The ratio of the length of a vertical rod to the length of its shadow is 1 : √3. What is the angle of elevation of the Sun?

Aptitude Height and Distance Difficulty: Easy
Choose an option
  • A
    30°
  • B
    45°
  • C
    60°
  • D
    90°
  • E
    15°

Answer

Correct Answer: 30°

Explanation

Introduction / Context:Shadow problems convert to tan θ = height / shadow. A given ratio directly yields θ by matching to standard angles.

Given Data / Assumptions:

  • Height : shadow = 1 : √3 ⇒ height/shadow = 1/√3.

Concept / Approach:tan θ = height/shadow = 1/√3. Standard angles give tan 30° = 1/√3, so θ = 30°.

Step-by-Step Solution:

tan θ = 1/√3 ⇒ θ = 30°.

Verification / Alternative check:If θ were 45°, the ratio would be 1 : 1; if 60°, the ratio would be √3 : 1. Neither matches 1 : √3.

Why Other Options Are Wrong:45° and 60° correspond to different tangent values; 90° would give zero shadow (not this ratio), 15° gives much larger shadow.

Common Pitfalls:Inverting the ratio; using sine instead of tangent for shadow length.

Final Answer:30°

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