Posted by **oriana** on Friday, March 23, 2012 at 2:06pm.

Let U, V be random numbers chosen independently from the interval [0; 1] with uniform distribution. Find the cumulative distribution and density of each of the variables (a) Y = U + V. (b) Y = Absolute value of (U - V).

## Answer This Question

## Related Questions

- Statistics - If Y1 is a continuous random variable with a uniform distribution ...
- Statistics - a little bit rusty on statistics, i generally know how to set up ...
- Math - A random variable X has a cumulative distribution fnc given by 0 for a<...
- statistics - A random variable X is best described by a continuous uniform ...
- statistics - A random variable may assume any value between 10 and 50 with equal...
- Statistics - Assume a population of any 4 numbers(suppose: 4,8,15,19). Select a ...
- Statistics - Suppose x has a mound-shaped distribution with sigma = 9 . A random...
- Statistics - Run the simulation using n = 3= and n=10 for a uniform, a bell-...
- Statistics - A random sample of dates taken from headstones at a cemetery in ...
- math - let two stochastically independent random variables y1 and y2 with the ...

More Related Questions