Using ODE45 to solve 2 dependent variable : dQ (solar radiation at specific time of the day(hour)) and dT/dt (temperature change of a particle ) of a particle during solar drying

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Evans123
Evans123 on 5 Nov 2018
Commented: Torsten on 8 Nov 2018
Hi,
I am trying to use differential equation to solve how temperature changes with respect to time however the temperature is dependent on the solar radiation per unit area Q
so the formula for Q is given as:
Time2=(1:t:12); %hours
Q=960*(sin(2*pi*Time2/24)).^2; %W/m2
The equation for the temperature change is :
dT/dt = ((Q*A)-(mw*lw))/(m*cp));
where
T0 = 373.15; %Initial temperature in Kelvin
mw = 0.706;
m = 15; % Mass of product to dry (Kg)
lw = 2260000; % Latent heat of vaporisation of water (J/Kg)
A = 1; % Surface Area of Collector (m^2)
cp= 3746; % Specific heat capacity of product (J/Kg/K)
so at every time step (which is in hours ), I want the equation dT/dt to use the value of Q at that time to solve dT/dt
I tried this
deltaT =@(t,T)((Q*A)-(mw*lw))/(m*cp);
[t,T] = ode45('deltaT',tspan,T0);
where
tspan = [1 12] %hours
however I am getting so many errors
Any help will be appreciated, I am fairly new to MATLAB

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Answers (1)

Torsten
Torsten on 5 Nov 2018
function main
T0 = 373.15; %Initial temperature in Kelvin
tspan = [1 12]; %hours
dt = 0.1;
Time2 = (1:dt:12); %hours
Q = 960*(sin(2*pi*Time2/24)).^2; %W/m2
[t,T] = ode45(@(t,T)deltaT(t,T,Time2,Q),tspan,T0);
plot(t,T)
end
function dT = deltaT(t,T,Time2,Q)
Q_actual = interp1(Time2,Q,t);
mw = 0.706;
m = 15; % Mass of product to dry (Kg)
lw = 2260000; % Latent heat of vaporisation of water (J/Kg)
A = 1; % Surface Area of Collector (m^2)
cp= 3746; % Specific heat capacity of product (J/Kg/K)
dT = ((Q_actual*A)-(mw*lw))/(m*cp);
end
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Evans123
Evans123 on 5 Nov 2018
Hi Torsten,
This might be a long shot but I will really appreciate your help.
I'm currently working on a project to build a solar food dryer and I need to model on Matlab how temperature of the product will change with respect to change in solar radiation, Q .
Q is given by ;
Q =960*(sin(2*pi*Time2/24)).^2; %W/m2
where
Time2=(1:t:12); %hours
The heat flow equation is given by
Q(t)A = mcp*(T2-T1) + (mw*lw)
where :
mw = 0.706; % Mass of water loss from product in hr (Kg/h)
m = 15; % Mass of product to dry (Kg)
lw = 2260000; % Latent heat of vaporisation of water (J/Kg)
A = 1; % Surface Area of collector (m^2)
cp= 3746; % Specific heat capacity of product (J/Kg/C)
T1 = temperature at t
T2 = temperature at t + dt
Manipulating the heat flow give T2 as ;
T2= (((Q*A*3600) -(mw*lw))/(m*cp)) + T1;
% 3600 is there to convert j/s to J/h
however implementing this on Matlab is proving a challenge for me that's why i went the ode45 route but that was clearly the wrong way to go about it.
This is what I have so far ;
close all
clear;
mw = 0.706; % Mass of water loss from product in hr (Kg/h)
m = 15; % Mass of product to dry (Kg)
lw = 2260000; % Latent heat of vaporisation of water (J/Kg)
A = 1; % Surface Area of Collector (m^2)
cp= 3746; % Specific heat capacity of product (J/Kg/C)
t = 1; % Time step
T = 24; % Initial Temperature (°C)
Time2=(1:t:12); hours
Q=960*(sin(2*pi*Time2/24)).^2; % Solar irradiation (W/m2)
for j = 1:12
T(j+1)= ((((QQ2(j)*A*j*3600))-(mw*lw))/(m*cp))+ T(1);
end
figure(2)
plot(T)
title('Temperature')
xlabel('time (hours)')
ylabel('Temperature (°C)')
This seems wrong since the mass, m should decrease by mw after each hr and the temperature profile should follow the profile of the solar radiation. i.e peak at the same time
I have been spending days to get my head around this but i'm pretty bad at Matlab so I haven't made any meaningful progress. I would be grateful for your help.
Torsten
Torsten on 8 Nov 2018
Your equation reads (with the values you gave inserted):
(15*3746 + m_Water(t)*cp_Water)*dT/dt = -0.706/3600*2260000 + 960*sin^2(2*pi*t/(24*3600))*A(t)
with t in seconds.
Solving this will give you more realistic temperature profiles.
So the error was primary related to the unit conversion.
Nevertheless, you should take into account the time-dependent mass of water you have to heat up in the m_Water(t)*cp_Water - term and the decreasing surface area over time in the A(t)-term.
Best wishes
Torsten.

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