If a polynomial function f(x) has roots 3 and square root of 7 what must also be a root of f(x)?
A negative square root of 7
B i square root of seven
C –3
D 3i

Whenever you have a root of sqrt #, you must have the matching - (or positive).
This is because when you take a square root you get two solutions a positive and a negative.
The answer is LETTER A

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isyllus isyllus · Answer 2 · 2019-11-26T07:14:39+01:00

Answer:

[tex]-\sqrt{7}[/tex]

A is correct.

Step-by-step explanation:

A polynomial function f(x) has root [tex]3\text{ and }\sqrt{7}[/tex].

3 is a real number.

[tex]\sqrt{7}[/tex] is an irrational number.

The zeros or root of the function always occurs in conjugate pair.

Conjugate pair: A root has two form one positive and one negative.

e.g:[tex]a+\sqrt{b},a-\sqrt{b}[/tex]

For the given function f(x), [tex]\sqrt{7}[/tex] should be in conjugate pair.

One more possible root would be [tex]-\sqrt{7}[/tex]

Hence, the one root must be negative of root of 7

If a polynomial function f(x) has roots 3 and square root of 7 what must also be a root of f(x)? A negative square root of 7 B i square root of seven C –3 D 3i

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If a polynomial function f(x) has roots 3 and square root of 7 what must also be a root of f(x)?
A negative square root of 7
B i square root of seven
C –3
D 3i