For , let , and a real number be such that . Then the value of is equal to:
- A
- B
- C
- D
For , let , and a real number be such that . Then the value of is equal to:
Correct answer:B
Standard Method
Given: and , where .
Find: The value of .
Use the identities
and
Substituting into the given equation,
Expanding,
Rearranging terms,
So,
Dividing both sides by ,
Comparing with , we get
Therefore, the correct option is B.
Direct Comparison After Expansion
Given: .
Find: The value of in .
Expand both sine terms and immediately collect like terms:
This gives
Now divide by to convert the expression into tangents:
Hence,
Therefore, the correct option is B.
A common mistake is using the identity for with a plus sign. That changes the equation completely and gives a wrong value of . Use carefully.
Some students move terms across the equation incorrectly and obtain instead of . The sign changes during rearrangement are crucial. Collect the terms with attention to the negative sign.
Another mistake is comparing the result before dividing by . The given relation involves and , so you must divide by to convert the equation into tangent form.
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