Let . Then is equal to:
- A
- B
- C
- D
Let . Then is equal to:
Correct answer:A
Standard Method
Given: for .
Find: .
Replace by in the given equation:
Now solve the two linear equations:
Multiply the first equation by and the second equation by , then subtract:
So,
Hence,
Integrate from to :
Evaluating,
Therefore,
So the correct option is A.
Direct Elimination
Given: .
Find: .
Write the companion equation by replacing with :
The coefficients are symmetric, so elimination is immediate.
Subtracting after matching the coefficient of gives
Hence
Now integrate and multiply by :
Therefore, the correct option is A.
Replacing incorrectly when substituting . The correct transformed equation is , because .
Solving the simultaneous equations with wrong elimination. Keep the coefficients aligned carefully before subtracting; otherwise the expression for becomes incorrect.
Making an error in . It is , not or .
Forgetting the final factor of after evaluating . The question asks for , not only the integral.
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