Definition talk:Definite Integral

The geometric interpretation part of this is exactly what I had in mind for the geometric Riemann sum. But it seems silly to just copy and paste. The concepts are related but not identical. Any ideas?--GFauxPas 17:49, 18 January 2012 (EST)
 * Nevermind, I have an idea. --GFauxPas 19:58, 18 January 2012 (EST)
 * I think the approach would be to include the Riemann Sum as a transcluded section in the Definite Integral page so as to maximise the use of common material. --prime mover 01:52, 19 January 2012 (EST)
 * Well let me say my idea and you'll tell me what you think. The upper and lower sums are examples of Riemann Sums, but I can make a picture where the choice of $(c_i, f(c_i))$ is completely arbitrary, i.e. somewhere in the middle of the sub interval. Perhaps I can even put a discontinuity on the graph, just to emphasize that the Riemann Sum doesn't require continuity. --GFauxPas 08:08, 19 January 2012 (EST)