It's a riddle question. All six digits in the number even remember that zero is an even number one digit is use once and all the other digits is used twice is four times the hundreds digit 10 digit is the difference of the ones digit in the hundred digit is the same digit in the tens place and the hundred thousand digit is not a zero

Bruh- i need help -_- 😒😑

To solve this riddle, we need to break it down step by step and analyze the given information:

1. All six digits in the number are even.
Since all six digits are even, the possibilities are 0, 2, 4, 6, and 8.

2. Zero (0) is an even number.
We already know this, but it's important to keep in mind.

3. One digit is used only once, and all the other digits are used twice.
Out of the six digits, one digit appears only once, and the rest appear twice.

4. The hundreds digit is four times the tens digit.
The hundreds digit is four times the value of the tens digit. For example, if the tens digit is 2, then the hundreds digit would be 4 * 2 = 8.

5. The tenth digit is the difference between the ones digit and the hundreds digit.
The tenth digit is the difference between the ones digit and the hundreds digit. For example, if the ones digit is 5 and the hundreds digit is 3, then the tenth digit would be 5 - 3 = 2.

6. The hundred thousand digit is not zero.
The digit in the hundred thousand place is not zero. This means it can be any of the even digits, excluding zero.

Based on these clues, let's solve the riddle step by step.

Step 1: Determine the possibilities for the hundred thousand digit.
Since the hundred thousand digit is even and cannot be zero, the possibilities are 2, 4, 6, or 8.

Step 2: Determine the possibilities for the hundreds digit.
The hundreds digit is four times the tens digit. Therefore, it must be an even digit that is a multiple of 4 from the possibilities we have. So, the possibilities for the hundreds digit are 4 or 8.

Step 3: Determine the possibilities for the tens digit.
Since the tens digit is used twice, it must be an even digit, excluding the digit already used for the hundreds digit. Therefore, the possibilities for the tens digit are 2, or 6 (excluding 4 and 8).

Step 4: Determine the possibilities for the ones digit.
Since the ones digit is used twice as well, it must be an even digit, excluding the ones already used for the hundreds and tens digits. Therefore, the possibilities for the ones digit are 0, 2, or 6 (excluding 4 and 8).

Step 5: Determine the possibilities for the tenth digit.
The tenth digit is the difference between the ones digit and the hundreds digit. Therefore, it must be an even digit. Since we have already used the digits 0, 2, and 6 for other places, the only possibility for the tenth digit is 4.

Putting it all together, the possible numbers that satisfy all the given conditions are:
204684, 206684, 604864, and 602864.

So, the solution is that there are four six-digit numbers that satisfy all the conditions mentioned in the riddle: 204684, 206684, 604864, and 602864.

This is impossible to read because you chose not to use appropriate capitalization and punctuation.