Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I am searching for a way to get rid of the following loop (over theta):

for i=1:1:length(theta)

  V2_ = kV2*cos(theta(i)); 
  X = X0+V2_;
  Y = Y0-V2_*(k1-k2);
  Z = sqrt(X.^2-Z0-4*V2_.*(k.^2*D1+k1));



where X0,Y0,Z0 and kV2 are dependent on the vector k (same size). t, D1, k1 and k2 are numbers. Since I have to go through this loop several times, how can I speed it up? Thanks

share|improve this question
What are the dimensions of the other variables? – Nitish Mar 3 '14 at 23:07
right!..i will edit the OP – JFNJr Mar 3 '14 at 23:10
so only pktheta changes in the loop, everything else remains constant, right? If yes, then it seems easy. – Parag S. Chandakkar Mar 4 '14 at 0:39

Try this -

N = numel(theta);

V2_ = kV2*cos(theta(1:N));
X0 = repmat(X0,[1 N]);
Y0 = repmat(Y0,[1 N]);
Z0 = repmat(Z0,[1 N]);

X = X0 + V2_;
Y = Y0-V2_*(k1-k2);
Z = sqrt(X.^2-Z0-4.*V2_ .* repmat(((1:N).^2)*D1 + k1.*ones(1,N),[size(X0,1) 1]));
pktheta = exp(-t/2*V2_).*(cosh(t/2*Z) + Y./((k1+k2)*Z).*sinh(t/2*Z));

Definitely BSXFUN must be faster, if someone could post with it.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.