Problem: A piece of wire, 400 cm long, is to be bent into an isosceles triangle. What should the dimensions of the triangle be in order to maximize its area? Use the First and Second Derivative Tests (derivatives, calculations, and tables for FDT and SDT) to check that your answer(s) is (are) indeed, for the maximum. Determine the maximum value for the area of this triangle. Round you answer(s) to the nearest tenth.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Problem: A piece of wire, 400 cm long, is to be bent into an isosceles triangle. What
should the dimensions of the triangle be in order to maximize its area? Use the
First and Second Derivative Tests (derivatives, calculations, and tables for FDT
and SDT) to check that your answer(s) is (are) indeed, for the maximum.
Determine the maximum value for the area of this triangle. Round you answer(s)
to the nearest tenth.
Transcribed Image Text:Problem: A piece of wire, 400 cm long, is to be bent into an isosceles triangle. What should the dimensions of the triangle be in order to maximize its area? Use the First and Second Derivative Tests (derivatives, calculations, and tables for FDT and SDT) to check that your answer(s) is (are) indeed, for the maximum. Determine the maximum value for the area of this triangle. Round you answer(s) to the nearest tenth.
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