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Is it better to use sqrt or ^(1/2) ?

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Andre Ged
Andre Ged on 15 Mar 2016
Commented: Walter Roberson on 8 Sep 2023
In order to have better performance in terms of computational time, is it better to use sqrt or ^(1/2) ?

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Accepted Answer

KSSV
KSSV on 15 Mar 2016
Edited: per isakson on 3 Jun 2017
clc; clear all
N = 10:10:100000;
t_sqrt = zeros(length(N),1) ;
t_pow = t_sqrt ;
for i = 1:length(N)
k = rand(N(i),1) ;
t1 = tic ;
k1 = sqrt(k) ;
t_sqrt(i) = toc(t1) ;
%
t2 = tic ;
k2 = k.^0.5 ;
t_pow(i) = toc(t2) ;
end
figure
plot(t_sqrt,'r') ;
hold on
plot(t_pow,'b') ;
legend('sqrt','power')
You may check yourself.....power (^) is taking less time.
  2 Comments
Walter Roberson
Walter Roberson on 3 Jun 2017
My tests suggest that sqrt() is faster, except maybe on some very small vectors.
Note: it will take a while to execute the below as it tests over a range of sizes.
N = round(logspace(2,7,500));
t_sqrt = zeros(length(N),1) ; t_sqrt1 = t_sqrt; t_pow = t_sqrt; t_pow1 = t_sqrt;
data = rand(1,max(N));
for i = 1 : length(N); k = data(1,1:N(i)); t_sqrt(i) = timeit(@() sqrt(k),0); t_pow(i) = timeit(@() k.^(1/2), 0); end
for i = 1 : length(N); k = data(1,1:N(i)); t_sqrt1(i) = timeit(@() sqrt(k),0); end; for i = 1 : length(N); k = data(1,1:N(i)); t_pow1(i) = timeit(@() k.^(1/2),0); end
plot(N,t_sqrt,'r-',N,t_sqrt1,'r--', N,t_pow,'b-', N,t_pow1, 'b--')
legend({'sqrt, combined loop', 'sqrt, separate loops', 'pow, combined loops', 'pow, separate loop'} )
I originally had only the combined loop, and smaller upper bounds, but I noticed some oddities in the timings for which the timings were sometimes shorter in synchronized ways. That suggested that some iterations might happen to execute faster than others by chance, so I decided to also run the loops independently to see whether the timing oddities stayed with the array sizes or were instead independent between the separated attempts. The tests did end up suggesting that the timing oddities were related to array sizes. Likely at the point where MATLAB starts handing over the work to BLAS or MLK or LINPACK or whatever, the iterations get relatively faster.

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More Answers (1)

Amarpreet
Amarpreet on 8 Sep 2023
Both these operations result in different values when operated on a matrix, so that may also be considered while using the functions.sqrt gives square root of each element, while the pow function operates on the whole matrix.
  2 Comments
Sam Chak
Sam Chak on 8 Sep 2023
Ran in:
Hi @Amarpreet,
For the computation of the matrix square root, have you compared the speed with sqrtm() function as well?
M = diag([4 9 25])
M = 3×3
4 0 0 0 9 0 0 0 25
Mr = sqrtm(M)
Mr = 3×3
2 0 0 0 3 0 0 0 5
Walter Roberson
Walter Roberson on 8 Sep 2023
Ran in:
N = 5:5:100;
t_sqrt = zeros(length(N),1) ; t_sqrt1 = t_sqrt; t_pow = t_sqrt; t_pow1 = t_sqrt;
data = rand(max(N));
for i = 1 : length(N); k = data(1:N(i),1:N(i)); t_sqrt(i) = timeit(@() sqrtm(k),0); t_pow(i) = timeit(@() k^(1/2), 0); end
for i = 1 : length(N); k = data(1:N(i),1:N(i)); t_sqrt1(i) = timeit(@() sqrtm(k),0); end; for i = 1 : length(N); k = data(1:N(i),1:N(i)); t_pow1(i) = timeit(@() k^(1/2),0); end
plot(N,t_sqrt,'r-',N,t_sqrt1,'r--', N,t_pow,'b-', N,t_pow1, 'b--')
legend({'sqrt, combined loop', 'sqrt, separate loops', 'pow, combined loops', 'pow, separate loop'} )

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