Answer to Question #255846 in Geometry for Sandeejhon

Question #255846

Find the volume of the largest cube that can be cut from a whose a log of cross section whose radius is 12 centimeters

Expert's answer

Consider a square inscribed in a circle. The radius of a wood log or a circle is equal to "1\/2" of its diagonal "d." By Pythagorean Theorem, find the side of the square "a"

"a^2+a^2=d^2"

"a=d\/\\sqrt{2}"

Substitute

"a=\\dfrac{2(12\\ cm)}{\\sqrt{2}}=12\\sqrt{2}\\ cm"

If the length of the log is no less than "12\\sqrt{2}\\ cm," then the volume of the largest cube that can be cut from a whose a log is

"V=a^3=(12\\sqrt{2}\\ cm)^3=3456\\sqrt{2}\\ cm^3"

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Answer to Question #255846 in Geometry for Sandeejhon

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