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As the line moves around, a point is reached where the area that has been painted by the line is equal to the square value of the radius. Here the color of the paint changes. As the line continues to sweep around, another such segment gets painted, and then another. At this point the area that is left to paint before the circle is finished is much smaller than each square radius segment. The number of these segments in the area of the circle turns out to be equal to p. As this 'sweeping line' description demonstrates, the area of a circle is equal to the sum of p segments, each of which has an area equal to the square of the radius. The area of a circle is then given by the general equation A = pr2.
As an example of how to use this equation, imagine that you have a circular flower bed that is 20 feet in diameter, and you need to apply a layer of enriched soil. One bag contains enough of the soil to cover 10 square feet to the thickness you want, so how many bags of soil will you need? (Use p = 3.14). The radius of the flower bed is half of the diameter, or 10 feet. Substituting these values into the formula shows the area of the flower bed to be A = p X r X r. So A equals 3.14 X 10 X 10, which equals 314 square feet. You will therefore have to buy 31.4 bags of enriched soil (you could get 32 and spread the extra a little thicker, or 31 and not use quite so much...).