Riemann sums approximate the area under a curve by summing the areas of rectangles based on left, right, or midpoint function values within subintervals. As the number of subintervals approaches infinity, this sum converges to the definite integral, offering a foundational technique for finding exact area under a curve [1]. The accuracy of these estimations is determined by whether the function is increasing or decreasing, requiring careful consideration of subinterval widths when data is given in table format [1]. For a deeper dive, read the full article on Khan Academy. Saved time Comprehensive Inappropriate Not working
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