The sum of my digits is the same as the product of my digits who am I?

2+2=4

2*2=4
so 22.

You are 22

22 duhhhhh

To find the number that has the sum of its digits equal to the product of its digits, we can try listing out the possible numbers and checking their sums and products.

Let's start with the one-digit numbers:

0: The sum and product are both 0.
1: The sum and product are both 1.
2: The sum and product are both 2.
3: The sum and product are both 3.
4: The sum and product are both 4.
5: The sum and product are both 5.
6: The sum and product are both 6.
7: The sum and product are both 7.
8: The sum and product are both 8.
9: The sum and product are both 9.

None of the one-digit numbers fulfill the condition.

Now, let's move on to two-digit numbers:

10: The sum is 1, and the product is 0.
11: The sum is 2, and the product is 1 * 1 = 1.
12: The sum is 3, and the product is 1 * 2 = 2.
...
98: The sum is 17, and the product is 9 * 8 = 72.
99: The sum is 18, and the product is 9 * 9 = 81.

None of the two-digit numbers fulfill the condition either.

Since we have checked all the single-digit and two-digit numbers, we can conclude that there is no number whose sum of digits is equal to the product of its digits.