I assume that your are assuming your inputs a,b and c are normally distributed because you say you can define them with mean and standard deviation. If that is the case, you can do this pretty fast without any special package.

```
mu.a=33
mu.b=32
mu.c=13
sigma.a=22
sigma.b=22
sigma.c=222
n= a.large.number=10^5
a=rnorm(n,mu.a,sigma.a)
b=rnorm(n,mu.b,sigma.b)
c=rnorm(n,mu.c,sigma.c)
y=a+b+c
plot(density(y))
mean(y)
sd(y)
```

Make sure to be aware of all the assumptions we are making about `y`

,`a`

,`b`

and `c`

.
If you want to do something more complex like figure out the sampling variance of the mean of y. Then do this procedure many times collecting the mean and plot it.

```
mysimfun=function(n,mu,sigma,stat.you.want='mean')
# mu is length 3 and sigma is too.
{
n= a.large.number=10^5
a=rnorm(n,mu[1],sigma[1])
b=rnorm(n,mu[2],sigma[2])
c=rnorm(n,mu[3],sigma[3])
y=a+b+c
plot(density(y))
return(ifelse(stat.you.want=='mean',mean(y),sd(y))
}
mu=c(mu.a,my.b,mu.c)
sigma=c(sigma.a,sigma.b,sigma.c)
mi=rep(NA,100)
```

Then run it in a loop of some sort.

```
for(i in 1:100) {mi[i]=mysimfun(10,mu,sigma,stat.you.want='mean') }
par(mfrow=c(2,1)
hist(mi)
plot(density(mi))
mean(mi)
sd(mi)
```