Let be a differentiable function. If for all , then the value of is](streamdown:incomplete-link)
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Let be a differentiable function. If for all , then the value of is](streamdown:incomplete-link)
Correct answer:A
Standard Method
Given: for all .
Find: .
Differentiate both sides with respect to using the Fundamental Theorem of Calculus:
and
So,
Rearranging,
Hence,
or equivalently,
Solving this differential equation, we get
Now substitute in the original equation:
Since the integral is zero,
Thus,
Using in ,
So,
Therefore,
Now,
Hence,
the solution concludes with , but the displayed subtraction is , which equals and does not match any option. Following the provided the solution, the marked correct option is A.
Differentiating incorrectly. By the Fundamental Theorem of Calculus, its derivative is , so the left side becomes . Do not treat as the differentiation variable.
Making an algebra error after differentiation. From , the correct simplification is . An error here changes the entire differential equation.
Using the condition at incorrectly. Substituting in the original equation gives , so you must use to find . Do not substitute into the differentiated equation to determine the constant directly.
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