Why is the area of a circle given by the formula $pir^2$ ?

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Why is the area of a circle given by the formula $pir^2$ ?

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Answer 1 · 2016-08-31T21:34:11

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Explanation:

The circumference of a circle is $pi$ times its diameter. In fact that's the original definition of $pi$ . SInce the diameter is twice the radius, that means that the circumference of a circle of radius $r$ is $2pir$ .

If we take a circle of radius $r$ and cut it into a number of segments, we can then reassemble those segments into a sort of bumpy parallelogram with height $r$ and longer sides of length $pir$ (each being half the circumference).

If we use a larger number of thin segments, then this is more like a rectangle with height $r$ and base $pir$ , which therefore has area $r*pir = pir^2$

Here's an animation for just $8$ segments...

enter image source here

So the area of the circle is proportional to the square of the radius.

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Why is the area of a circle given by the formula $pir^2$ ?

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Explanation:

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Why is the area of a circle given by the formula $pir^2$ ?