What is the greatest common factor of the polynomial’s terms? 14a3b4−7ab7+21a2b

Question

What is the greatest common factor of the polynomial’s terms? 14a3b4−7ab7+21a2b

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    0
    2021-09-19T06:22:15+00:00

    Answer: 7ab

    Step-by-step explanation:

    The given polynomial : 14a^3b^4-7ab^7+21a^2b

    The terms of the above polynomial can be written as :

    14a^3b^4=(7\times2)a^{2+1}b^{3+1}=(7\times2)a^2(a)b^3b\\\\-7ab^7=-7ab^{6+1}=-7ab^6(b)\\\\21a^2b=(7\times3)a^{1+1}b=(7\times3)a(a)b

    Now, we can see that the greatest common factor of the polynomial’s terms= 7ab

    0
    2021-09-19T06:22:27+00:00

    The Answer is 7(ab).

    I did the quiz.

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