Evaluate the product (log tan 1°) (log tan 2°) … (log tan 50°).
Aptitude
Logarithm
Difficulty: Easy
Choose an option
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A0
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B1
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C2
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D- 1
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ENone of these
Answer
Correct Answer: 0
Explanation
Introduction / Context:Among well-known trigonometric values, tan 45° = 1, so log(tan 45°) = log 1 = 0 (for any base). Because the product explicitly includes the factor with 45°, the entire product collapses to zero.
Given Data / Assumptions:
- Sequence runs from 1° up to 50°; thus it includes 45°.
- All logs share the same base.
Concept / Approach:
- Multiplying any finite product by 0 yields 0.
- No other special pairing is required, though identities like tan θ · tan(90° − θ) = 1 can explain complementary behavior.
Step-by-Step Reasoning:
tan 45° = 1 ⇒ log(tan 45°) = log 1 = 0Product contains a 0 factor ⇒ total product = 0Verification / Alternative check:Countrate the terms: 1°, 2°, …, 45°, …, 50° includes 45°; hence result is immediate.
Why Other Options Are Wrong:
- 1, 2, −1 ignore the zero factor.
Common Pitfalls:
- Confusing “product of logs” with “log of product”. Here we are literally multiplying log values.
Final Answer:0