How to Solve equation using Eulers method in Matlab?

9 views (last 30 days)
Question is as follows:-
Solve the following initial value problem over the interval from t = 0 to 1 where y(0) = 1.
dy/dt = yt^2 - 1.1y
• (a) analytically (showing the intermediate steps in the comments),
• (b) using the explicit Euler’s method with h = 0:5,
• (c) using the explicit Euler’s method with h = 0:25
Note: The Symbolic Math Toolbox should NOT be used.
Below is my code . I wanted to know my mistake if any.
%for h=0.5
h=0.5;
t=0:h:1;
y=zeros(size(t));
y(1)=1;
n=numel(y);
for i = 1:n-1
dydt= (y(i)*t(i).^2)-(1.1*y(i))
y(i+1) = y(i)+(dydt*h)
disp(y(i));
end
dydt = -1.1000
y = 1×3
1.0000 0.4500 0
1
dydt = -0.3825
y = 1×3
1.0000 0.4500 0.2587
0.4500
%for h=0.25
h1=0.25;
t1=0:h1:1;
y1=zeros(size(t1));
y1(1)=1;
n1=numel(y1)
n1 = 5
for i = 1:n1-1
dydt1= (y1(i)*t1(i).^2)-(1.1*y1(i))
y1(i+1)=y1(i)+(dydt1*h1)
disp(y1(i));
end
dydt1 = -1.1000
y1 = 1×5
1.0000 0.7250 0 0 0
1
dydt1 = -0.7522
y1 = 1×5
1.0000 0.7250 0.5370 0 0
0.7250
dydt1 = -0.4564
y1 = 1×5
1.0000 0.7250 0.5370 0.4229 0
0.5370
dydt1 = -0.2273
y1 = 1×5
1.0000 0.7250 0.5370 0.4229 0.3660
0.4229
Display in a plot
• the analytical result (a) as a black solid line, and
• the numerical results (b - c) as solid lines with point markers in different color
• with the corresponding labels of the axes and legend.
% analytical sol(plz check for this too)
T=[0 1]
T = 1×2
0 1
Y=[1 -0.766]
Y = 1×2
1.0000 -0.7660
% Graph
plot(t,y,'r',"DisplayName","h=0.5");
hold on
plot(t1,y1,'b',"DisplayName","h=0.25");
plot(T,Y,'k',"DisplayName","Anlaytical sol");
legend
grid on;

Accepted Answer

Alan Stevens
Alan Stevens on 14 Nov 2021
Here's part (a) for you - definitely not a straight line!

More Answers (0)

Categories

Find more on Symbolic Math Toolbox in Help Center and File Exchange

Products


Release

R2021b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!