I want to find a function f(xi) that suffices the following equation:
(vi-xi)f(xi)'=f(xi)
when xi = k*vi, where vi is a constant and xi is the variable.
Anyone know howto describe this problem in mathematica or matlab? Great Thanks!
Mathematica
eq = (vi - xi) D[f[xi], xi] == f[xi];
DSolve[eq, f[xi], xi]
(* {{f[xi] -> C[1]/(vi - xi)}} *)
Matlab
syms vi xi f(xi)
dsolve( (vi -xi)*diff(f)==f)
ans =
C2/(vi - xi)
Maple
restart;
dsolve((vi - xi)*diff(f(xi),xi)=f(xi),f(xi));
(* f(xi) = _C1/(vi-xi) *)
i
inxi
andvi
be an index? If so, how many differenti
are there, and do you knowvi
for each of them? What isk
? Does the prime denote derivative? Isf(x)=0
an acceptable solution? Before describing the problem in mathematica or matlab, first try to describe it more clearly to your fellow humans.