Answer:
Explanation:
Let the number be represented by x.
According to the given information, when x is divided by 6, the remainder is 3. That means x = 6n + 3, where n is an integer.
We also know that the number must be 331 greater than a multiple of 6. So, we can write:
x = 6n + 3 = 6(n + 331) + 3
Combining like terms, we get:
x = 6(n + 331) + 3 = 6(n + 331) + 6 - 3 = 6(n + 332) - 3
Since x is a whole number, it follows that -3 must be divisible by 6. Hence, x = 6(n + 332) = 6 * 663 = 3996.
Therefore, the number is 3996.