Cone height from volume equality with a sphere: A sphere of radius r has the same volume as a cone whose base radius is also r. Find the height of the cone.

Aptitude Volume and Surface Area Difficulty: Easy
Choose an option
  • A
    2r
  • B
    r/3
  • C
    4r
  • D
    (2/3)r
  • E
    3r

Answer

Correct Answer: 4r

Explanation

Introduction / Context:Equating volumes tests recognition of standard formulas and simple algebra. Equal base radii remove one variable immediately.

Given Data / Assumptions:

  • V_sphere = (4/3)πr^3
  • V_cone = (1/3)πr^2h
  • V_sphere = V_cone

Concept / Approach:Cancel common factors and solve for h in terms of r.

Step-by-Step Solution:(4/3)πr^3 = (1/3)πr^2hMultiply both sides by 3/(πr^2): 4r = hTherefore, h = 4r

Verification / Alternative check:Substitute h = 4r back: V_cone = (1/3)πr^2 * 4r = (4/3)πr^3 = V_sphere, confirming equality.

Why Other Options Are Wrong:2r, r/3, and (2/3)r understate the needed height; 3r still falls short; only 4r equates the volumes.

Common Pitfalls:Forgetting the 1/3 factor in cone volume; mixing radius of sphere with diameter in cone base.

Final Answer:4r

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