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![[Post New]](/templates/default/images/icon_minipost_new.gif) 22 May 2007 13:42:37 IST
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Prove that area of circle is 22/7 r*r Or pi r(square)
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22 May 2007 13:46:18 IST
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i m not that big genius
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22 May 2007 13:58:07 IST
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Let a regular polygon of n sides be inscribed in a circle of radius r, and let s be the length of each side.  | As we saw above, each chord s subtends a central angle of | 360°
n | . | h
r | = cos ½ | 360°
n | = cos | 180°
n | | h = r cos | 180°
n | . . . . . . . . (2) | | s = 2r sin | 180°
n | . . . . . . . . (3) | | AT = ½sh | = | ½· 2r sin | 180°
n | · r cos | 180°
n | | AT = ½sh | = | r² sin | 180°
n | · cos | 180°
n | This is the area of one of the triangles. The area A of the entire circle is approximated by all n triangles:
| A = nAT | = | n· r² sin | 180°
n | · cos | 180°
n | | n sin | 180°
n |  | ?. | Therefore, finally, | A?r² cos | 180°
n | . . . . . . . . (4) | Suppose now that the number of sides n is an enormously large number -- more than the number of stars in the entire universe! Then | the polygon will "exhaust" the circle. The central angle | 180°
n | (line 4) | will be indistinguishable from 0°. We will have A = ?r² cos 0°. A = ?r². | Or, on replacing r² with ( | D
2 | )² = | D²
4 | , | This is what we wanted to prove.
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Puneet Agrawal
IIT Delhi
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22 May 2007 17:16:13 IST
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Lets prove this by integration. Consider a thin circular area element of radius x inside the given circle and concentric with the given circle. The width of this element be dx.
If this element is straightened out, its approximately a rectangular strip of length
2 x and width dx.
Area of the strip dA = 2 x dx
A = 0 r 2x dx = r2 /2
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