Question

A flag pole 18 m high casts a shadow 9.6 m long. What is the distance of the top of the pole from the far end of the shadow?

• A. 20 metres
• B. 20.04 metres
• C. 20.4 metres
• D. 24 metres

Hint:

Whenever a vertical height and a shadow length are involved, you can model it as a right triangle and use the Pythagoras Theorem to find the diagonal distance.

Answer 1

The Correct Option is C

Step 1: Visualize the right-angled triangle
The vertical pole and its shadow form a right triangle.
Height of the pole = 18 m (vertical side)
Length of shadow = 9.6 m (horizontal side)
We need the distance from the top of the pole to the far end of the shadow — which is the hypotenuse. Step 2: Use Pythagoras Theorem
Let the distance be \( d \). Then, \[ d = \sqrt{(18)^2 + (9.6)^2} = \sqrt{324 + 92.16} = \sqrt{416.16} \] Step 3: Compute the square root
\[ \sqrt{416.16} \approx 20.4 \] \[ \boxed{20.4 \text{ metres}} \]