I have a large matrix of probabilities (call it A), N by 806, where N is typically a number in the thousands.

Using this matrix of probabilities, I want to create another matrix (call it B), N by 806, that contains only binary values. The value in B[i,j] is determined by using the corresponding probability in A[i,j] via binomial. The code I am using is below:

```
diCases <- matrix(0, nrow = numcases, ncol = numdis)
diConts <- matrix(0, nrow = numconts, ncol = numdis)
for(row in 1:nrow(diCases)) {
print(paste('Generating disease profile for case', row, '...'))
for(col in 1:ncol(diCases)) {
pDis <- Pcases[row, col]
diCases[row, col] <- rbinom(1, 1, pDis)
}
}
for(row in 1:nrow(diConts)) {
print(paste('Generating disease profile for control', row, '...'))
for(col in 1:ncol(diConts)) {
pDis <- Pconts[row, col]
diConts[row, col] <- rbinom(1, 1, pDis)
}
}
```

Basically, I have resorted to using nested for loops, looping through every column in each row and moving on to the next row, assigning a 1 or 0 based on the result of:

```
rbinom(1, 1, pDis)
```

where pDis is the A[i,j] mentioned in the beginning. As you can imagine, this is pretty slow and is the main bottleneck in my code. This block of code is in a simulation that I had planned to run over and over again, ideally in a short period of time.

**Is there a faster way to accomplish this?** I looked into the "apply" functions but couldn't really figure out how to make it work for this particular task.

Thank you all in advance.

`apply`

ing). What is your`pDis`

? – Richard Scriven Jul 9 '14 at 17:20`rbinom`

on an entire matrix, which is what konvas suggested, and it worked beautifully. – user3821273 Jul 9 '14 at 17:33