Multiple Integrals and their Applications solved questions

CHAPTER 44
Multiple Integrals and their Applications

44.1 Evaluate the iterated integral (x + 2y) dx dy.
Therefore,


44.2 Evaluate the iterated integral (x2 + y2) dy dx.

Therefore,


44.3 Evaluate the iterated integral sin e dr d6.
Therefore, (Problem 20.48).

44.4 Evaluate the iterated integral
Hence,


44.5 Evaluate the iterated integral dx dy dz.
Hence,
Therefore,

44.6 Evaluate
In this case the double integral may be replaced by a product:
6. (See Problem 44.71.)

44.7 Evaluate

Therefore,


44.8 Evaluate

dx cannot be evaluated in terms of standard functions. Therefore, we change the order of integration.
using Fig. 44-1.




Fig. 44-1


44.9 Evaluate sin y dx dy.
s(sin y)ecos
Therefore,


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,406 CHAPTER 44

44.10 Evaluate

Therefore,



44.11 Evaluate where 9? is the region bounded by y —x and y = x2.

The curves y = x and y = x2 intersect at (0,0) and (1,1), and, for 0<*<1, y =x is above
y = x (see Fig. 44-2).




Fig. 44-2 Fig. 44-3


44.12 Evaluate where 91 is the region bounded by y = 2x, y = 5x, and x = 2.

The lines y = 2x and y = 5x intersect at the origin. For 0 < j c < l , the region runs from y = 2x
up to y = 5x (Fig. 44-3). Hence,


44.13 Evaluate where &i is the region above the x-axis bounded by y 2 = 3x and y2 = 4 — x
(see Fig. 44-4).
It is convenient to evaluate / by means of strips parallel to the *-axis.




Fig. 44-4


44.14 Evaluate where £% is the region in the first quadrant bounded by x2 = 4 - 2y.

, MULTIPLE INTEGRALS AND THEIR APPLICATIONS 407

The curve x2 = 4 - 2y is a parabola with vertex at (0, 2) and passing through the A:-axis at
x =2 (Fig. 44-5). Hence,

Note that, if we integrate using strips
parallel to the y-axis, the integration is difficult.




Fig. 44-5 Fig. 44-6

44.15 Let 91 be the region bounded by the curve y = Vic and the line y = x (Fig. 44-6). Let
if y^O and f ( x , 0) = 1. Compute

dy. Integration by parts yields J y sin y dy =
sin y - y cos y. Hence, / = (-cos y + y cos y - sin y) (-sin 1)-(-!) = !-sin 1.

44.16 Find the volume V under the plane z = 3x + 4y and over the rectangle 91: l<x£2, O s y < 3 .




44.17 Find the volume V in the first octant bounded by z = y2, x = 2, and y = 4.



44.18 Find the volume V of the solid in the first octant bounded by y = 0, z = 0, y = 3, z = x, and z + x = 4
(Fig. 44-7).
For given x and y, the z-value in the solid varies from z =x to z = — x + 4. So V=




Fig. 44-7