b) !iestion : 8تاليExpress by repeated integrals, the volume of the solid bounded above by the plane2x + 2y -z+1= 0, on the sides by the planes y = x, x = 2, y =0, and below by:= 0.2 x 2x+2y+12 x 2x+2y-:+la) S ſdzcdydx0 0c) [(2x +2y +1)dzdydxd) [ [ dydx0 0 02x+2y+1e) [(2x+2y+ I)dxdydz00EDIA

In this question we have to find the volume of solid above a plane and given X and Y and Z…

Express by repeated integrals, the volume of the solid bounded above by the plane 2x + 2y -:+1-0, on the sides by the planes y = x, x = 2, y = 0, and below by :=0. 2 : 2x+2y+1 a) Sdzdydx 2x+2y-zl b) S jdzdydx c) I [2x+2y+1 2y +1)dzdydx d) ( | dydx 0 00 e) [(2r+2y+l)dvdydz

Express by repeated integrals, the volume of the solid bounded above by the plane 2x + 2y -:+1-0, on the sides by the planes y = x, x = 2, y = 0, and below by :=0. 2 : 2x+2y+1 a) Sdzdydx 2x+2y-zl b) S jdzdydx c) I [2x+2y+1 2y +1)dzdydx d) ( | dydx 0 00 e) [(2r+2y+l)dvdydz

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter8: Further Techniques And Applications Of Integration

Section8.3: Volume And Average Value

Problem 11E

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Question

b) !
iestion : 8
تالي
Express by repeated integrals, the volume of the solid bounded above by the plane
2x + 2y -z+1= 0, on the sides by the planes y = x, x = 2, y =0, and below by
:= 0.
2 x 2x+2y+1
2 x 2x+2y-:+l
a) S ſdzcdydx
0 0
c) [(2x +2y +1)dzdydx
d) [ [ dydx
0 0 0
2x+2y+1
e) [(2x+2y+ I)dxdydz
00
EDIA

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