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

can you say run-on sentence?

Slow down and say what you want - that breathless jumble is giving me a headache!

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To solve this riddle question, we need to carefully analyze the given information. Let's break it down step by step:

1. "All six digits in the number are even": This tells us that all the digits in the number are even numbers. Even numbers include 0, 2, 4, 6, and 8.

2. "Remember that zero is an even number": It is important to include 0 as a possible digit.

3. "One digit is used once, and all the other digits are used twice": This means that out of the six digits in the number, one digit appears only once, while the remaining five digits appear twice.

4. "Four times the hundreds digit": This suggests that the number is four times the value of the hundreds digit. The hundreds digit occupies the third position from the right in the number.

5. "The tenth digit is the difference of the ones digit and the hundred digit": The tenth digit, or tens place, is equal to the difference between the ones digit (rightmost digit) and the hundredth digit (second digit from the right).

6. "The hundred thousand digit is not zero": The digit occupying the hundred thousandth place (leftmost digit) cannot be zero.

Now let's apply these rules to solve the riddle:

1. We know that there are six digits in the number and they are all even. So, the possible digits are 0, 2, 4, 6, and 8.

2. One digit appears only once, while the rest appear twice. From the possible digits, we need to select five numbers to appear twice and one number to appear once. Let's choose 2, 4, 6, 8 to appear twice, and 0 to appear once.

3. Now, we need to find the number that is four times the value of the hundreds digit. Since the hundreds digit is a repeating digit, let's consider each of the selected digits (2, 4, 6, 8) and multiply them by 4. This gives us:

For digit 2: 2 x 4 = 8
For digit 4: 4 x 4 = 16
For digit 6: 6 x 4 = 24
For digit 8: 8 x 4 = 32

We can see that the digit that satisfies the condition is 8.

4. Next, we need to find the difference between the ones digit and the hundredth digit, which is equal to the tens digit. Since the ones digit is repeating, we can consider each of the selected digits (2, 4, 6) as the ones digit and subtract the digit in the hundredth place (2, 4, 6) from it. This gives us:

For ones digit = 2: 2 - 2 = 0
For ones digit = 4: 4 - 4 = 0
For ones digit = 6: 6 - 6 = 0

Hence, the tens digit is 0.

5. Finally, we need to determine the hundred thousandth digit. Since the condition states that it cannot be zero, the remaining digit left to consider is 8.

Putting all of these together, we can form the answer to the riddle question: the number is 864208.

Therefore, the answer to the riddle is 864208.