The value of is equal to:
- A
- B
- C
- D
The value of is equal to:
Correct answer:D
Standard Method
Given: We need to evaluate .
Find: The numerical value of the given trigonometric expression.
Convert cosec and sec into sine and cosine:
Taking the common denominator,
Now simplify the numerator:
Using and ,
Now simplify the denominator using :
Substituting back,
Using the complementary angle identity ,
Therefore, the value of the expression is . Hence, the correct option is D.
Rewrite the numerator cleverly
Given: .
Find: Its numerical value.
Write the expression over a common denominator:
Now observe that the numerator matches the form of :
Also,
So,
Since ,
This works quickly because the numerator is intentionally convertible into a single cosine term. Therefore, the correct option is D.
Converting and incorrectly. The correct identities are and . Do not interchange sine and cosine in the denominators.
Combining the two fractions without taking the proper common denominator. The denominator must be , and the numerator becomes .
Missing the identity in the numerator. Write and as and to recognize the pattern correctly.
Using the double-angle identity incorrectly for the denominator. Since , we get , not directly.
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