(1 point) If the flux of molecules diffusing through an area of 1 μ㎡ on a...
The flow rate (volume flux) through a pipe that varies in cross-sectional area is constant; that is equivalent to stating that the product of the cross-sectional area A and the speed v at any point is a constant. This result is expressed in ___________. a)specific gravity b)buoyant force c)Bernoulli’s equation d)the equation of continuity
(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 =
(1 point) Compute the flux of the vector field F 3z2y2 zk through the surface S which is the cone vz2 y2 z, with 0z R, oriented downward. (a) Parameterize the cone using cylindrical coordinates (write 0 as theta). (r,)cos(theta) (r, e)rsin(theta) witho KTR and 0 (b) With this parameterization, what is dA? dA = | <0,0,(m5/2)sin^2(theta» (c) Find the flux of F through S flux
6.2-10. Diffusion in a Nonuniform Cross-Sectional Area. The gas ammonia (A) is diffusing at steady state through N2 (B) by equimolar counterdiffusion in a conduit 1.22 m long at 25°C and a total pressure of 101.32 kPa abs. The partial pressure of ammonia at the left end is 25.33 kPa and at the other end 5.066 kPa. The cross section of the con duit is in the shape of an equilateral triangle, the length of each side of the triangle...
please help me through these questions for a area of a rectangle In this problem, we'll walk through the steps to find the area of the rectangle bounded by: The line f(x) = 3z + 8 The line g(x) parallel to f(x) passing through the point(0,3) The line h(z) perpendicular to f(z) passing through (26,0) The line j(x) perpendicular to f(x) passing through (0,8) bility a) Find the equation for the line g(x) 9(z) = Preview b) Find the equation...
can somebody please answer this, thanks Nan 1. Rank the flux through the area shown from smallest to largest. Constant E . Eyand E,are 0 PSx 2A 30° 30°
Seawater of salinity 35,000 ppm at 35oC enters a membrane module of area 1 m2 at a flow rate of 36,000 m3/d. 75% of the flow rate of the seawater feed is retained in the brine reject. If the salt rejection is 99%, calculate: a) Permeatesalinity b) Brine salinity c) Salt passage d) Recoveryratio e) Osmoticpressureoffeedseawater f) Salt flux through membrane -6 3 2 Salt permeability = 2.03x10 m /m .s Assume density of seawater is 1000 g/L
1 of 15 When a field is parallel to a plane of area, the magnetic flux through the coil is A zero. B infinite. C 2. D 5. Question 2 of 15 A moving charge experiences magnetic forces because of a A magnetic flux. B magnetic field. C magnetic current. D both a and b. Question 3 of 15 Total number of magnetic field lines passing through an area is called A magnetic flux density. B magnetic flux. C emf....
Question 10 Not yet answered Marked out of 3.00 P Flag question A vector of magnitude 4 in the direction opposite to the direction of u = 2i – 4j + 3k is- Select one: A. None of these answers B. şi – ji + k C. -i + $j - gk D. ķi – j + ž k E. –ji + ſj – ž k
Item 2 Review Part A What is the electric flux through surface A in the figure(Figure 1)? Give the answer as a multiple of Submit Part B Figure 1 of 1 What is the electric flux through surface B in the figure? Give the answer as a multiple of E0 Submit Request Ans 3q Part C What is the electric flux through surface C in the figure? Give the answer as a multiple of Submit Request Answer ▼ Part D...