Since they are even, they are multiples of 2. Since they
are also multiples of 5, they are multiples of 2×5 or 10.
So we want the sum of the multiples of 10 from 10000 to 99990,
inclusive,
10000 + 10010 + 10020 + ∙∙∙ + 99970 + 99980 + 99990
This sequence is the sequence of all 4 digit integers from 1000 to 9999:
1000, 1001, 1002, ..., 9997, 9998, 9999
inclusive, with 0's annexed on the end of each.
So the number of 5-digit multiples of 10 is the same as the
number of all 4-digit integers from 1000 to 9999.
There are 9999 4-digit integers from 1 through 9999, but
we can't count the 999 integers from 1 through 999 which
have fewer than 4 digits. So since there are 9999-999 = 9000
4-digit numbers from 1000 to 9999, there are likewise 9000
multiples of 10 from 10000 to 99990, inclusive.
Using the sum formula with
a1 = 10000, n = 9000, an = a9000 = 99990.
Edwin
