Floating-point scalars

1 Ansicht (letzte 30 Tage)
jack carter
jack carter am 26 Aug. 2017
Bearbeitet: John D'Errico am 26 Aug. 2017
I need to integrate the following with the given limits,
Lf=12;E=22000;rou=1.2;d=0.039;L=2;v=0:0.01:L;phi=0:0.01:pi/2;
s=v/(Lf/2);
z0=1-sqrt([(E/rou)*(d/L)*(s)]);
max_zlimit=z0.*cos(phi);
fun1=@(z) z*1/Lf;
Q1=integral(fun1,0,max_zlimit);
Can someone please tell me how it can be done?
  1 Kommentar
jack carter
jack carter am 26 Aug. 2017
Bearbeitet: jack carter am 26 Aug. 2017
even if i take
max_zlimit=z0;
i still cant go through the integration

Melden Sie sich an, um zu kommentieren.

Melden Sie sich an, um diese Frage zu beantworten.

Antworten (2)

Star Strider
Star Strider am 26 Aug. 2017
I am not certain what you want to do, so I’m taking my best guess at it.
This runs:
Lf=12;
E=22000;
rou=1.2;
d=0.039;
L=2;
N = 50;
v= linspace(0,Lf,N);
phi= linspace(0,pi/2,N);
s=v/(Lf/2);
z0=1-sqrt((E/rou)*(d/L)*s);
max_zlimit=z0.*cos(phi);
fun1=@(z) z*1/Lf;
Q1 = arrayfun(@(z)integral(@(z)fun1(z),0,z), max_zlimit);
The arrayfun function substitutes the values in ‘max_zlimit’ in your integral call, and returns the vector of results.
I defer to you to determine if it gives the output you want.
John D'Errico
John D'Errico am 26 Aug. 2017
Bearbeitet: John D'Errico am 26 Aug. 2017
Um, lets be serious. You are trying to integrate the "function" z/Lf, over simple limits. Lf is 12. With limits of 0 and max_zlimit, the integral is trivial.
Q1 = max_zlimit.^2/24
Your problem is that what you want to do is not clear. Since v and phi have different lengths as a vector, I'll guess that what you want is all combinations of those two vectors as the upper limit.
Lf=12;E=22000;rou=1.2;d=0.039;L=2;v=0:0.01:L;phi=0:0.01:pi/2;
s=v/(Lf/2);
z0=1-sqrt([(E/rou)*(d/L)*(s)]);
We can get the array (thus all combinations of the two vectors) using a simple outer product.
max_zlimit=(z0.')*cos(phi);
So now the integral is trivial. We need never bother using a numerical integration scheme like integral.
Q1 = max_zlimit.^2/24;
So Q1 is an array, the desired integral for all combinations of the two vectors.
size(Q1)
ans =
201 158
By the way, integral is not designed to handle vector or array limits of integration anyway.

Kategorien

Mehr zu Logical finden Sie in Help Center und File Exchange

Tags

Produkte

Community Treasure Hunt

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

Start Hunting!

Translated by