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Trigonometric Functions

Multiple Choice Questions

861.

If $\tan (θ) + \tan (θ + \frac{π}{3}) + \tan (θ + \frac{2 π}{3}) = 3$ , then which of the following is equal to 1 ?

$\tan (2 θ)$
$\tan (3 θ)$
$\tan^{2} (θ)$
$\tan^{3} (θ)$

862.

$If α + β + γ = 2 θ, then \cos (θ) + \cos (θ - α) + \cos (θ - β) + \cos (θ - γ) = ?$

$4 \sin (\frac{α}{2}) . \cos (\frac{β}{2}) \cos (\frac{γ}{2})$
$4 \sin (\frac{α}{2}) . \sin (\frac{β}{2}) \sin (\frac{γ}{2})$
$4 \cos (\frac{α}{2}) . \cos (\frac{β}{2}) . \cos (\frac{γ}{2})$
$4 \sin (α) . \cos (β) . \cos (γ)$

863.

$\{x \in R : \cos (2 x) + 2 \cos^{2} (x) = 2\} = ?$

$\{2 nπ + \frac{π}{3} : n \in Z\}$
$\{nπ \pm \frac{π}{6} : n \in Z\}$
$\{nπ + \frac{π}{3} : n \in Z\}$
$\{2 nπ - \frac{π}{3} : n \in Z\}$

864.

$\frac{1 + \tanh (\frac{x}{2})}{1 - \tanh (\frac{x}{2})} = ?$

$e^{- x}$
$e^{x}$
$2 e^{\frac{x}{2}}$
$2 e^{- \frac{x}{2}}$

865.
$In ∆ ABC, if \frac{1}{b + c} + \frac{1}{c + a} = \frac{3}{a + b + c}, then C is equal to$

$90 °$

$60 °$

$45 °$

$30 °$

$60 °$

$Given that, \frac{1}{b + c} + \frac{1}{c + a} = \frac{3}{a + b + c} \Rightarrow 1 + \frac{b}{a + c} + 1 + \frac{a}{b + c} = 3 \Rightarrow b (b + c) + a (a + c) = (a + c) (b + c) \Rightarrow b^{2} + bc + a^{2} + ac = ab + ac + bc + c^{2} \Rightarrow a^{2} + b^{2} - c^{2} = ab We know that, \cos (C) = \frac{a^{2} + b^{2} - c^{2}}{2 ab} = \frac{ab}{2 ab} = \frac{1}{2} \Rightarrow C = 60 °$

866.

$Observe the following statements (I) In ∆ ABC, {bcos}^{2} (\frac{C}{2}) + {ccos}^{2} (\frac{B}{2}) = s (II) In ∆ ABC, \cot (\frac{A}{2}) = \frac{b + c}{2} \Rightarrow B = 90 ° Which of the following is correct ?$

Both I and II are true
I is true, II is false
I is false, II is true
Both I and II are false

867.

$In a triangle, if r_{1} = 2 r_{2} = 3 r_{3}, then \frac{a}{b} + \frac{b}{c} + \frac{c}{a} = ?$

$\frac{75}{60}$
$\frac{155}{60}$
$\frac{176}{60}$
$\frac{191}{60}$

868.

From the top of a hill h metres high the angles of depressions of the top and the bottom of a pillar are $α$ and $β$ respectively.The height (in metres) of the pillar is