Recasting spheres — A 3 cm diameter sphere is recast into three spheres of diameters 1.5 cm, 2 cm, and a third unknown. Find the third diameter.
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A2.66 cm
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B2.25 cm
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C3 cm
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D2.50 cm
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E3.5 cm
Answer
Correct Answer: 2.50 cm
Explanation
Introduction / Context:Volume is conserved when melting and recasting. For spheres, volume depends on the cube of radius: V = (4/3)πr^3. Work exactly to avoid rounding errors.
Given Data / Assumptions:
- Initial diameter = 3 cm ⇒ r0 = 1.5 cm
- Two new diameters: 1.5 cm (r1 = 0.75 cm) and 2 cm (r2 = 1 cm)
- Third radius r3 unknown
Concept / Approach:Set total initial volume equal to sum of volumes of the three smaller spheres and solve for r3.
Step-by-Step Solution:V0 = (4/3)π(1.5)^3 = (4/3)π * 3.375 = 4.5πV1 = (4/3)π(0.75)^3 = (4/3)π * 0.421875 = 0.5625πV2 = (4/3)π(1)^3 = 1.333...πV3 = V0 − (V1 + V2) = 4.5π − 1.895833...π = 2.604166...π = (125/48)π(4/3)π r3^3 = (125/48)π ⇒ r3^3 = 125/64 ⇒ r3 = 5/4 = 1.25 cm ⇒ diameter = 2.50 cm
Verification / Alternative check:Exact fraction arithmetic confirms r3^3 = 125/64.
Why Other Options Are Wrong:2.66 cm is a rounded overestimate; 2.25 cm is too small; 3 cm and 3.5 cm exceed available volume.
Common Pitfalls:Using diameters directly (cube of diameter/2) or rounding π prematurely.
Final Answer:2.50 cm