Consider the following expression.
\[
\lim_{x \to -3} \frac{\sqrt{2x + 22} - 4}{x + 3}
\]
The value of the above expression (rounded to 2 decimal places) is \(\underline{\hspace{2cm}}\).
\[ \lim_{x \to -3} \frac{\sqrt{2x + 22} - 4}{x + 3} \] The value of the above expression (rounded to 2 decimal places) is \(\underline{\hspace{2cm}}\).
Show Hint
Correct Answer: 0.25
Solution and Explanation
\[ \frac{\sqrt{2x+22} - 4}{x+3} \times \frac{\sqrt{2x+22} + 4}{\sqrt{2x+22} + 4} \] \[ = \frac{(2x+22) - 16}{(x+3)(\sqrt{2x+22}+4)} \] \[ = \frac{2x + 6}{(x+3)(\sqrt{2x+22}+4)} \] \[ = \frac{2(x+3)}{(x+3)(\sqrt{2x+22}+4)} \] Canceling \( (x+3) \): \[ = \frac{2}{\sqrt{2x+22}+4} \] Now substitute \( x = -3 \): \[ = \frac{2}{\sqrt{16}+4} = \frac{2}{8} = 0.25 \] Final Answer: \[ \boxed{0.25} \]
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