Borrar filtros
Borrar filtros

How to determine the most common (most occurring) number in column of a large data of more than 100,000 length of data

20 visualizaciones (últimos 30 días)
Gali Musa
Gali Musa el 2 de Mayo de 2018
Comentada: Siyu Guo el 3 de Mayo de 2018
How to determine the most common (most occurring) number in column of a large data of more than 100,000 length of data?

Iniciar sesión para responder a esta pregunta.

Respuestas (4)

Star Strider
Star Strider el 2 de Mayo de 2018
If you want to count a range of values, rather than exact values, one option is to use the histogram (link) function (or the hist (link) function). You can use the number of bins you want with either function. If you want to define the bins themselves, you will need to define the edges of the bins in histogram and the centres of the bins in hist.
Ameer Hamza
Ameer Hamza el 2 de Mayo de 2018
Use mode().
mostOccuringVal = mode(A);
  2 comentarios
Gali Musa
Gali Musa el 2 de Mayo de 2018
its working but i have range of the most occurring values (values appears almost the same after approximation). i. e the most occurring has a range from 82% to 83% (0.82 - 0.83) which off cause want to use all. Thank you for your kind support
Jan
Jan el 3 de Mayo de 2018
@Gali: Please mention the important details in the question already, not only in a comment after somebody has posted an answer.

Iniciar sesión para comentar.

John D'Errico
John D'Errico el 2 de Mayo de 2018
Editada: John D'Errico el 2 de Mayo de 2018
There are many things you can do. But none will likely be perfectly satisfactory. For example, you could use uniquetol to do the "counting".
[Vuniq,I,J] = uniquetol(V,0.01);
counts = accumarray(J,1,[100,1],@sum);
[cmax,ind] = max(counts)
cmax =
1094
ind =
37
Vuniq(ind)
ans =
0.36033
So the most frequent value, with a bin of 0.01, and a count of 1106 was 0.36033. The bins that were implicitly created by uniquetol have a width of approximately 0.01. This is essentially the same solution that would arise has a histogram tool been used, as long as the bin boundaries were the same.
That is, the first 10 such unique results obtained from uniquetol are:
Vuniq(1:10)'
ans =
6.2251e-06 0.010016 0.020018 0.030019 0.040023 0.050026 0.060033 0.070049 0.080051 0.090053
diff(ans)
ans =
0.01001 0.010002 0.010001 0.010004 0.010003 0.010007 0.010016 0.010002 0.010002
But was 0.36033 the truly most common? Suppose that the most frequent count happened to cross two such bins?
As I said, there is no perfect solution, at least probably not if you want it to be fast. Are you looking for ANY interval of width 0.01 that contains the most number of elements? If so, this will get more difficult. Still doable, but possibly a bit slower, with more effort. You can see that I chose a vector V that was intentionally going to be very difficult in this respect.
Vs = sort(V);
[~,~,upperbin] = histcounts(Vs + 0.01,Vs);
[Vmaxcount,Vsind] = max(upperbin' - (0:100000 - 1))
Vmaxcount =
1106
Vsind =
35963
So it looks like the interval of width 0.01 with the MAXIMUM number of elements in the vector V seems to be [0.36073,0.36073 + 0.01].
Vs(Vsind)
ans =
0.36073
As a test:
sum((Vs >= Vs(Vsind)) & (Vs < Vs(Vsind) + 0.01))
ans =
1106
So arguably, the true moving mode, with an interval width of 0.01 is:
Vs(Vsind) + 0.01/2
ans =
0.36573
Surprisingly the best interval of width 0.01 was actually one that overlapped with the one that uniquetol found. But there is no reason this must happen. Had I chosen a different random set of data, that could easily change.
Anyway, because I was able to use efficient tools for this, it was even pretty fast.
Siyu Guo
Siyu Guo el 3 de Mayo de 2018
Suppose v is your data vector.
u = unique(v);
h = hist(v,u);
[~,i] = max(h);
value_with_most_occurrences = u(i);

Categorías

Más información sobre Half-Normal Distribution en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by