I realise this question is a little old, but I see that the answer

```
forwardsolve(L, forwardsolve(L, b), transp=TRUE)
```

hasn't been given yet. This uses the triangular structure, while keeping to the original question. This should be faster and more accurate for larger matrices. It might also be worth noting that `L <- t(chol(A))`

since `chol returns an upper triangular matrix.

```
A <- matrix(c(1,1,1,1,5,5,1,5,14), nrow=3)
# Cholesky decomposition A = LL'
L <- t(chol(A))
# Make some b with known x
x <- c(1, 2, 3)
b <- A %*% x
# Solve
forwardsolve(L, forwardsolve(L, b), transp=TRUE)
```

Giving the answer:

```
> forwardsolve(L, forwardsolve(L, b), transp=TRUE)
[,1]
[1,] 1
[2,] 2
[3,] 3
```