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13 Nov 2019
(f) From reading this section, we see that given a continuous function f , we can approx imate the area under f by using rectangles/strips. Using 2 rectangles of equal width, approximate the area underneath the curve of f(r) 3 -over the interval (0,2 where the height of each rectangle/strip is the same as the height of our function at each right endpoint in the subinterval. (In other words, the two subintervals are (0, 1] and [1, 2], and the height of the two rectangles are f(1) and f(2).) Label this approximation as R2. (Hint: Sketching a picture may be helpful).
(f) From reading this section, we see that given a continuous function f , we can approx imate the area under f by using rectangles/strips. Using 2 rectangles of equal width, approximate the area underneath the curve of f(r) 3 -over the interval (0,2 where the height of each rectangle/strip is the same as the height of our function at each right endpoint in the subinterval. (In other words, the two subintervals are (0, 1] and [1, 2], and the height of the two rectangles are f(1) and f(2).) Label this approximation as R2. (Hint: Sketching a picture may be helpful).
Collen VonLv2
4 Jan 2019