Scale Factor Between Spheres
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The formula for the volume of a sphere with radius $r$ is $\frac{4}{3}\pi r^3$. Let $S$ be a sphere with radius $r$ and $S_1$ be a sphere with radius $r_1$ and twice the volume of $S$. Then, we have $2\cdot\frac{4}{3}\pi r^3=\frac{4}{3}\pi {r_1}^3$. Solving for $r_1$ in terms of $r$, we have $r_1=\sqrt[3]{2}r$.
In general, the dimensions of a solid whose volume is $n$ times the volume of another similar solid is $\sqrt[3]{n}$ times the dimensions of the other solid.
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Analysis15
Updated on December 11, 2022Comments
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Analysis15 11 months
What is the radius of a sphere whose volume is twice larger than that of a sphere of radius r?
I believe that this problem has something to do with scaling factor.
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angryavian over 6 yearsTry writing down the formula for the volume of a sphere and solve for the radius of the larger sphere
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