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Find a value of the constant k such that the limit exists: lim (x^2+4x+k)/(x+2) as x goes to -2 ...?

Find a value of the constant k such that the limit exists: lim (x^2+4x+k)/(x+2) as x goes to -2 ...?
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Find a value of the constant k such that the limit exists:

lim (x^2+4x+k)/(x+2) as x goes to -2 ...?

User Stuart Nelson
by
8.2k points

1 Answer

4 votes

\lim_(x \to -2) (x^2+4x+k)/(x+2)

We should eliminate (x+2) in the denominator.


\lim_(x \to -2) (x^2+4x+k)/(x+2) \\ \\ \lim_(x \to -2) (x^2+4x+4)/(x+2) \\ \\ \lim_(x \to -2) ((x+2)^2)/(x+2) \\ \\ \lim_(x \to -2) {(x+2)}=-2+2=0

Therefore, k = 4.
User Jmeinlschmidt
by
8.2k points
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