How to do symbolic integration
Afficher commentaires plus anciens
%% I am unable to get the result. Thank you so much in advance
clc;
clear;
syms omega x n m
% assuming omega::real,omega>0,m::integer,m>0,n::integer,n>0;
fun=int(cos(atan(1,x))^m*sin(omega*x)/(1+x^2)^((n)/2+1),x,0,Inf);
Réponses (2)
It apparently does not have a symbolic solution (this is not uncommon).
It does have a piecewise closed-form solution, at least over some regions, and one option would be to numerically integrate it (although that could have problems as well) —
syms omega x n m real
sympref('AbbreviateOutput',false);
assume(m,'integer')
assumeAlso(m,'positive')
assume(n,'integer')
assumeAlso(n,'positive')
assume(omega,'positive')
% assuming omega::real,omega>0,m::integer,m>0,n::integer,n>0;
integrand = cos(atan(1,x))^m*sin(omega*x)/(1+x^2)^((n)/2+1)
integrand = simplify(integrand, 500)
fun=int(integrand,x,0,Inf)
nfun = matlabFunction(integrand) % Anonymous Function Argument To 'integral'
This likely as good as it gets.
.
Try substituing the values of m and n.
syms omega positive real
% syms n m positive integer
syms x
% assuming omega::real,omega>0,m::integer,m>0,n::integer,n>0;
m = 5 ; n = 4 ;
fun=int(cos(atan(1,x))^m*sin(omega*x)/(1+x^2)^((n)/2+1),x,0,Inf)
1 commentaire
gourav pandey
le 23 Déc 2021
Catégories
En savoir plus sur Calculus dans Centre d'aide et File Exchange
le 23 Déc 2021
le 24 Déc 2021
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
