Puzzles

The square numbers must be 1, 9, 25, 36, and 784.

The sum of the units digits of the three numbers must be 10 (as the units digit of the result must be 0 and the number are not big enough to allow the sum to be 20). Similarly, the sum of the two tens digits must be 9, and the sum of the two hundreds digits is 9 (so that 10s are made when the 1 is carried).

The> hundreds digits could be 2 and 7, 3 and 6, or 4 and 5. As we're looking to make the larger number as small as possible, we should pick 4 and 5.

The tens digits could be 2 and 7 or 3 and 6. We pick 2 and 7 and as 2 is the smallest possible number here.

Finally, the units digits are 1, 3 and 6. We use 1 for our number as it's smallest, leading to 521.

We know the answer has three digits: we are looking for a number ABC that is equal to 4×A×B×C. Dividing by A, we see that 4×B×C > 100 and so B×C > 25. This means that the only possible options for BC are 65, 66, 74, 75, 76, 77, 84, 85, 86, 87, 88, 93, 94, 95, 96, 97, 98 and 99.

Trying these options with different values for A, we find that 384 works.

If Ivy's number is ABC, then A+C must be 8 or 18 (as this makes this final digit of the sum correct). A+C cannot be 18 of the sum would be bigger than 1000, so A+C must be 8.

The middle digit tells us that 2×B must be 6 or 16. As the first digit of the sum is 9 and not 8, there must be a 1 carried over into the hundreds column, so 2×B = 16 and B = 8.

Overall, we know that Ivy's number is A8C, with A+C = 8. The smallest possible number Ivy could have started with is therefore 187.

Noel writes down 9 one-digit numbers, 90 two-digit numbers and 1 three-digit number. In total, these include 1×9 + 2×90 + 3×1 = 192 digits.

There are 9 options for the first digit of the number (1 to 9). There are then 9 options for the second digit (0 to 9 excluding the digit already used), and 8 options for the third digit (0 to 9 excluding the two digits already used). In total, this makes 9×9×8 = 648 numbers whose digits are all different.

The digits 1 to 7 will each appear the same number of times as each other in each position of the number, so each digit of the mean will be the mean of the digits 1 to 7. Therefore the mean is 444.