tan2π/5-tanπ/15-tan✓3tan2π/5tanπ)15
Answers
Answer:
its answer will be root 3 option d
- Given expression is equal to √3.
To Find :- Value of Tan(2π/5) - tan(π/15) - √3•tan(2π/5)•tan(π/15) ?
Formula used :-
- tan(A - B) = [(tanA - tanB)/(1 + tanA•tanB)]
- tan(π/3) = tan 60° = √3
Solution :-
subtracting (π/15) from (2π/5) we get :-
→ (2π/5) - (π/15) = (6π - π)/15
→ (2π/5 - π/15) = (5π/15)
→ (2π/5 - π/15) = (π/3)
multiply by tan both sides,
→ tan(2π/5 - π/15) = tan(π/3)
→ tan(2π/5 - π/15) = √3
using tan(A - B) = [(tanA - tanB)/(1 + tanA•tanB)] in LHS we get :-
→ [{tan(2π/5) - tan(π/15)}/{1 + tan(2π/5)• tan(π/15)}] = √3
cross - multiply,
→ tan(2π/5) - tan(π/15) = √3 + √3•tan(2π/5)• tan(π/15)
→ tan(2π/5) - tan(π/15) - √3•tan(2π/5)• tan(π/15) = √3 (Ans.)
Hence, required value is equal to √3 .
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