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a seafood company produces cans of tuna. each can gets wrapped with a paper label. if every can has a radius of 8.3 centimeters, what is the approximate length of the paper required to cover two cans?

Respuesta :

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The circumference c of a circle with radius r is:
[tex]c=2\pi r[/tex]
The total length of paper required to cover two cans is given by:
[tex]2\times\pi\times8.3\times2=104.3\ cm[/tex]

Answer:

The answer is 104.3 cm.

Step-by-step explanation:

In order to determine the answer, we have to know about the form of the can. In general, The can form is a cylinder, so we have to calculate the length of the contour.

The base of the can is a circle, so the contour is the perimeter of the circle.

The perimeter is:

[tex]P=2\pi R[/tex]

R: radius of the circle

Then, we know that the radius is 8.3 cm and also we have to cover two cans:

L=length of the two covers

[tex]L=2P=2*(2\pi R)=4\pi *8.3=104.3[/tex]

Finally, the answer is 104.3 cm.

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