Let be a differentiable function, If for all , then the value of is :](streamdown:incomplete-link)
- A
- B
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Let be a differentiable function, If for all , then the value of is :](streamdown:incomplete-link)
Correct answer:B
Standard Method
Given: for all .
Find: The value of .
Differentiate both sides with respect to using the Fundamental Theorem of Calculus:
Rearranging,
This differential equation is satisfied by the function obtained in the extracted working:
Now use in the original equation:
Substitute into the extracted form:
Hence,
Now evaluate at :
Therefore, the value of is , so the correct option is B.
The solution contains an inconsistency: the question states , while the extracted solution differentiates . The final answer and option indicated by the solution are B.
Solution from extracted working
Given: .
Find: .
From the solution, the working proceeds as:
Using the extracted method, the linear differential equation gives
Now put in the original equation:
So,
Therefore,
Then,
Hence the correct option is B.
Differentiating incorrectly. By the Fundamental Theorem of Calculus, it becomes , not or another integral. Always replace the differentiated integral by the integrand evaluated at the upper limit.
Using the condition at wrongly. Since , the original equation gives . Do not forget that the definite integral over a zero interval is zero.
Making an algebraic error while finding from the final expression. After obtaining , substitute carefully and simplify each term separately.
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