The rate of flow outward through the hemisphere x² + y² + z² = 9, z >= 0 is zero.
Given that,
Seawater has a density of 1025 kg/m³ and moves at a constant velocity field defined by the equations v = yi + xj, where x, y, and z are measured in meters and the components of V are expressed in meters per second.
We have to find the rate of flow outward through the hemisphere x² + y² + z² = 9, z >= 0.
We know that,
v= yi + xj, and density = 1025 kg/m³
F=1025(yi + xj)
After solving the R(u,v) we get zero.
Therefore, the rate of flow outward through the hemisphere x² + y² + z² = 9, z >= 0 is zero.
To learn more about hemisphere visit: brainly.com/question/28770672
#SPJ4
Answer:
yes ofc whats the question?
Step-by-step explanation:
232.5 (Triangle)
+320. (Rectangle)
=------------
342.5 (area)
<span>A. 3(4x - 4) - 7x = 12x - 12 - 7x = 5x - 12 yes
B. -3(4x - 4) - 7x = -12x + 12 - 7x = -19x + 12 no
C. 3(-4x + 4) - 7x = -12x + 12 - 7x = -19x + 12 no
D. -3(-4x - 4) - 7x = 12x + 12 - 7x = 5x + 12 no
Answer is A.</span>
