- #1
stunner5000pt
- 1,461
- 2
Triple Integral setup...
[tex] \int \int \int_{G} 6x (z+y^3) dx dy dz [/tex] G bounded by [tex] x = 0, \ x = y, \ z = y-y^2, \mbox{and} \ z=y^2 - y^3 [/tex]
x from 0 to1
y from 0 to x
z from z=y-y^2 to y^2 - y^3
and the integration order becomes dz dy dx
would this give the right answer?
what aboiut this one
[tex] \int \int \int_{G} xy + xz dx dy dz [/tex]
G bounded by z = x, z=2-x, z = y^2
z goes from 2-y^2 to y^2
y goes from 2-x to x
x goes from 0 to 2
and the integration order to dz dy dx
I think the second one is wrong. Please do help!
[tex] \int \int \int_{G} 6x (z+y^3) dx dy dz [/tex] G bounded by [tex] x = 0, \ x = y, \ z = y-y^2, \mbox{and} \ z=y^2 - y^3 [/tex]
x from 0 to1
y from 0 to x
z from z=y-y^2 to y^2 - y^3
and the integration order becomes dz dy dx
would this give the right answer?
what aboiut this one
[tex] \int \int \int_{G} xy + xz dx dy dz [/tex]
G bounded by z = x, z=2-x, z = y^2
z goes from 2-y^2 to y^2
y goes from 2-x to x
x goes from 0 to 2
and the integration order to dz dy dx
I think the second one is wrong. Please do help!