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Question

Determine the smallest positive value of x (in degrees) for which tanx+100°=tanx+50°tanxtanx-50°.


A

30°

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B

45°

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C

60°

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D

75°

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Solution

The correct option is A

30°


Finding the smallest positive value of x

tanx+100°=tanx+50°tanxtanx-50°

tanx+100°tanx-50°=tanx+50°tanx

sinx+100°cosx-50°cosx+100°sinx-50°=sinx+50°sinxcosx+50°cosx

Applying componendo and dividendo we get,

sin2x+50°sin150°=-cos50°cos2x+50°

sin2x+50°×cos2x+50°=-cos50°×sin150°

sin4x+100°=-sin40°

sin4x+100°=sin-40°

4x+100°=-40° {If siny=sinxy=x}

4x+100°=πn-(-1)n40°

Substitute n=1, smallest positive value of x is given by,

4x=120°

x=30°

Hence, option A is correct.


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