Display a Uniform Distribution

The population for this example is a uniform distribution of random numbers between 0 and 1. Generate a sample set of the values in MATLAB® using therandfunction. Find their distributions using thehistcountsfunction.

numsamples = 1e4; numbins = 20; r = rand(numsamples,1); hst = histcounts(r,numbins);

Create a new array plot object and configure the properties of the array plot object to plot a histogram.

scope = dsp.ArrayPlot; scope.XOffset = 0; scope.SampleIncrement = 1/numbins; scope.PlotType ='Stem'; scope.YLimits = [0, max(hst)+1];

Call the scope to plot the uniform distribution.

scope(hst')

Display the Distribution of Multiple Samples

Next, simulate the calculation of multiple uniformly distributed random samples. Because the population is a uniformly distributed set of values between 0 and 1, we can simulate the sampling and calculation of sample means by generating random values between 0 and 1. As the number of random samples increases, the distribution of the means more closely resembles a normal curve. Run the release method to let property values and input characteristics change.

hide(scope); release(scope);

Change the configuration of the Array Plot properties for the display of a distribution function.

numbins = 201; numtrials = 100; r = zeros(numsamples,1); scope.SampleIncrement = 1/numbins; scope.PlotType ='Stairs';

Call the scope repeatedly to plot the distribution of the samples.

show(scope);forii = 1:numtrials r = rand(numsamples,1)+r; hst = histcounts(r/ii,0:1/numbins:1); scope.YLimits = [min(hst)-1, max(hst)+1]; scope(hst') pause(0.1);end

When the simulation has finished, the Array Plot figure displays a bell curve, indicating a distribution that is close to normal.

Inspect Your Data by Zooming

The zoom tools allow you to zoom in simultaneously in the directions of both thex- andy-axes or in either direction individually. For example, to zoom in on the distribution between 0.3 and 0.7, you can use the Zoom X option.