What's your question?Thepiman12 said:Homework Statement
A closed cylinder is required to have a volume of 40m^3 but made with the minimum amount of material. Determine the radius and height the cylinder must have to meet such a requirement.
V= πr^2h
Steps needed:
a) Insert value and transpose for h
b) Then sub into the area formula
c) Then differentiate
Homework Equations
V= πr^2h
The Attempt at a Solution
V= πr^2h
40= πr^2h
40/h= πr^2
h=πr^2/40
A= 2πrh+2πr^2 Subbing in h= πr^2/40
A= 2πr(πr^2/40)+2πr^2
The answer to that is related to "What is the reason for differentiating?" .Thepiman12 said:I expanded the brackets and got 2πr^2+80r^-1
And differentiated that to 4πr-80r^-2 Is that correct?
After that how would I go on to find the radius r?
The formula for calculating the volume of a cylinder is V = πr²h, where r is the radius and h is the height.
To find the radius of a cylinder, measure the distance from the center of the circular base to the edge of the cylinder. This will give you the radius (r) value that you can use in the volume formula.
Changing the height of a cylinder will directly affect its volume. As the height increases, the volume also increases. As the height decreases, the volume decreases. This is because the volume of a cylinder is directly proportional to its height.
The radius and height of a cylinder are independent of each other. This means that changing one value will not directly affect the other. However, both values are necessary to calculate the volume of the cylinder.
To convert the radius and height of a cylinder from inches to centimeters, multiply the inches value by 2.54. This will give you the equivalent value in centimeters. For example, if the cylinder has a radius of 2 inches and a height of 5 inches, the converted values would be 5.08 centimeters for the radius and 12.7 centimeters for the height.