Sean's mom was 27 years old when he was born. When Sean is 14 years old his mother's age will contain the same two digits as Sean's age. The next time that Sean's age and his mother's age contain the same 2 digits ____ years later.

25

Idk thats why i wnat to knownthe answer.

I WNAT TO KNOW THE ANZYSWER

To find the number of years later when Sean's age and his mother's age contain the same two digits again, let's break down the problem into steps.

Step 1: Find Sean's current age.
Since his mother was 27 years old when he was born, and he is currently 14 years old, we can calculate Sean's current age by subtracting his age at birth from his mother's current age:
14 + 27 = 41.

Step 2: Determine the two-digit numbers that can form from Sean's age.
Sean's age is 41, so the possible two-digit numbers that can form from his age are 14, 41, 14, 41.

Step 3: Find the next time Sean's age and his mother's age contain the same two digits.
We need to find a time when Sean's age and his mother's age have the same two digits. Since we know that Sean's age is 41, we can add or subtract multiples of 27 to find a matching two-digit number.

Adding multiples of 27 to 41:

41 + 27 = 68 (not a match)
41 + (27 * 2) = 95 (match)

Subtracting multiples of 27 from 41:

41 - 27 = 14 (match)

Therefore, the next time that Sean's age and his mother's age contain the same two digits will be 14 years later, when Sean is 28 years old (41 + 14) and his mother is 41 years older (27 + 14 = 41 + 14).