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Find the integral of f(x) whose limit is 0 to 2.
The graph is supposed to look like two semicircles starting at the origin and ending at 6.
Please help me.
Thanks in advance.
Last edited by Prakash Panneer (2008-12-05 02:59:05)
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Prakash Panneer,
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This is how the image would appear.
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Integrate this geometrically. Remember, the integral is the "area under the curve".
"In the real world, this would be a problem. But in mathematics, we can just define a place where this problem doesn't exist. So we'll go ahead and do that now..."
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Do we have to find the equation of the two semi circles then add them?
or do we need enough to find the first semi circle based on the limit as 0 to 2?
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You don't need to know the equation of the second semicircle, since it doesn't appear in the region you're integrating.
The equation of the first would be y = -√[x(2-x)]. Integrating that between 0 and 2 will give you the answer.
However, this question doesn't need integration at all.
You know that the curve is a semicircle, so you can find the area underneath it directly.
It has radius 1, so the answer is -π/2 (the semicircle is underneath the x-axis so the answer must be negative)
Why did the vector cross the road?
It wanted to be normal.
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Thanks a lot
Letter, number, arts and science
of living kinds, both are the eyes.
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