Q. 34

Question

Calculate each of the limits in Exercises 21-48. Some of these limits are made easier by L'Hôpital's rule, and some are not.

$\lim_{x \to 0^{+}} (\frac{2^{x} - 1}{x^{2}} - \frac{1}{1 - e^{x}})$

Step-by-Step Solution

Verified

Answer

The value of limit is $0$

1Step 1. Given information

Given function $\lim_{x \to 0^{+}} (\frac{2^{x} - 1}{x^{2}} - \frac{1}{1 - e^{x}})$

2Step 2: Apply L-Hospital rule and solve

Calculating, we get

$\lim_{x \to 0^{+}} (\frac{2^{x} - 1}{x^{2}} - \frac{1}{1 - e^{x}}) = \lim_{x \to 0^{+}} (\frac{(2^{x} - 1) (1 - e^{x}) - x^{2}}{x^{2} (1 - e^{x})}) \lim_{x \to 0^{+}} (\frac{2^{x} - 1}{x^{2}} - \frac{1}{1 - e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} - 2^{x} e^{x} - 1 + e^{x} - x^{2}}{x^{2} - x^{2} e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} \ln 2 - 2^{x} e^{x} - e^{x} \cdot 2^{x} \ln 2 + e^{x} - 2 x}{2 x - x^{2} e^{x} - 2 x e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} \ln 2 - 2^{x} e^{x} (1 + \ln 2) + e^{x} - 2 x}{2 x - x^{2} e^{x} - 2 x e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{2} - (1 + \ln 2) (2^{x} e^{x} + e^{x} \cdot 2^{x} \ln 2) + e^{x} - 2}{2 - (x^{2} e^{x} + 2 x e^{x}) - 2 (x e^{x} + e^{x} \cdot 1)}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{2} - (1 + \ln 2) (2^{x} e^{x} + e^{x} \cdot 2^{x} \ln 2) + e^{x} - 2}{2 - x^{2} e^{x} - 2 x e^{x} - 2 x e^{x} - 2 e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{2} - (1 + \ln 2) (2^{x} e^{x} + e^{x} \cdot 2^{x} \ln 2) + e^{x} - 2}{2 - x^{2} e^{x} - 4 x e^{x} - 2 e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{2} - (1 + \ln 2)^{2} 2^{x} e^{x} + e^{x} - 2}{2 - x^{2} e^{x} - 4 x e^{x} - 2 e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{3} - (1 + \ln 2)^{2} (2^{x} e^{x} + e^{x} \cdot 2^{x} \ln 2) + e^{x} - 0}{0 - (2 x e^{x} + x^{2} e^{x}) - 4 (x e^{x} + e^{x} \cdot 1) - 2 e^{x}}) = \lim_{x \to 0^{+}} (\frac{2^{x} (\ln 2)^{3} - (1 + \ln 2)^{2} (2^{x} e^{x} + e^{x} \cdot 2^{x} \ln 2) + e^{x}}{- (2 x e^{x} + x^{2} e^{x}) - 4 (x e^{x} + e^{x}) - 2 e^{x}}) = \frac{2^{0} (\ln 2)^{3} - (1 + \ln 2)^{2} (2^{0} e^{0} + e^{0} \cdot 2^{0} \ln 2) + e^{0}}{- (2 \cdot 0 \cdot e^{0} + 0^{2} \cdot e^{0}) - 4 (0 \cdot e^{0} + e^{0}) - 2 e^{0}} = \frac{(\ln 2)^{3} - (1 + \ln 2)^{2} (1 + \ln 2) + 1}{- 4 - 2} = \frac{(1 + \ln 2)^{3} - (\ln 2)^{3} - 1}{6} = \frac{1^{3} + 3 \cdot 1^{2} \cdot \ln 2 + 3 (\ln 2)^{2} \cdot 1 + (\ln 2)^{3} - (\ln 2)^{3} - 1}{6} = \frac{1 + 3 \ln 2 + 3 (\ln 2)^{2} + (\ln 2)^{3} - (\ln 2)^{3} - 1}{6} = \frac{3 \ln 2 + 3 (\ln 2)^{2}}{6} = \frac{3 \ln 2 + 3 (\ln 2)^{2}}{6} = \frac{(1 + \ln 2) \ln 2}{2}$

Q. 33

Q. 35

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Q. 36

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