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20 October, 07:00

Find the root (s) of f (x) = (x - 6) 2 (x + 2) 2.

-6 with multiplicity 1

-6 with multiplicity 2

6 with multiplicity 1

6 with multiplicity 2

-2 with multiplicity 1

-2 with multiplicity 2

2 with multiplicity 1

2 with multiplicity 2

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Answers (2)
  1. 20 October, 07:18
    0
    4 and 6

    ~6 with multiplicity 2

    ~ - 2 with multiplicity 2
  2. 20 October, 07:21
    0
    6 with multiplicity 2

    -2 with multiplicity 2

    Step-by-step explanation:

    We have given that find the roots of:

    f (x) = (x - 6) ² (x + 2) ²

    Note that the polynomials are already in the factored form. So we will only make it equal to zero

    (x-6) ² = 0

    The square tells us that the root repeat twice

    Move - 6 to the R. H. S

    Then,

    x=6, 6

    (x+2) ²=0

    Move 2 to the R. H. S

    Then,

    x = - 2, - 2

    Therefore the correct options are:

    6 with multiplicity 2

    -2 with multiplicity 2 ...
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