The number has 8 digits none of the digits are the same 2. It is enemy divisible by 10 3. The value of one of the digits is 80,000 4. The digit in the millions place is the largest 1-digit odd number 5. The digit in the thousands place is 3 less than the digit in the millions place 6. The digit in the hundreds place is half the digit in the thousands place 7. The digit in the tens place is 2 more than the digit in the ones place 8. The digit in the hundred thousands place is the largest single-Digit factor of 25. 9. The digit in the ten millions place is an even number

49,586,320

To find the number, let's break down the given information and solve each clue step by step:

1. The number has 8 digits, and none of the digits are the same.
We know that each digit in the number is unique.

2. The number is evenly divisible by 10.
Since the number is divisible by 10, the last digit must be 0.

3. The value of one of the digits is 80,000.
One of the digits in the number is 80,000. However, we know that the number has 8 digits in total, so we need to consider where this digit could be located.

4. The digit in the millions place is the largest 1-digit odd number.
The digit in the millions place is the largest 1-digit odd number, which means it can only be 9.

5. The digit in the thousands place is 3 less than the digit in the millions place.
The digit in the thousands place is 3 less than 9, which means it is 6.

6. The digit in the hundreds place is half the digit in the thousands place.
The digit in the hundreds place is half of 6, which is 3.

7. The digit in the tens place is 2 more than the digit in the ones place.
We don't have any specific information to determine the exact digits in the tens and ones places yet. We will come back to this clue later.

8. The digit in the hundred thousands place is the largest single-digit factor of 25.
The largest single-digit factor of 25 is 5, so the digit in the hundred thousands place must be 5.

9. The digit in the ten millions place is an even number.
We know that the digit in the ten millions place is an even number, but we don't have any specific information to determine the exact digit yet. We will come back to this clue later.

Now, let's put the information together to find the number:

We have the following information so far:
Ten Millions: Even number (Unknown)
Millions: 9
Hundred Thousands: 5
Tens of Thousands: Unknown
Thousands: 6
Hundreds: 3
Tens: Unknown
Ones: Unknown
Tens of Billions: 0

To find the missing digits, we can try differentiating the ten millions and tens places by finding other clues.

Let's consider the clue about one of the digits being 80,000. Since the millions place is already occupied by 9, the 80,000 digit must be in the ten millions place.

This means the ten millions place value is 80,000.

Now, let's consider the clue that the digit in the tens place is 2 more than the digit in the ones place. Since we know that the digit in the ones place is not known yet, let's try different values for the ones place and find the corresponding digit for the tens place.

If the ones place is 1, then the tens place would be 3.

So far, the number becomes:
Ten Millions: 8
Millions: 9
Hundred Thousands: 5
Tens of Thousands: Unknown
Thousands: 6
Hundreds: 3
Tens: 3
Ones: 1
Tens of Billions: 0

Now, let's consider the clue that the digit in the thousands place is 3 less than the digit in the millions place. Since the digit in the millions place is 9, the digit in the thousands place would be 9 - 3 = 6.

Now, the number becomes:
Ten Millions: 8
Millions: 9
Hundred Thousands: 5
Tens of Thousands: Unknown
Thousands: 6
Hundreds: 3
Tens: 3
Ones: 1
Tens of Billions: 0

Lastly, we need to find the digit in the tens of thousands place. We already know that none of the digits can repeat, so the only remaining digits are 2, 4, 7, which are single-digit numbers that have not been used yet.

To determine the digit in the tens of thousands place, we can try each of the remaining digits and see which one satisfies the condition.

If the tens of thousands digit is 2:
The number becomes:
Ten Millions: 8
Millions: 9
Hundred Thousands: 5
Tens of Thousands: 2
Thousands: 6
Hundreds: 3
Tens: 3
Ones: 1
Tens of Billions: 0

However, this would mean that the number has only 7 digits, breaking the initial condition. So, we can conclude that the tens of thousands digit is not 2.

Similarly, if we try the remaining digits, 4 and 7, we will find that neither of them satisfies the requirements. Therefore, there is no valid solution that fulfills all the given conditions.

In conclusion, there is no number that meets all the given criteria.