I normalize a vector V in MATLAB as following:
normalized_V = V/norm(V);
however, is it the most elegant (efficient) way to normalize a vector in MATLAB?
I normalize a vector V in MATLAB as following:
however, is it the most elegant (efficient) way to normalize a vector in MATLAB? 

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The original code you suggest is the best way. Matlab is extremely good at vectorized operations such as this, at least for large vectors. The builtin norm function is very fast. Here are some timing results:
V1 is calculated a second time here just to make sure there are no important cache penalties on the first call. Timing information here was produced with R2008a x64 on Windows. EDIT: Revised answer based on gnovice's suggestions (see comments). Matrix math (barely) wins:
IMHO, the difference between "norm(V)" and "sqrt(V'V)" is small enough that for most programs, it's best to go with the one that's more clear. To me, "norm(V)" is clearer and easier to read, but "sqrt(V'V)" is still idiomatic in Matlab. 


I don't know any MATLAB and I've never used it, but it seems to me you are dividing. Why? Something like this will be much faster:



The only problem you would run into is if the norm of V is zero (or very close to it). This could give you Inf or NaN when you divide, along with a dividebyzero warning. If you don't care about getting an Inf or NaN, you can just turn the warning on and off using WARNING:
If you don't want any Inf or NaN values, you have to check the size of the norm first:
If I need it in a program, I usually put the above code in my own function, usually called unit (since it basically turns a vector into a unit vector pointing in the same direction). 


I took Mr. Fooz's code and also added Arlen's solution too and here are the timings that I've gotten for Octave:
Then, because of something I'm currently looking at, I tested out this code for ensuring that each row sums to 1:



By the rational of making everything multiplication I add the entry at the end of the list



Fastest by far (time is in comparison to Jacobs):


