Three brothers Adam, Barnaby and Charles are each granted a share of their father’s estate upon his death, such that the eldest brother Adam receives the most, the next eldest Barnaby a lesser amount, the third son Charles the least.

Charles comes up with a scheme such that there will be three rounds of redistribution.

Firstly Charles takes half of his share and splits it equally between the other two. Then Barnaby does the same, and finally Adam does likewise.

Miraculously they all end up with the exact same amount!

If instead, they did the exact same procedure but beginning with Adam, and proceeding through Barnaby, then Charles, Adam would end up with £19,881 more than Charles.

How much were they each granted in the will?

Coins are placed within a rectangular grid. Some are showing heads, others tails, at random.

You can select coins, three at a time (three adjacent coins in a line, horizontally, vertically or diagonally), and turn them over. Through a sequence of such moves, it is possible to make it so that all of the coins are showing heads.

Find the arrangement with the fewest coins, such that any starting arrangement of heads or tails can be made all heads by a series of three-in-a-row flips in horizontal, vertical or diagonal directions.

The coins must lie in a rectangular grid pattern. You can have spaces in the grid without coins, however a triplet of coins you wish to flip cannot bridge across any gaps.

There are 16 teams in the knockout stages of a football tournament. For the sake of argument, say that each team has a distinct ranking from 1 (best) to 16 (worst), and that in any individual match, the better team will always win and progress to the next round.

The first round matches are randomly arranged, and the eight winners of those matches are randomly arranged in four matches in the quarter final etc.

What is the probability that the fifth best team will reach the final?

How many ways are there of arranging the digits 1,2,3,4,5,6 such that the first two digits make a multiple of 3, the middle two digits make a multiple of 4 and the final two digits make a multiple of 5?

(Example: 123645, 12=3x4, 36=4x9, 45=5x9)

I walk 10 miles south, then 10 miles east, 10 miles north, then finally 10 miles west.

I end up more than 25 miles from where I started.

How is this possible?

I roll three standard dice, resulting in three random numbers between 1 and 6.

I bet you that you can’t make a number that is a multiple of ‘n’ by arranging the three numbers displayed on the dice to form a three-digit number.

‘n’ can be any ODD number larger than 1, which YOU nominate but you must do so BEFORE you see the results of the dice rolls.

For instance if you chose 13 and the dice rolls were 1, 6 and another 1, you could win by noting that 611 is a multiple of 13.

What is the best choice for ‘n’ to maximise your chances of winning?

Consider a list of all of the three digit numbers that:

are a multiple of 4

contain three different digits

contain at least one odd digit

don’t contain a zero.

Prove that for every number that satisfies these criteria there is exactly one other that uses the same three digits in a different order and also satisfies the criteria.

I have in mind a number, that is the smallest non-zero number that:

when doubled it is a square number,

when tripled it is a cube number,

when multiplied by 5 it is a power of 5, and

when multiplied by 7 it is a power of 7.

How many zeroes does it have after the last non-zero digit?

Although this puzzle might involve very large numbers, it can be approached without a computer or even a calculator.

Similar to last week, but now you have to arrange the numbers 1-15 in a triangle such that each number is the difference of the two numbers immediately below it.

This time there is only one possible solution (plus its reflection), but even if you cleverly narrow down the possibilities with a couple of quick observations, there are still over 60000 triangles to check without a computer.

Alternatively, if I were to give you the bottom row, completing the grid will be trivially easy.

In an effort to find a sweet spot, I have given you the numbers on the left hand slope. Some more numbers can be placed straight away, whereas others you can only initially narrow it down to a couple of possibilities.

Can you arrange the numbers 1 – 10 in this triangle such that each number is the difference of the two numbers immediately below it?

There are in fact four possible solutions (not counting reflections), so extra kudos if you manage to find them all!

Presumably you’re familiar with the online game of Wordle but here’s a brief recap: you try to guess a solution word. If your guess word has any correct letters in the correct place they are coloured green. If your guess has correct letters but not in the correct place these are coloured yellow. If the solution word only has one E for instance, but your guess has two Es and neither are in the correct place, only the first will be coloured yellow.

 With that covered, I have come up with a variation. I have selected three English cities, and treated each of them as both the solution word and the guess word in all possible combinations, and coloured them according to Wordle rules. So for instance cities 2 and 3 start with the same letter, and cities 1 and 3 share a middle letter.

Your task is to identify the cities.

You have a well-shuffled pack of 100 cards, numbered 1-100. You draw five cards in turn. Given that the first card you drew was numbered ‘34’, what is the probability that the five cards are in ascending order?

Fred and Sally’s combined age is 65.

Fred is three times as old as Sally was when Fred was the age that Sally is now.

How old are they?

Fill in all the empty squares of the grid with the digits 1-9, such that:

 1:            A diamond shape denotes that the four numbers adjacent to it add to 20.

2:            Every diamond uses a different way to add to 20, so if for example one diamond is surrounded by 1,2,8,9, no other diamonds can use those same four numbers, not even in a different order.

3:            Identical digits are not allowed to occupy adjacent squares of the grid, not even diagonally adjacent.

What is the radius of this circle?

Use the following letter pairs to form a series of words: a 4-letter word, a 6-letter word, an 8-letter word, a 10-letter word and a 12-letter word.

Each of the letter pairs can only be used once, EXCEPT for five of them.

Those five special letter pairs appear at the end of each of the five words, and also earlier in the same word. For instance if the 8-letter word ends in OR, it would need to be either:

(OR----OR), (--OR--OR) or (----OROR).

AH  AM  BA  ID  IO  ME  NA  NC  NT  OR  OU  RA  SE  SY  TA

I have a pair of three-digit numbers that are the reverse of one another, let’s call them abc and cba. The greatest common divisor of abc and cba is 7.

What are the two numbers?

What is the highest number that:

is always a multiple of as long as a and b are integers?

In this figure there are two identical large squares and two identical smaller squares. What is the area of the red triangle in terms of the areas of the squares?