Let be defined by . If , , and , then the value of equals:
- A
- B
- C
- D
Let be defined by . If , , and , then the value of equals:
Correct answer:D
Standard Method
Given:
Find:
From ,
so,
Now differentiate:
Using ,
Also,
Therefore,
Integrating,
Using , we get . Substitute into the last equation:
Hence,
Now use :
Thus,
So,
Therefore, the correct option is D.
Using the three given conditions
The solution gives the equations directly from the three conditions:
Now solve:
Substitute into
so,
Then,
and from
we obtain
Hence,
and therefore,
So the correct option is D.
Using the integral limits with the wrong order. The question shows , but the extracted solution works with . Reversing limits changes the sign, so always check the direction of integration before simplifying.
Substituting incorrectly. For , putting gives , not , because the term becomes .
Differentiating incorrectly. The derivative is by the chain rule, not just . Missing this factor of gives the wrong linear equation.
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