Question

Covert 1 = 83 84-** S*-**-»* dz dydx to an equivalent integral in cylindrical coordinates. Let be the region bounded below by the cone z = and above by the sphere x2 + y2 + (z - 1)2 = 1. |3x² + 3y² Set up (Do not evaluate) the triple integral in spherical coordinates to find the volume of D.

Answer 1

we rec here, have in tangular co-ordinates ie, f(x, y, z). We have to convert it into scylindrical co-ordinates i.e, (6,0,2) where, X = 8COSO Y - rsino limits will be, for 2 to 6 - x²_y2 N here, to 6-8²oso-o²sinto 2 • caso + sinto = 6 z [ 2,6-73) => [°C ye vant to for 4 - x? 14 4 - 8²cos²g - y<ſu.x² ->y?+x?17 to here =) 8²=4 ie, 810, 14- xcosło] o(0, 2) hele for ☺ 0 to 2T be will .. it 2 TT 오 6-8? o dz do do 2

Here, it ۱۱ be like. sphere, x² +4²+(2-1)²-, cone, z = √3x²+342 For the sphere, x²+42+ (2-1)= 1 >> x+y?+ z+1-22=1 =) X? +42 2² e²= 2 ecos y + 2 Z e = 2COS Y for the cone, 13(x++y2) 3 (e’sins fos* $ + sin? ¢ 01) ecosy = esiny -) cosa √3 siny T/6 will be, a volume 2T T/ 2 cos y s e sing de dy do oso 6=0 e=0

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