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10 May, 12:34

Find the complete factored form of the polynomial 28 a^6 b^6 + 4 a^4 b^2

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  1. 10 May, 16:32
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    The complete factored form is 4 a^4 b² (7 a² b^4 + 1)

    Step-by-step explanation:

    * Lets explain how to solve the problem

    - To factorize a binomial;

    # Find the greatest common factors of the coefficient and the variable

    # Check the binomial if it is different of two squares or sum of two

    cubes or different of two cubes

    * Lets solve the problem

    ∵ 28 a^6 b^6 + 4 a^4 b²

    - Lets find the greatest common factors of the coefficients

    ∵ The greatest factor of 28 and 4 is 4

    ∴ 28 a^6 b^6 + 4 a^4 b² = 4 (7 a^6 b^6 + a^4 b²)

    - Lets find the greatest common factors of the variables

    ∵ The greatest common factors of a^6 and a^4 is a^4

    ∵ The greatest common factors of b^6 and b² is b²

    ∴ 4 (7 a^6 b^6 + a^4 b²) = 4 a^4 b² (7 a² b^4 + 1)

    - Lets check the bracket

    ∵ There is no common factor in the bracket (7 a² b^4 + 1)

    ∴ The complete factored form of 28 a^6 b^6 + 4 a^4 b^2 is

    4 a^4 b² (7 a² b^4 + 1)
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