Let R= [0, 4] × [1, 2]. Create a Riemann sum by subdividing [0, 4] into m = 2 intervals, and [−1, 2] into n = 3 subintervals, then use it to estimate the value of (1 – xy²)dA. R Take the sample points to be the upper left corner of each rectangle. Answer:

Let R= [0, 4] × [1, 2]. Create a Riemann sum by subdividing [0, 4] into m = 2 intervals, and [−1, 2] into n = 3 subintervals, then use it to estimate the value of (1 – xy²)dA. R Take the sample points to be the upper left corner of each rectangle. Answer:

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.8: Probability

Problem 18E

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Question

3.12

please solve it on paper

Let R = [0, 4] × [−1, 2]. Create a Riemann sum by subdividing [0, 4] into m = 2 intervals, and [−1, 2] into n = = 3
subintervals, then use it to estimate the value of
₂(¹ – xy²)dA.
R
Take the sample points to be the upper left corner of each rectangle.
Answer:

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