You are manufacturing a can which is a perfect cylinder. The ideal volume of the can is 375 cm3 . Since the bases of the cylinders are exactly 50 cm2 , the volume of the can is V = 50h where h is the height of the can in centimeters. You need to cut the sides of the can so the volume has at most an error of 10 cm3 . Give the range of heights the can could have and still meet the required specifications for its volume.
You are manufacturing a can which is a perfect cylinder. The ideal volume of the can is 375 cm3 . Since the bases of the cylinders are exactly 50 cm2 , the volume of the can is V = 50h where h is the height of the can in centimeters. You need to cut the sides of the can so the volume has at most an error of 10 cm3 . Give the range of heights the can could have and still meet the required specifications for its volume.
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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You are manufacturing a can which is a perfect cylinder. The ideal volume of the can is 375 cm3 . Since the bases of the cylinders are exactly 50 cm2 , the volume of the can is V = 50h where h is the height of the can in centimeters. You need to cut the sides of the can so the volume has at most an error of 10 cm3 . Give the range of heights the can could have and still meet the required specifications for its volume.
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