From the top of a hill h metres high the angles of depressions of

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 Multiple Choice QuestionsMultiple Choice Questions

251.

1 + tanhx21 - tanhx2 = ?

  • e - x

  • ex

  • 2ex2

  • 2e - x2


252.

In ABC, if 1b + c + 1c +a = 3a +b + c, then C is equal to

  • 90°

  • 60°

  • 45°

  • 30°


253.

Observe the following statementsI In ABC, bcos2C2 + ccos2B2 = sII  In ABC, cotA2 = b + c2  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


254.

In a triangle, if r1 = 2r2 = 3r3, then ab + bc + ca  = ?

  • 7560

  • 15560

  • 17660

  • 19160


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255.

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

  • htanβ - tanαtanβ

  • htanα - tanβtanα

  • htanβ + tanαtanβ

  • htanβ + tanαtanα


B.

htanα - tanβtanα

Let AB be a hill whose height is h metres andCD be a pillar of height h' metres.In EDB,tanα = h - h'ED        . . . iand in ACB,

tanβ = hAC = hED    . . . iiEliminate ED from eqs i and ii, we gettanα = h - h'htanβ h tanαtanβ = h - h' h' = htanβ - tanαtanβ


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256.

The period of sin4x + cos4x is

  • π42

  • π22

  • π4

  • π2


257.

cosxcosx - 2y = λ  tanx - ytany is equal to

  • 1 + λ1 - λ

  • 1 - λ1 + λ

  • λ1 + λ

  • λ1 + λ


258.

cosAcos2Acos4A ... cos2n - 1A equals

  • sin2nA2nsinA

  • 2nsin2nAsinA

  • 2nsin2nAsin2nA

  • sinA2nsin2nA


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259.

If 3cos(x)  sin x, then the general solution of sin2(x) - cos(2x) = 2 - sin(2x) is

  •  + - 1nπ2, n  Z

  • 2, n  Z

  • 4n ± 1π2, n  Z

  • 2n - 1π, n  Z


260.

In a ABC a + b + cb + c - ac + a - b a + b - c4b2c2 = ?

  • cos2A

  • cos2B

  • sin2A

  • sin2B


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