Evaluate \(\lim_{x\rightarrow 0}\) f(x), where { \(\frac{x}{|x|}\), x≠0 0, x=0

Question

Let \( f(x) = \int \frac{(2 - x^2) \cdot e^x \cdot \sqrt{1 + x} \cdot (1 - x)^{3/2}}{dx} \). If \( f(0) = 0 \), then \( f\left(\frac{1}{2}\right) \) is equal to:

Answer 1

Given:

f(x) =
x / |x|, x ≠ 0
0, x = 0

Step 1: Evaluate Left Hand Limit (LHL)

For x → 0⁻, x is negative, so

x / |x| = −1

lim_x→0⁻ f(x) = −1

Step 2: Evaluate Right Hand Limit (RHL)

For x → 0⁺, x is positive, so

x / |x| = 1

lim_x→0⁺ f(x) = 1

Step 3: Compare LHL and RHL

LHL ≠ RHL

Final Answer:

Since left hand limit is not equal to right hand limit,
lim_x→0 f(x) does not exist

Evaluate \(\lim_{x\rightarrow 0}\) f(x), where { \(\frac{x}{|x|}\), x≠0 0, x=0

Solution and Explanation

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