How to apply velocity + acceleration to a position?

2 Ansichten (letzte 30 Tage)
Steven
Steven am 26 Nov. 2014
Bearbeitet: Steven am 27 Nov. 2014
Thank you all.

Akzeptierte Antwort

Youssef  Khmou
Youssef Khmou am 27 Nov. 2014
Bearbeitet: Youssef Khmou am 27 Nov. 2014
@Roger gave the solution (Vx,Vy) . try to write a feedback of this solution.
t=0:100e-3:20;
V0x=1000;
Alpha=0.0004;
Beta=0.25;
Vx=1./(Alpha*t+(1/V0x));
Vy=(10/Beta)*(exp(-Beta*t)-1);
x0=10;
y0=15;
x=x0+(1/Alpha)*(log(V0x*Alpha*t+1));
y=(10/Beta)*(-(exp(-Beta*t)/Beta)-t)+y0+(10/Beta^2);
figure; plot(x,y)
title(' Particle Trajectory')
xlabel('x');
ylabel('y');

Weitere Antworten (2)

Roger Stafford
Roger Stafford am 26 Nov. 2014
You can approach this problem two ways. One is symbolic and other is numeric. As you are probably aware, you have two entirely independent differential equations here which simplifies things both for the numeric and symbolic methods.
For the symbolic approach you can either use matlab's 'dsolve' function to obtain analytic expressions for x and y versus time t, or you can use your calculus to solve these differential equations by hand. The latter is simple to do. For example, your equation
dvx/dt = -0.0004*vx ^2
can be expressed as
=1/vx^2*dvx = 0.0004*dt
and both sides can easily be integrated.
For the numeric approach you can set up these differential equations to be solved using one of the 'ode' functions. Read about them at:
http://www.mathworks.com/help/matlab/math/ordinary-differential-equations.html

Youssef  Khmou
Youssef Khmou am 26 Nov. 2014
You can verify this primary solution theoretically :
t=0:100e-3:20;
V0x=1000;
Alpha=0.0004;
Beta=0.25;
Vx=1./(Alpha*t-V0x);
Vy=exp(-Beta*t)+10/Beta;
If it is correct, you can integrate for second time to get (x,y)
  5 Kommentare
Steven
Steven am 26 Nov. 2014
Bearbeitet: Steven am 27 Nov. 2014
Thank you for your help this far. I greatly appreciate it. I'm wondering if my values are the same as yours regarding integrals:
Vxi = 2500*log*(0.0004t-1000),
and
Vyi = -40*t-160 * e^(-0.25t)
When I plot Vxi, the integral of Vx it doesn't seem to start at t=0, is there any reason for this? Vyi seems fine, as it starts the graph at t=0. Is there any way I can make the plot of Vxi start at t=0?
Roger Stafford
Roger Stafford am 27 Nov. 2014
I assume that the symbol 'Vxi' means the same as 'x'. If so, I don't quite agree with your result.
What we have already obtained is the equation
vx = dx/dt = 1/(0.0004*t+0.001)
as the result of the first integration. To find x as a function of t, we need to integrate the expression on the right hand side. Its integral is:
x = 1/0.0004*log(0.0004*t+0.001) + C
where C is the appropriate constant of integration. If you want x to be zero when t is zero, then C must be -1/0.0004*log(0.001), which then gives the final answer of:
x = 1/0.0004*log(0.0004*t+0.001) - 1/0.0004*log(0.001)
= 1/0.0004*(log(0.0004*t+0.001)-log(0.001))
= 1/0.0004*log((0.0004*t+0.001)/0.001)
= 2500*log(0.4*t+1)
Your expression for 'y' ('Vyi') looks basically correct except that it is equal to -160 when t is zero. It needs to have a constant of integration of 160 added if you want it to be zero when t is zero.

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