let lsin theta 10 log sin theta the number of triangles abc

Let $$L\sin \theta = 10 + \log \sin \theta .$$ The number of triangles $$ABC$$ such that $$\log b + 10 = \log c + L\sin B$$ is

A. one

B. two

C. infinite

D. None of these

Answer : one

Solution :
$$\eqalign{ & \log b + 10 = \log c + 10 + \log \sin B \cr & \Rightarrow \,\,b = c\sin B \cr & \Rightarrow \,\,b = b\sin C \cr & \Rightarrow \,\,\sin C = 1. \cr} $$

Releted MCQ Question on
Trigonometry >> Properties and Solutons of Triangle

Releted Question 1

If the bisector of the angle $$P$$ of a triangle $$PQR$$ meets $$QR$$ in $$S,$$ then

A. $$QS = SR$$

B. $$QS : SR = PR : PQ$$

C. $$QS : SR = PQ : PR$$

D. None of these

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Releted Question 2

From the top of a light-house 60 metres high with its base at the sea-level, the angle of depression of a boat is 15°. The distance of the boat from the foot of the light house is

A. $$\left( {\frac{{\sqrt 3 - 1}}{{\sqrt 3 + 1}}} \right)60\,{\text{metres}}$$

B. $$\left( {\frac{{\sqrt 3 + 1}}{{\sqrt 3 - 1}}} \right)60\,{\text{metres}}$$

C. $${\left( {\frac{{\sqrt 3 + 1}}{{\sqrt 3 - 1}}} \right)^2}{\text{metres}}$$

D. none of these

View Answer

Releted Question 3

In a triangle $$ABC,$$ angle $$A$$ is greater than angle $$B.$$ If the measures of angles $$A$$ and $$B$$ satisfy the equation $$3\sin x - 4{\sin ^3}x - k = 0, 0 < k < 1,$$ then the measure of angle $$C$$ is

A. $$\frac{\pi }{3}$$

B. $$\frac{\pi }{2}$$

C. $$\frac{2\pi }{3}$$

D. $$\frac{5\pi }{6}$$

View Answer

Releted Question 4

In a triangle $$ABC,$$ $$\angle B = \frac{\pi }{3}{\text{ and }}\angle C = \frac{\pi }{4}.$$ Let $$D$$ divide $$BC$$ internally in the ratio 1 : 3 then $$\frac{{\sin \angle BAD}}{{\sin \angle CAD}}$$ is equal to

A. $$\frac{1}{{\sqrt 6 }}$$

B. $${\frac{1}{3}}$$

C. $$\frac{1}{{\sqrt 3 }}$$

D. $$\sqrt {\frac{2}{3}} $$

View Answer

Let $$L\sin \theta = 10 + \log \sin \theta .$$ The number of triangles $$ABC$$ such that $$\log b + 10 = \log c + L\sin B$$ is

Releted MCQ Question on
Trigonometry >> Properties and Solutons of Triangle

If the bisector of the angle $$P$$ of a triangle $$PQR$$ meets $$QR$$ in $$S,$$ then

From the top of a light-house 60 metres high with its base at the sea-level, the angle of depression of a boat is 15°. The distance of the boat from the foot of the light house is

In a triangle $$ABC,$$ angle $$A$$ is greater than angle $$B.$$ If the measures of angles $$A$$ and $$B$$ satisfy the equation $$3\sin x - 4{\sin ^3}x - k = 0, 0 < k < 1,$$ then the measure of angle $$C$$ is

In a triangle $$ABC,$$ $$\angle B = \frac{\pi }{3}{\text{ and }}\angle C = \frac{\pi }{4}.$$ Let $$D$$ divide $$BC$$ internally in the ratio 1 : 3 then $$\frac{{\sin \angle BAD}}{{\sin \angle CAD}}$$ is equal to

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Let $$L\sin \theta = 10 + \log \sin \theta .$$ The number of triangles $$ABC$$ such that $$\log b + 10 = \log c + L\sin B$$ is

Releted MCQ Question on Trigonometry >> Properties and Solutons of Triangle

If the bisector of the angle $$P$$ of a triangle $$PQR$$ meets $$QR$$ in $$S,$$ then

From the top of a light-house 60 metres high with its base at the sea-level, the angle of depression of a boat is 15°. The distance of the boat from the foot of the light house is

In a triangle $$ABC,$$ angle $$A$$ is greater than angle $$B.$$ If the measures of angles $$A$$ and $$B$$ satisfy the equation $$3\sin x - 4{\sin ^3}x - k = 0, 0 < k < 1,$$ then the measure of angle $$C$$ is

In a triangle $$ABC,$$ $$\angle B = \frac{\pi }{3}{\text{ and }}\angle C = \frac{\pi }{4}.$$ Let $$D$$ divide $$BC$$ internally in the ratio 1 : 3 then $$\frac{{\sin \angle BAD}}{{\sin \angle CAD}}$$ is equal to

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