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Determine the total number of roots of each polynomial function using the factores form? F(x) = (x-6)^2(x+2)^2
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Determine the total number of roots of each polynomial function using the factores form? F(x) = (x-6)^2(x+2)^2

User Thomas Upton
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2 Answers

7 votes

Answer:

4

Explanation:

If we perform the indicated multiplication, the highest powered x term will be 4 (as in x^4). Thus, the total number of roots of this polynomial will be 4.

User Joubert Nel
by
4.8k points
4 votes

Answer:

total number of roots =4

Explanation:

the total number of roots of each polynomial function using the factored form


F(x) = (x-6)^2(x+2)^2

Given f(x) is in factored form, to get the roots we look at the factors and the exponents.


(x-6)^2 has exponent 2, so we have two roots 6 and 6

like that
(x+2)^2 gives us two roots because it has exponent 2

So total number of roots for this polynomial function is 4

User James Henstridge
by
5.2k points
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