If , , and , , then is equal to:
- A
- B
- C
- D
If , , and , , then is equal to:
Correct answer:D
Standard Method
Given:
Find:
Use the tangent addition formula:
First simplify the numerator:
Now simplify the denominator:
So,
Therefore,
Cancelling ,
That is,
From the solution working, this is compared with to get
Using
and since the angles are acute, we obtain
Therefore, the correct option is D.
Note: The answer key marks option A, but the extracted solution concludes . Hence the solution has been followed.
Detailed Comparison with C
The extracted solution itself indicates a mismatch in the printed expression for and discusses a likely typo. However, the algebra shown gives
If
then
Hence,
for acute angles. So the defensible answer from the solution working is D.
Using is incorrect because tangent is not additive in that way. Always use .
After obtaining , concluding is wrong. Since , the correct relation is for acute angles.
While simplifying, students may fail to write and then make an error in the denominator. Multiply carefully before subtracting from .
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