Math, asked by kanekiEl69, 3 months ago

A cow is tethered with a rope 2.8 m long. What is the maximum periphery the cow
can graze​

Answers

Answered by s3625
2

Answer:

The maximum area the cow can gaze is 1256 square feet

Given that a cow is tethered with a rope 20 feet long

To find: Maximum area the cow can graze

The maximum area the cow can gaze is the area of the circle with radius 20 feet

The area of circle is given as:

area = \pi r^2

Where, "r" is the radius of circle and  is a constant equal to 3.14

Substituting the values in above formula we get,

area = 3.14 \times 20^2\\\\area = 3.14 \times 400\\\\area = 1256

Thus the maximum area the cow can gaze is 1256 square feet.

Hope it helps...

Thanks!

Answered by manaliakerkar82
0

Answer:

Step-by-step explanation:

The maximum area the cow can gaze is 1256 square feet

Given that a cow is tethered with a rope 20 feet long

To find: Maximum area the cow can graze

The maximum area the cow can gaze is the area of the circle with radius 20 feet

The area of circle is given as:

area = \pi r^2

Where, "r" is the radius of circle and  is a constant equal to 3.14

Substituting the values in above formula we get,

area = 3.14 \times 20^2\\\\area = 3.14 \times 400\\\\area = 1256

Thus the maximum area the cow can gaze is 1256 square feet.

Hope it helps...

Thanks!

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