How many digits are presents from 1 - 2014

2014

I'd say just 10. That's all there are.

To determine how many digits are present from 1 to 2014, we need to consider the numbers in the range and count the total number of their digits.

Starting from 1, let's break down the numbers into different ranges based on the number of digits they have:

Range 1: 1-9 (single-digit numbers)
There are 9 single-digit numbers (1, 2, 3, ..., 9), each of which has one digit.

Range 2: 10-99 (double-digit numbers)
There are 90 double-digit numbers (10, 11, ..., 99), each of which has two digits.

Range 3: 100-999 (triple-digit numbers)
There are 900 triple-digit numbers (100, 101, ..., 999), each of which has three digits.

Range 4: 1000-2014 (four-digit numbers)
To calculate the number of digits in this range, we need to subtract the lower bound of this range from the upper bound and add 1 (as both bounds are included). So, 2014 - 1000 + 1 = 1015. Therefore, there are 1015 four-digit numbers, each of which has four digits.

Now, let's sum up the total number of digits in each range:
Range 1: 9 digits (each number has 1 digit)
Range 2: 180 digits (each number has 2 digits)
Range 3: 2700 digits (each number has 3 digits)
Range 4: 4060 digits (each number has 4 digits)

Finally, we can add up the digits from each range to find the total number of digits in the given range:
9 + 180 + 2700 + 4060 = 5949

Therefore, there are a total of 5949 digits from 1 to 2014.