terms and the last two terms

    (2x^2-3x) (6x-9)

    Factor out the greatest common factor in each group.

    x (2x-3) + 3 (2x-3)

    Factor the polynomial by factoring out the greatest common factor, 2x-3

    (x+3) (2x-3). So, the quotient is 2x-3
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