Let A be the area bounded by the curve the x-axis, and the ordinates and . Then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:62
Step-by-step solution
Standard Method
Given: The curve is , and the required area is bounded by the x-axis between and .
Find: The value of .
Computing the area:
Therefore, the value of is .
Common mistakes
Using a single expression for on the whole interval is incorrect. The modulus must be handled piecewise; here on the relevant interval. Rewrite the integrand carefully before integrating.
Ignoring that area with the x-axis must be taken as positive is incorrect. The curve changes sign at , so split the integral at and add positive area contributions.
Multiplying by before simplifying the fractional area often leads to algebraic errors. First compute correctly, then evaluate at the end.
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