Find the upward flux of F vector=<x,y,z> across: a. x^2+y^2+z^2=1, z0 and b. z=1-x^2-y^2, z0. Please be detail thanks. We were unable to transcribe this imageWe were unable to transcribe this imageZ S FIND THE UPWARD FLUX OF SX,Y,Z) ACROSS: a. pol + y2 + z = 1, z>0 AND b. ž= 1-x2-, z>O
Find the upward flux of F vector=<x,y,z> across: a. x^2+y^2+z^2=1, z0 and b. z=1-x^2-y^2, z0. Please be detail thanks. We were unable to transcribe this imageWe were unable to transcribe this imageZ S FIND THE UPWARD FLUX OF SX,Y,Z) ACROSS: a. pol + y2 + z = 1, z>0 AND b. ž= 1-x2-, z>O
find the upward flux of F=<x,y,z> across a.x^2+y^2+z^2=1,z greater equal to 0. and b.z=1-x^2-y^2, z greater equal to 0
l.a. FIND F SUCH THAT F=F F F = {zxy-, X+22, 24–2x22 b. FIND THE WORK DONE UNDER IN MOVING A BODY FROM (-3,-2-0 TO (1,2,3) 2. FIND THE UPWARD FLUX OF = $*,Y,Z) ACROSS: A. x+y+z=,=20 AND b. z=1-xe-yz, z>0
(8) The Divergence Theorem for Flux in Space F(x, y, z) =< P, Q, R >=< xz, yz, 222 > S: Bounded by z = 4 – x² - y2 and z = 0 Flux =S} F înds S (8a) Find the Flux of the vector field F through this closed surface. (8) The Divergence Theorem for Flux in Space F(x,y,z) =< P,Q,R >=< xz, yz, 222 > S: Bounded by z = 4 – x2 - y2 and z...
Find the upward flux of F=−yi+xj+12kF=−yi+xj+12k across the part of the spherical surface GG determined by z=f(x,y)=12−x2−y2‾‾‾‾‾‾‾‾‾‾‾‾√,0≤x2+y2≤5 Find the upward flux of F =-yi + xj + 12k across the part of the spherical surface G determined by 30 pi Find the upward flux of F =-yi + xj + 12k across the part of the spherical surface G determined by 30 pi
6. Find the flux of F(x, y, z) (ax, by, cz) a > 0, b > 0, c> 0, through the surface S, where S is the part of the cone z = Vax)2 + (by)2 that lies between the planes z = 0 and z = 2, oriented upwards. [10]
(1 point) Find the flux through through the boundary of the rectangle 0 < x < 4,0 < y < 4 for fluid flowing along the vector field (x3 + 4, y cos(5x)). Flux =
F(x,y,z) =< P, Q, R >=< xz, yz, 2z2 > S: Bounded by z = 1 – x2 - y2 and z = 0) Flux =SS F ñds S (8a) Find the Flux of the vector field F through this closed surface.
13. Evaluate Is F.dš that is, find the flux of the field across the surface. F(x,y,z)=-4z ī + y) – 3x K , S is the hemisphere z = 14 – x2 - y2; ñ points upward.