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Puzzles

8 December

Angel wrote out a muliplication square for the numbers from 1 to 3 (the table has the numbers 1 to 3 in the top row and left column, then every other entry is equal to the number at the top of its column multiplied by the number at the left of its row):
 1  2  3 
 2  4  6 
 3  6  9 
The sum of the numbers in the bottom row is 18. The sum of all the numbers in the table is 36.
Angel then wrote out another multiplication square with the numbers from 1 to \(n\). The sum of all the numbers in the new table is 2025. What is the sum of the numbers in the bottom row of the new table?

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16 December

Put the digits 1 to 9 (using each digit exactly once) in the boxes so that the sums are correct. The sums should be read left to right and top to bottom ignoring the usual order of operations. For example, 4+3×2 is 14, not 10. Today's number is the product of the numbers in the red boxes.
×+= 46
÷ + +
+÷= 1
÷ × ×
÷= 1
=
1
=
12
=
45

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Tags: number, grids

16 December

Some numbers can be written as the sum of two or more consecutive positive integers, for example:
$$7=3+4$$ $$18=5+6+7$$
Some numbers (for example 4) cannot be written as the sum of two or more consecutive positive integers. What is the smallest three-digit number that cannot be written as the sum of two or more consecutive positive integers?

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7 December

There are 8 sets (including the empty set) that contain numbers from 1 to 4 that don't include any consecutive integers:
\(\{\}\), \(\{1\}\), \(\{2\}\), \(\{3\}\), \(\{4\}\), \(\{1,3\}\), \(\{1,4\}\), \(\{2, 4\}\)
How many sets (including the empty set) are there that contain numbers from 1 to 14 that don't include any consecutive integers?

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Tags: number, sets

2 December

What is the smallest number that is a multiple of 1, 2, 3, 4, 5, 6, 7, and 8?

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5 December

Today's number is the number of ways that 35 can be written as the sum of distinct numbers, with none of the numbers in the sum being divisible by 9.
Clarification: By "numbers", I mean (strictly) positive integers. The sum of the same numbers in a different order is counted as the same sum: eg. 1+34 and 34+1 are not different sums. The trivial sum consisting of just the number 35 counts as a sum.

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