O Macmillan LearningAssume that z = f(x, y) is a continuous function over the region R. Assume a = 7 and b = 2.Rr=baxr=aExpress the double integral f f(x, y) dA over R as an iterated integral using polar coordinates.(Use symbolic notation and fractions where needed.)0₂1/₂ = [" ["Df(x, y) dAR0₁f(r cos(0), r sin(0))r dr de Macm0₁ =0₂ =r1 =12 =

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Answered: Assume that z = f(x, y) is a continuous…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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2. Consider the integral fő fő f² f(x, y, z) dx dy dz. (a) Rewrite the iterated integral in the order dx dz dy. (b) Rewrite the iterated integral in the order dz dy dx.
Calculate the integral of f(x, y) = (x² + y2)-3/2 over the region x² + y² ≤ 81, x + y ≥ 9 by changing to polar coordinates. (Use symbolic notation and fractions where needed.) √(x² + 3²³)-³2²dA=
Set up an integral for the circulation of F along the curve C, where F = (x² + y², x² - y²) and C is the triangle with vertices (0,0), (8,4), and (0,4), oriented positively. for Find a, b, c, d, and f(x,y). a= b= C = d= - [[ f(x, y) dz dy f(x,y)= F. dr =
(3) For each region shown below, decide whether to use polar coordinates or rectangular J₁² f dA as an iterated integral, where f is an arbitrary dxdy = rdrdo, and f(x, y) = coordinates and write continuous function on R. Remember that dA f(r cos(8), r sin(0)). (a) (b) -1 4 1 4 y=1-x² 1 X X (c) (d) = -1 y 1. 0 6 1 X
2. Consider the triangle {(x,y)| x, y > 0, 2x + y < 1}. Let C be the boundary of this triangle oriented in the anticlockwise direction. Find | y dx + (x² + y) dy (i) using the definition of line integral directly and without using Green's theorem. (ii) using Green's theorem.

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