Does anybody know how to generate two random numbers which sum is less than one?

I found only topics describing how to generate 2 random numbers which add up to 1 (trough normalization)

  • The obvious solution would be to normalize them to anything less than one. Do you want to achieve a certain distribution or do you want your numbers to have certain properties? – Dennis Jaheruddin Jan 23 '14 at 11:04
  • I see now that the condition is "sum less than", not "sum equal to". So I'm retracting my duplicate-question vote – Luis Mendo Jan 23 '14 at 11:45
  1. Generate the first random number, r1.
  2. Generate a random number less than 1 to be the random sum.
  3. Define r2 as (sum - r1).
  • I suppose you would need to generate sum first, and then make sure r1 is generated less than sum. (Or generate sum to be larger than r1) otherwise you could have r1=0.8, sum=0.4, r3=-0.4 which I expect to be undesirable. – Dennis Jaheruddin Jan 23 '14 at 11:07
  • I wondered that too, but original post put no bounds on the two numbers...only on their sum. – normKrumpe Jan 23 '14 at 11:09
  • Your answer is indeed correct, but in this case I would recommend you to mention the assumption that negative numbers are allowed. That may help the asker even more! – Dennis Jaheruddin Jan 23 '14 at 11:14
  • Thanks a lot for your suggestions! – Alessandro Beretta Jan 23 '14 at 11:18
  • Sorry if I bother you again... How I can do if I want to generate a third variable which squared value is less than the product of the first two variables? In practice what I'm trying to do is to generate a positive-definite 2x2 matrix... – Alessandro Beretta Jan 23 '14 at 12:00

Assuming you don't care too much about the distribution:

x = rand(2,1);
if sum(x)>1

Modifying normKrumpe's answer, I'd suggest

  1. Generate the sum as a random number.
  2. Generate a random number r1 less than (or <=?) the sum.
  3. r2 = sum-r1.

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