Problem

Use the remainder theorem and synthetic division to find $f(k)$.
\[
f(k)=\square
\]
\[
k=-1 ; f(x)=x^{2}-2 x+5
\]

Answer

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Answer

Final Answer: \(f(k)=\boxed{8}\)

Steps

Step 1 :The remainder theorem states that if a polynomial f(x) is divided by (x-k), then the remainder is f(k). In this case, we are asked to find f(k) for k=-1. We can use synthetic division to find the remainder when f(x) is divided by (x-(-1)) = (x+1). The remainder will be our f(k).

Step 2 :Perform synthetic division with the dividend as [1, -2, 5] and the divisor as [1, 1].

Step 3 :The remainder from the synthetic division is 8. According to the remainder theorem, this is the value of f(k) when k = -1.

Step 4 :Final Answer: \(f(k)=\boxed{8}\)

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