Two spheres — ratio of diameters 3 : 5 — find ratio of surface areas: If the diameters of two spheres are in the ratio 3 : 5, what is the ratio of their surface areas?
Aptitude
Volume and Surface Area
Difficulty: Easy
Choose an option
-
A9 : 25
-
B9 : 10
-
C3 : 5
-
D27 : 125
-
ENone of these
Answer
Correct Answer: 9 : 25
Explanation
Introduction / Context:Surface area of a sphere depends on the square of its radius (or diameter). Thus, a ratio of diameters translates to the square of that ratio for surface areas.
Given Data / Assumptions:
- d1 : d2 = 3 : 5 ⇒ r1 : r2 = 3 : 5.
- S ∝ r^2 (or ∝ d^2).
Concept / Approach:Square the linear ratio to obtain the surface area ratio.
Step-by-Step Solution:S1 : S2 = (3^2) : (5^2) = 9 : 25
Verification / Alternative check:Pick r1 = 3, r2 = 5; S1 = 36π, S2 = 100π ⇒ 36π : 100π = 9 : 25.
Why Other Options Are Wrong:9 : 10 and 3 : 5 are linear ratios; 27 : 125 applies to volumes (cube).
Common Pitfalls:Confusing surface-area scaling (square) with volume scaling (cube).
Final Answer:9 : 25