A shadow of a tower standing on a level ground is found to be 40√3 meters longer when the Sun's altitude is 30° than when it is 60°. The height of the tower is:

Challenger App

Home
Questions
Notes
Blog
Contact Us
e-Book

No.1 PSC Learning App

★

1M+ Downloads

Get App

A shadow of a tower standing on a level ground is found to be 40√3 meters longer when the Sun's altitude is 30° than when it is 60°. The height of the tower is:

A50 m

B60 m

C70 m

D40 m

Answer:

B. 60 m

Read Explanation:

$tan60=\sqrt3=\frac hx$

$tan 30= \frac{1}{\sqrt3}=\frac{h}{40\sqrt3 +x}$

$x=\frac{h}{\sqrt3}$

$40\sqrt3+\frac{h}{\sqrt3}=\sqrt3h$

$120+h=3h$

$120=2h$

$h=60$

Read more in App

Related Questions:

Two angles are complementary. The larger angle is 6º less than thrice the measure of the smaller angle. What is the measure of the larger angle?

A triangle is to be drawn with one side 6cm and an angle on it is 45 what should be the minimum length of the side opposiste to this angle?

In the figure, AB=4 centimetres, BC =5 centimetres. <B=90° cos C is:

Find the area of the triangle; AB = 5, BC = 8 and ∠CAB = 60

cosA=0.8, then what is tanA ?