To determine the value of $ x^2 + y^2 - xy $ for the eight-digit number "62x2365y" to be divisible by 72, we need to check the divisibility rules for both 8 and 9, as 72 = 8 × 9.

**Step 1: Check divisibility by 8**

A number is divisible by 8 if its last three digits form a number that is divisible by 8. The last three digits of "62x2365y" are "65y".

We need to find a value of $ y $ such that "65y" is divisible by 8.

- For $ y = 0 $, "650" is not divisible by 8.
- For $ y = 1 $, "651" is not divisible by 8.
- For $ y = 2 $, "652" is divisible by 8.
- For $ y = 3 $, "653" is not divisible by 8.
- For $ y = 4 $, "654" is not divisible by 8.
- For $ y = 5 $, "655" is not divisible by 8.
- For $ y = 6 $, "656" is divisible by 8.
- For $ y = 7 $, "657" is not divisible by 8.
- For $ y = 8 $, "658" is not divisible by 8.
- For $ y = 9 $, "659" is not divisible by 8.

So, $ y $ can be either 2 or 6.

**Step 2: Check divisibility by 9**

A number is divisible by 9 if the sum of its digits is divisible by 9. The sum of the digits of "62x2365y" is $ 6 + 2 + x + 2 + 3 + 6 + 5 + y = 24 + x + y $.

We need $ 24 + x + y $ to be divisible by 9.

**Case 1: $ y = 2 $**

$ 24 + x + 2 = 26 + x $

For $ 26 + x $ to be divisible by 9, $ x $ must be 7 (since $ 26 + 7 = 33 $, which is divisible by 9).

**Case 2: $ y = 6 $**

$ 24 + x + 6 = 30 + x $

For $ 30 + x $ to be divisible by 9, $ x $ must be 6 (since $ 30 + 6 = 36 $, which is divisible by 9).

**Step 3: Calculate $ x^2 + y^2 - xy $**

**For $ x = 7 $ and $ y = 2 $:**

$ x^2 + y^2 - xy = 7^2 + 2^2 - 7 \cdot 2 = 49 + 4 - 14 = 39 $

**For $ x = 6 $ and $ y = 6 $:**

$ x^2 + y^2 - xy = 6^2 + 6^2 - 6 \cdot 6 = 36 + 36 - 36 = 36 $

Among the given options, the correct value is 36.

Question

To determine the value of $ x^2 + y^2 - xy $ for the eight-digit number "62x2365y" to be divisible by 72, we need to check the divisibility rules for both 8 and 9, as 72 = 8 × 9.

**Step 1: Check divisibility by 8**

A number is divisible by 8 if its last three digits form a number that is divisible by 8. The last three digits of "62x2365y" are "65y".

We need to find a value of $ y $ such that "65y" is divisible by 8.

- For $ y = 0 $, "650" is not divisible by 8.
- For $ y = 1 $, "651" is not divisible by 8.
- For $ y = 2 $, "652" is divisible by 8.
- For $ y = 3 $, "653" is not divisible by 8.
- For $ y = 4 $, "654" is not divisible by 8.
- For $ y = 5 $, "655" is not divisible by 8.
- For $ y = 6 $, "656" is divisible by 8.
- For $ y = 7 $, "657" is not divisible by 8.
- For $ y = 8 $, "658" is not divisible by 8.
- For $ y = 9 $, "659" is not divisible by 8.

So, $ y $ can be either 2 or 6.

**Step 2: Check divisibility by 9**

A number is divisible by 9 if the sum of its digits is divisible by 9. The sum of the digits of "62x2365y" is $ 6 + 2 + x + 2 + 3 + 6 + 5 + y = 24 + x + y $.

We need $ 24 + x + y $ to be divisible by 9.

**Case 1: $ y = 2 $**

$ 24 + x + 2 = 26 + x $

For $ 26 + x $ to be divisible by 9, $ x $ must be 7 (since $ 26 + 7 = 33 $, which is divisible by 9).

**Case 2: $ y = 6 $**

$ 24 + x + 6 = 30 + x $

For $ 30 + x $ to be divisible by 9, $ x $ must be 6 (since $ 30 + 6 = 36 $, which is divisible by 9).

**Step 3: Calculate $ x^2 + y^2 - xy $**

**For $ x = 7 $ and $ y = 2 $:**

$ x^2 + y^2 - xy = 7^2 + 2^2 - 7 \cdot 2 = 49 + 4 - 14 = 39 $

**For $ x = 6 $ and $ y = 6 $:**

$ x^2 + y^2 - xy = 6^2 + 6^2 - 6 \cdot 6 = 36 + 36 - 36 = 36 $

Among the given options, the correct value is 36.

Knowee AI · Accepted Answer