I am a number between 75 and 150.

My tens digit is three times my ones digit.
The sum of my digits is 5.
My hundreds digit and my ones digit are the same.

We gave you the answer to your last problem. Now it's your turn.

I'll be glad to check your answer.

Note that the first number is 1 (in the hundreds place).

To find the number that satisfies all these conditions, we can break down the problem into smaller steps.

Step 1: Determine the possible values of the tens digit.
Since the tens digit is three times the ones digit, we can start by trying out different values for the ones digit (ranging from 0 to 9) and calculating the corresponding tens digit.

For example, if the ones digit is 0, then the tens digit would be 3 * 0 = 0.
If the ones digit is 1, then the tens digit would be 3 * 1 = 3.
Continue this process until you have checked all possible values for the ones digit.

Step 2: Determine the possible values of the hundreds and ones digits.
Since the hundreds digit and ones digit are the same, we can use the same values that we found in Step 1 for the ones digit as the hundreds digit.

For example, if the ones digit is 0, then the hundreds digit would also be 0.
If the ones digit is 1, then the hundreds digit would also be 1.
Again, continue this process until you have checked all possible values for the ones and hundreds digits.

Step 3: Check if the sum of the digits equals 5.
For each combination of hundreds, tens, and ones digits that we found in Step 2, calculate the sum of the digits. If the sum is equal to 5, then that number satisfies all the conditions.

Step 4: Find the number that satisfies all the conditions.
Combine the hundreds, tens, and ones digits of the numbers that passed the sum of digits test in Step 3. These combinations will represent the numbers that satisfy all the given conditions.

Using this step-by-step approach, you should be able to find the number in the range of 75 to 150 that meets all the given conditions.