A 100 ft stainless steel rope is to be cut into two sections. One of the sections will be used to create a square and the other will be used to create an equilateral triangle. What will the lengths of two sections of the rope have to be in order to maximize the combined areas? Recall that the height of an equilateral is v3/2 of its base.

Calculus: Early Transcendentals
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ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
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Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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A 100 ft stainless steel rope is to be cut into two sections. One of the sections will be used to create a square and the other will be used to create an equilateral triangle. What will the lengths of two sections of the rope have to be in order to maximize the combined areas? Recall that the height of an equilateral is √3/2 of its base.

 

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A 100 ft stainless steel rope is to be cut into two sections. One of the sections will be
used to create a square and the other will be used to create an equilateral triangle.
What will the lengths of two sections of the rope have to be in order to maximize
the combined areas? Recall that the height of an equilateral is v3/2 of its base.
Transcribed Image Text:A 100 ft stainless steel rope is to be cut into two sections. One of the sections will be used to create a square and the other will be used to create an equilateral triangle. What will the lengths of two sections of the rope have to be in order to maximize the combined areas? Recall that the height of an equilateral is v3/2 of its base.
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