Approximate ∫1 0 x2dx using (a) left endpoints, (b) right endpoints, (c) midpoints and n = 1000 partitioning intervals.

Post by **answerhappygod** » Wed Jul 13, 2022 5:06 am

Approximate ∫10 x2dx using (a) left endpoints, (b) right endpoints, (c) midpointsandn = 1000 partitioning intervals. Explain what technology you usedin the estimate. Fillout this table. type approximation errorlef trightmidpoint(2) Let F (x) = ∫x0 sin t2dt. Sketch an approximate graph of F on the interval [0,√π] byfilling out this table and then plotting the correspondingpoints.x ≈F (x)00.511.5√πTo fill out each field in this table using the midpointapproximation with n = 100intervals. Explain what technology you used.