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A tree is 100 meters away from an observer. The angle of elevation to the top of the tree is 45°. What is the height of the tree?

A50m

B75m

C100m

D150m

Answer:

C. 100m

Read Explanation:

The correct answer is Option C (100 m).

This is a classic trigonometry problem that you can actually solve in your head once you know a simple property of 45° triangles.

The "Golden Rule" of 45°

In any right-angled triangle where the angle of elevation is 45°, the triangle is isosceles. This means the horizontal distance (base) and the vertical height are exactly the same.

  • Distance to the tree: 100 m

  • Height of the tree: 100 m


If you need to show the work using trigonometry:

  1. Identify the ratio: tan(θ)=Opposite (Height)Adjacent (Distance)\tan(\theta) = \frac{\text{Opposite (Height)}}{\text{Adjacent (Distance)}}

  2. Plug in the numbers: tan(45)=h100\tan(45^\circ) = \frac{h}{100}

  3. Solve: Since tan(45)=1\tan(45^\circ) = 1, the equation becomes:
    1=h1001 = \frac{h}{100}
    h=100 mh = 100 \text{ m}


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