9. Find the steady-state temperature distribution in the plate shown below y= x и —D ()...
Problem 2(30 points) Consider the steady-state temperature distribution in a square plate with dimensions 2 m x 2 m. There is a heat generation of ġ(x.y)=6x [W/my], and the thermal conductivity of k=1[W/(m-°C)]. The temperature on the top boundary is given by a piecewise function, f(x), which is defined below. x(4- x²)+10 0<x<1 | x(4- x?) + 20, 1<x<2 The bottom boundary is insulated. The temperatures on left-handed and right-handed boundary are maintained at constants 10[°C] and 20 [°C] as...
3. (7 points) Let u(x, y) be the steady-state temperature u(r, y) in a rectangular plate whose vertical r0 and 2 are insulated. When no heat escapes, we have to solve the following the boundary value problem: a(z,0) = 0, u(z,2) = x, 0 < x < 2 (a) By setting u(x, g) -X(x)Y(u), separate the equation into two ODE 0 What ane the sewr homdany condiome hoald Xe) watiy (37)2. (c) Find x(r) for the case when λ-0 and...
4. Find the explicit steady-state temperature distribution in a flat square plate having sides of unit length if the temperature on the left side is 3ey, while the other sides are kept at zero temperature 4. Find the explicit steady-state temperature distribution in a flat square plate having sides of unit length if the temperature on the left side is 3ey, while the other sides are kept at zero temperature
Find the temperature distribution at equilibrium in a rectangular plate (0 ≤ x ≤ L, 0 ≤ y ≤ H) when the side at x = 0 is subject to the prescribed temperature f(y) = 1 + y, and the sides at x = L, y = 0 and y = H are insulated, by using the method of separation of variables.
2. Find the steady-state temperature u(r,0) in a semicircular plate of radius r 2 if [10<0< π/2 u(2,0) and the edges 0 = 0 and 0 = T are insulated. 0 /20 T пл sin 2 1 2 + cos(n0) Ans: u(r,0) п
Consider the steady temperature T (2,y) in a rectangular plate that occupies 0 <<< 9 and 0 <y<5, which is heated at constant temperature 150 at 9 and 0 along its other three sides. (a) For separation solutions T(1,y) = F(x)G(y), you are given that admissible F(1) are the eigenfunctions Fn (1) = sinh(An I) for n=1,2,... and G(y) are the eigenfunctions Gn(y) = sin(Any) for n=1,2,... A for In = (b) The solution is the superposition T(z,y) = an...
Find the steady-state temperature u(r.0) in a circular plate of radius r = 1 if the temperature on the circumference is as given (show all work!): 0 0 T 1) u(1,0) = 0, T<02T Find the steady-state temperature u(r.0) in a circular plate of radius r = 1 if the temperature on the circumference is as given (show all work!): 0 0 T 1) u(1,0) = 0, T
the previous problem set was this one, its the solution to the steady state temperature distribution on the left of problem 2 2. In the last problem set you found the steady-state temperature distribution for the situation on the left. What is the steady state temperature distribution for the situation on right? Hint: make use of your previous solution. 100°C 120°C Extra credit: Make a plot of the temperature distribution 100°C 120°c T 100°C 2. Find the steady-state temperature distribution...
Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and width (in the X-direction), W. The bottom of the rectangle, from x=0 to x-W, is insulated. The left boundary x-0, 0 y s H, is held at a temperature of 500 K, as is the top boundary, y=H, 0 s x sW. The right boundary, x=W and 0 Sys H, has a steady temperature distribution given by Ty,x W) 500 (1-sin(ny/H) Find the temperature...
Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and width (in the X-direction), W. The bottom of the rectangle, from x-0 to x=W, is insulated. The left boundary, x0, 0 s ys H, is held at a temperature of 500 K, as is the top boundary, y=H, 0 sxs W. The right boundary, x=W and0 Sys H, has a steady temperature distribution given by TOy,x W) 500 (1-sin(ny/H) Find the temperature distribution, T(x,...