Which statement is true about the factorization of 30×2 + 40xy + 51y2? The polynomial can be rewritten after factoring as 10(3×2 + 4xy + 5y

Question

Which statement is true about the factorization of 30×2 + 40xy + 51y2? The polynomial can be rewritten after factoring as 10(3×2 + 4xy + 5y2). The polynomial can be rewritten as the product of a trinomial and xy. The greatest common factor of the polynomial is 51x2y2. The greatest common factor of the terms is 1.

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Delilah 3 weeks 2021-09-09T15:17:22+00:00 2 Answers 0

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    0
    2021-09-09T15:18:48+00:00

    Answer:

    D

    Step-by-step explanation:

    0
    2021-09-09T15:18:51+00:00

    Answer:

      The greatest common factor of the terms is 1.

    Step-by-step explanation:

    The terms have no variables in common, and the coefficients have no factors in common. The greatest common factor of the terms is 1.

    __

    The discriminant is negative (40² -4(30)(51) = -4520), so any linear factors will be complex.

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45:7+7-4:2-5:5*4+35:2 =? ( )