The value of
tanα + 2tan2α + 4tan4α + ... + 2n - 1tan2n - 1α + 2ncot2nα is
cot2nα
2ntan2nα
0
cotα
If tanαπ4 = cotβπ4, then
α + β = 0
α + β = 2n
α + β = 2n + 1
α + β = 2(2n + 1), ∀ n is an integer
The principal value of sin-1tan- 5π4 is
π4
- π4
π2
- π2
The value of cosπ15cos2π15cos4π15cos8π15
116
- 116
1
The principal amplitude of sin40° + icos40°5
70°
- 110°
110°
- 70°
Find the general solution of secθ + 1 = 2 + 3tanθ
The real part of 1 - cosθ + 2isinθ- 1
13 + 5cosθ
15 - 3cosθ
13 - 5cosθ
15 + 3cosθ
The value of sin36°sin72°sin108°sin144° is equal to
14
34
516
If sinA = 110 and sinB = 15 where A and B are positive acute angles, then A + B is equal to
π
π3
D.
Given that, sinA = 110 and sinB = 15We know that,sinA + B = sinAcosB + sinBcosA= 110 . 1 - 15 + 151 - 110= 11045 + 15910= 1502 + 3= 550= 12⇒ sinA + B = sinπ4 A + B = π4
The expression tan2α + cot2α is
≥ 2
≤ 2
≥ - 2
None of these