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A vertical tower of height H stands on the ground. From point A on the ground, the angle of elevation to the top is 45°. From point B, located 15 meters away from A (directly along the line extending from the base), the angle of elevation is 30°. What is the height of the tower?

A15(√3-1) m

B15(√3+1)/2 m

C20 (√3-1) m

D20(√3+1) m

Answer:

B. 15(√3+1)/2 m

Read Explanation:

Let the height of the tower be (H) and the distance from point A to the base of the tower be (x).

From point A:

tan45=Hx\tan 45^\circ=\frac{H}{x}
Since (tan45=1),(\tan45^\circ=1),

Hx=1H=x\frac{H}{x}=1 \Rightarrow H=x

From point B, which is 15 m farther away:

Distance from B to tower=x+15\text{Distance from B to tower}=x+15

The angle of elevation from B is (30):(30^\circ):


tan30=Hx+15\tan30^\circ=\frac{H}{x+15}

Since (tan30=13),(\tan30^\circ=\frac{1}{\sqrt3}),

Hx+15=13\frac{H}{x+15}=\frac{1}{\sqrt3}

Substitute (H=x):

xx+15=13\frac{x}{x+15}=\frac{1}{\sqrt3}

Cross multiply:

3x=x+15\sqrt3x=x+15
x(31)=15x(\sqrt3-1)=15
x=1531x=\frac{15}{\sqrt3-1}

Rationalize:

x=15(3+1)31x=\frac{15(\sqrt3+1)}{3-1}
x=15(3+1)2x=\frac{15(\sqrt3+1)}{2}
$


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