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Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and...
Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and...
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,...
Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and...
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 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, y),...
Steady, 2-D conduction takes place in a rectangular solid having height (in the y-direction), H, and...
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 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, y),...
ENGR 135 Numerical conduction project, Part 1: 2D steady state conduction A tube with length of...
ENGR 135 Numerical conduction project, Part 1: 2D steady state conduction A tube with length of 1 m is made from steel (k-15 W/m/K) having a square cross section with a circular hole through the center, as shown below. Calculate the steady state temperature distribution across the cross section and the total rate of heat transfer if the inner surface is held at 20 °C, and the outer surface is held at 100 °C. How does the heat rate vary...
3. (20 points) Denote u(ar, y) the steady-state temperature in a rectangle area 0 z 10,...
3. (20 points) Denote u(ar, y) the steady-state temperature in a rectangle area 0 z 10, 0yS 1. Find the temperature in the rectangle if the temperature on the up side is kept at 0°, the lower side at 10° while the temperature on the left side is S0)= sin(y) and the right side is insulated. Answer the following questions. (a) (10 points) Write the Dirichlet problem including the Laplace's equation in two dimensions and the boundary conditions. (b) (10...
this is a laplace equation in cylinder coordinates: ) 1. (10 points) A solid cylinder of radius a and height h has...
this is a laplace equation in cylinder coordinates: )
1. (10 points) A solid cylinder of radius a and height h has its curved surface held at 0 °C and its top and base held at a temperature To. Find the steady-state temperature distribution in the cylinder. For your convenience, the PDE and the boundary conditions are given below: lu
1. (10 points) A solid cylinder of radius a and height h has its curved surface held at 0 °C...
Project: 2D, S/S Heat Conduction in a Rectangle with Heat Generation Write a code in MATLAB that ...
Project: 2D, S/S Heat Conduction in a Rectangle with Heat Generation Write a code in MATLAB that can calculate the temperature inside a thin, rectangular, metal plate, T(x, y) at some selected points as shown in the figure. The temperatures at the boundaries are constant and there is heat generation inside the plate. The problem is steady- state and k = 100 W/(m·K) with L = 1m and H = 0.5 m. The equation to be solved is, 50 °C...
10. (21 pts]Find the steady-state temperature distribution in a solid cylinder with radius R and height...
10. (21 pts]Find the steady-state temperature distribution in a solid cylinder with radius R and height H, if the boundary temperatures are set as 0 on the bottom surface, ugra/R? on the top surface and Uz/H on the curved surface 1 [4 pts) Write the governing equation and boundary conditions 2) [17 pts]Solve the problem
Problem 2(30 points) Consider the steady-state temperature distribution in a square plate with dimensions 2 m...
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...
Consider the steady temperature T (2,y) in a rectangular plate that occupies 0 <<< 9 and...
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...
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,...
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 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, y),...
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 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, y),...
ENGR 135 Numerical conduction project, Part 1: 2D steady state conduction A tube with length of 1 m is made from steel (k-15 W/m/K) having a square cross section with a circular hole through the center, as shown below. Calculate the steady state temperature distribution across the cross section and the total rate of heat transfer if the inner surface is held at 20 °C, and the outer surface is held at 100 °C. How does the heat rate vary...
3. (20 points) Denote u(ar, y) the steady-state temperature in a rectangle area 0 z 10, 0yS 1. Find the temperature in the rectangle if the temperature on the up side is kept at 0°, the lower side at 10° while the temperature on the left side is S0)= sin(y) and the right side is insulated. Answer the following questions. (a) (10 points) Write the Dirichlet problem including the Laplace's equation in two dimensions and the boundary conditions. (b) (10...
this is a laplace equation in cylinder coordinates: )
1. (10 points) A solid cylinder of radius a and height h has its curved surface held at 0 °C and its top and base held at a temperature To. Find the steady-state temperature distribution in the cylinder. For your convenience, the PDE and the boundary conditions are given below: lu
1. (10 points) A solid cylinder of radius a and height h has its curved surface held at 0 °C...
Project: 2D, S/S Heat Conduction in a Rectangle with Heat Generation Write a code in MATLAB that can calculate the temperature inside a thin, rectangular, metal plate, T(x, y) at some selected points as shown in the figure. The temperatures at the boundaries are constant and there is heat generation inside the plate. The problem is steady- state and k = 100 W/(m·K) with L = 1m and H = 0.5 m. The equation to be solved is, 50 °C...
10. (21 pts]Find the steady-state temperature distribution in a solid cylinder with radius R and height H, if the boundary temperatures are set as 0 on the bottom surface, ugra/R? on the top surface and Uz/H on the curved surface 1 [4 pts) Write the governing equation and boundary conditions 2) [17 pts]Solve the problem
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...
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...
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