Evaluate the polynomial function for x = -4 and x = -1. f(x)=x²-5x - 14 f(-4)= f(-1) = Based on the results and the Intermediate

Question

Evaluate the polynomial function for x = -4 and x = -1.
f(x)=x²-5x - 14
f(-4)=
f(-1) =
Based on the results and the Intermediate Value Theorem, which statement is correct?
Because both f(-4) and f(-1) are positive, f has no real zeros between x = -4 and x = -1.
Because f(-4) is positive and f(-1) is negative, f has exactly one real zero between x = -4 and x = −1.
Because f(-4) is negative and f(-1) is positive, f has at least one real zero between x =
-4 and x = −1.
Because f(-4) > f(-1), f has at least one real zero between x = -4 and x = -1.
Because f(-4) is positive and f(-1) is negative, f has at least one real zero between x = -4 and x = -1.

Kunduz · Accepted Answer

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