# Character Counting

For small problems, I like the `nchar()`

solution the best, with one modification for negative values:

```
nDigits <- function(x) nchar( trunc( abs(x) ) )
# Test
nDigits(100)
nDigits(-100)
# both have 3 digits
nDigits(3)
nDigits(-3)
nDigits(0.1)
nDigits(-0.1)
# all have 1 digit
nDigits(1 / .Machine$double.eps)
nDigits(-1 / .Machine$double.eps)
# both have 16 digits
```

# Base 10 Logarithm

If you want to make the logarithm solution work, then you need considerations for negative values and values between 0 and 1. To me, this solution is a tad more complicated:

```
nDigits2 <- function(x){
truncX <- floor(abs(x))
if(truncX != 0){
floor(log10(truncX)) + 1
} else {
1
}
}
```

# Speed Performance

Here is the output from the microbenchmark comparison (100,000 reps). The code for the character-counting solution is simpler, but slower (by a factor of 3-4):

For integers > 1 (Unit: nanoseconds):

```
expr min lq mean median uq max neval
nDigits(100) 1711 2139 2569.2819 2566 2994 2234046 1e+05
nDigits2(100) 0 428 861.5435 856 856 5670216 1e+05
```

For *really tiny* decimals (Unit: nanoseconds):

```
expr min lq mean median uq max neval
nDigits(1/.Machine$double.eps) 2994 4277 5066.321 4705 4705 4477928 1e+05
nDigits2(1/.Machine$double.eps) 428 1283 1588.382 1284 1711 2042458 1e+05
```

`nchar(sub('\\.[0-9]+', '', x))`

`int(floor(x))`

, to drop the trailing decimals in`x`

, and then you could convert to a string and count the characters.`nchar(as.integer(x))`

`floor(log10(x)) + 1`

, so that 10 powers are counted correctly.1more comment