Find the approximate area under the curve of the given equation by dividing the indicated intervals into n subintervals and then add up the areas of the inscribe rectangles. There are two values of n and therefore two approximations for the area. The height of each rectangle may be found by evaluating the function fort proper value of x. 10 y%3= between x 1 and x 5 for (a) n 4, (b) n 8 ... (a) The approximate area under the curve y= 10 for n =4 rectangles is (Round to three decimal places as needed.)

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Find the approximate area under the curve of the given equation by dividing the indicated intervals into n subintervals and then add up the areas of the inscribed rectangles. There are two values of n and therefore two approximations for the area. The height of each rectangle may be found by evaluating the function for the proper value of x. 10 y%3= between x = 1 and x = 5 for (a) n = 4, (b) n = 8 ..... (a) The approximate area under the curve y = 10 for n = 4 rectangles is (Round to three decimal places as needed.)