use of ode45 for projectile trajectory including drag
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equation of motion
dvx/dt = -k*v*vx
dvy/dt = -k*v*vy - g
where k = drag coefficient
v = sqrt((vx)^2 + (vy)^2)
after changing it into space variable it becomes
dvx/dx = -k*v,
dvy/dx = (-k*v*vy - g)/vx,
dt/dx = 1/vx,
dy/dx = vy/vx,
form these equation i have to find for fixed range :- time taken ,vx,vy,y-displacement at particular x-displacement using odesolver if i use ode45 it gives error because of only two variable in right side of each equation (vx and vy). how wil i solve this equation using ode45 or any other ode solver
please reply soon
thanks
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Grzegorz Knor
2011-9-5
To solve this system, create a function ode_func containing the equations:
function dy = ode_func(x,y)
k = 1;
g = 9.8;
v = sqrt(y(1)^2+y(2)^2);
dy = zeros(4,1);
dy(1) = -k*v;
dy(2) = (-k*v*y(2)-g)/y(1);
dy(3) = 1/y(1);
dy(4) = y(2)/y(1);
And solve with ode45:
[X,Y] = ode45(@ode_func,...
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