# How to plot inequalities

I would like to plot the following inequalities: y < p2(1 - p1) and x < p1(1 - ( y / (1 - p1))).

Given that the first is satisfied, I want to plot the region in which both are satisfied.
p1 and p2 can vary within [0,1].

I would appreciate any help!

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Try this: The red area is where both inequalities are satisfied.

``````[X,Y]=meshgrid(0:0.01:1,0:0.01:1); % Make a grid of points between 0 and 1
p1=0.1; p2=0.2; % Choose some parameters
ineq1 = Y<p2*(1-p1);
ineq2 = X<p1*(1-(Y./(1-p1)));
colors = zeros(size(X))+ineq1+ineq2;
scatter(X(:),Y(:),3,colors(:),'filled')
``````

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You may want to explain the "magic" behind the `colors = ...` line. –  sfstewman Jul 5 '12 at 16:30
The explanation for the colors is that each inequation is actually a binary matrix of 0's and 1's indicating where it is satisfied and where it is not. `colors` is their sum, and equals 2 where both inequations are satisfied, 1 where only one of them is, and 0 where none are. `scatter` assigns a different color for each value, and `2` gets the red color (in the default colormap red is assigned to the maximal value). –  Eitan T Jul 6 '12 at 0:31

An alternative solution (yet similar to Sam Robert's) would be using `contourf`:

``````[X, Y] = meshgrid((0:999) / 1000, (0:999) / 1000);
p = rand(2, 1);                            %# In this example p = [0.1, 0.2]
ineq1 = Y < p(2) * (1 - p(1));             %# First inequation
ineq2 = X < p(1) * (1 - (Y / (1 - p(1)))); %# Second inequation
both = ineq1 & ineq2;                      %# Intersection of both inequations

figure, hold on
c = 1:3;                                   %# Contour levels
contourf(c(1) * ineq1, [c(1), c(1)], 'b')  %# Fill area for first inequation
contourf(c(2) * ineq2, [c(2), c(2)], 'g')  %# Fill area for second inequation
contourf(c(3) * both, [c(3), c(3)], 'r')   %# Fill area for both inequations
legend('First', 'Second', 'Both')
set(gca, ...                               %# Fixing axes ticks
'XTickLabel', {t(get(gca, 'XTick'))}, 'YTickLabel', {t(get(gca, 'YTick'))})
``````

and this is the result:

The red area (as mentioned in the legend) indicates where both inequations are satisfied.

Note that the second and third `contourf` calls are just for illustration, to show where only one of the inequations is satisfied.

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