The dimensions of the can are 1.457 inches and 2.913 inches that will give the most volume
Step-by-step explanation:
Let us revise the rule of surface area and volume of a cylinder
Forty square inches of material is available to make a cylindrical; can of tuna and water, we need to find the dimensions of the can that will give the most volume
∵ S.A = 40 inches²
∵ S.A = 2π r h + 2π r²
∴ 2π r h + 2π r² = 40
Let us use this rule to find h in terms of r
- Subtract 2π r² from both sides
∵ 2π r h = 40 - 2 π r²
- Divide both sides by 2π r
∴ [tex]h=\frac{40-2\pi r^{2}}{2\pi r}[/tex]
∴ [tex]h=\frac{40}{2\pi r}-\frac{2\pi r^{2}}{2\pi r}[/tex]
∴ [tex]h=\frac{20}{\pi r}-r[/tex]
∵ V = π r² h
- Substitute h by its value above
∴ [tex]V=\pi r^{2}(\frac{20}{\pi r}-r)[/tex]
∴ V = 20 r - π r³
To find the most volume differentiate it with respect to r and equate it by 0 to find the value of r
∵ [tex]\frac{dV}{dr}[/tex] = 20 - 3π r²
∵ [tex]\frac{dV}{dr}[/tex] = 0
∴ 20 - 3π r² = 0
- Add 3π r² to both sides
∴ 20 = 3π r²
- Divide both sides by 3π
∴ r² = 2.122
- Take √ for both sides
∴ r = 1.457 inches
To find h substitute the value of r in the expression of h
∵ [tex]h=\frac{20}{\pi r}-r[/tex]
∴ [tex]h=\frac{20}{\pi (1.457)}-(1.457)[/tex]
∴ h = 2.913 inches
The dimensions of the can are 1.457 inches and 2.913 inches that will give the most volume
Learn more:
You can learn more about volume of solids in brainly.com/question/6443737
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