khaleforneean
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How do I use integration to prove the area of a triangle is 1/2 * b * h ?
Area of a triangle proof
- Thread starter khaleforneean
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Try drawing a triangle with its base on the x-axis, and a vertex at the origin. You might then proceed by cases.
The simplest case will be a right triangle with the height line on the y-axis. Then the other side has equation y = -(h/b)x + h, where "h" is the height and "b" is the length of the base. Use a basic "integral as area" argument.
Then consider a triangle with its "peak" vertex above the segment on the x-axis which is the base. You can split this into two right triangles, and thus two integrals, similar to the first case.
And so forth.
Eliz.
The simplest case will be a right triangle with the height line on the y-axis. Then the other side has equation y = -(h/b)x + h, where "h" is the height and "b" is the length of the base. Use a basic "integral as area" argument.
Then consider a triangle with its "peak" vertex above the segment on the x-axis which is the base. You can split this into two right triangles, and thus two integrals, similar to the first case.
And so forth.
Eliz.
khaleforneean
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Thanks a lot Eliz I got it, I just never thought of using (h/b) as the slope but it made a lot of sense right away. Thanks!