Puzzle of the Week #223 - Winston Churchill

I have a six letter word, a clue to which is: ‘Something Winston Churchill often is’.

If I change the first letter of my word to the letter that follows it in the alphabet, and then reverse the entire word, I get a new word.

What was my word?

Puzzle of the Week #222 - Staircase Rings

In the following diagram, the ‘staircase’ is made up of horizontal and vertical lines of equal length. The ends of these lines determine the radius of each of the rings, whose shared centre is the end of the final horizontal line.

If the overall shape has an area of 100, what is the area of each of the individual regions A to G?

Puzzle of the Week #221 - Quotation Wordsearch

A quotation has been hidden in the large grid below. The first word can be read off (left, right, up, down, but not diagonally), and its letters eliminated. Later words in the quotation may not be made of consecutive letters until the letters of previous words have been eliminated. All the letters in the grid will be used exactly once then eliminated.

As an example, the phrase ‘In the nick of time’ has been hidden in the example grid:

“4, 3, 6, 3, 8: 3, 8, 3, 5, 9. 3, 2, 3, 4, 5, 3, 6”

Puzzle of the Week #220 - 23 Days

If we count a workday as a day that is not Saturday or Sunday and is not a Bank Holiday, the most you will see in a given calendar month is 23. This happens twice in 2019: July and October. In the UK there are Bank Holidays at New Year, Easter, May, August and Christmas. Is it possible for a calendar year to have no months with 23 workdays?

Puzzle of the Week #219 - Four Leaf Clover

Four identical pieces forming a square with a four-leaf-clover shaped hole can be rearranged (after flipping half the pieces) into a rhombus with three circular holes. The shorter diagonal of the rhombus is the same as the side length of the square.

Rounded to the nearest whole number percentage, what proportion of the square is shaded?

Puzzle of the Week #218 - Fast Flowing River

Grace and Ruby live in a house next to a fast flowing river. One day they decide to travel a few miles down the river and then return home. Grace is on foot, jogging along the riverbank at a speed of 5mph. Ruby takes the boat, which can travel at 9mph relative to the current of the river. They both set off at the same time, turn around at the same spot and arrive home at the same time. How fast was the current of the river?

Puzzle of the Week #217 - Identical Twins

Phyllis and Dilys are identical twins. They are each independently given the same 4-digit number.

Phyllis takes the number and converts it from decimal (base 10) to base 4, and writes down the 6-digit result.

Dilys simply writes the first and last digits of the number followed by the number in its entirety.

They are astonished to find that they have both written down the same 6-digit number!

What was the original number?

In other words, which number ABCD, when converted from decimal to base 4 becomes ADABCD?

Puzzle of the Week #216 - Four Semicircles in a Rectangle

Four semicircles are arranged around the edges of a rectangle. What are their respective radii?

This is a great deal more difficult than ‘Three Semicircles in a Square’. If it helps I can tell you that there is exactly one solution, and that each of the radii are rational numbers (so if you find it useful – and I’m not at all sure you will - you can scale the whole thing up by some factor, solve as a Diophantine set of equations, and scale back down again). I myself found this very difficult to solve, so if you discover a route to the solution that is not too difficult, I would be interested in knowing it.

Puzzle of the Week #215 - Three Semicircles in a Square

Three semicircles are arranged around the edges of a unit square. What are their respective radii?

Puzzle of the Week #214 - Travelling Salesman

A travelling salesman needs to visit each of the black squares in turn and return to where he started. He can choose to start wherever he wishes. He traces a zero-thickness path, can travel at any angle (this gridlines are only a reference) and doesn’t need to go to the middle of each black square, it is sufficient for his route to touch a corner or an edge. If each small square measures 1 x 1, what is the length of the shortest route?

Puzzle of the Week #213 - Collate

Given a string with three each of three different letters ordered thus:

A A A B B B C C C

It is possible through a series of three moves to change the order into:

A B C A B C A B C

A ‘move’ consists of taking a section of the string and reversing the order of the items within it. The brackets show the section to be reversed in the subsequent move:

A(AABB)BCCC -> ABBA(ABC)CC -> AB(BACBAC)C -> ABCABCABC

Using the exact same idea, how many moves will it take to change between the following?

A A A A A B B B B B C C C C C D D D D D E E E E E

A B C D E A B C D E A B C D E A B C D E A B C D E

Puzzle of the Week # 212 - Infinite Sum

The convergent sum of the following infinite sequence, in its simplest terms, is a fraction with a square number on the top and a factorial number below.

1/7 + 1/16 + 1/27 + 1/40 + 1/55 + 1/72 + … + 1/n(n+6) + …

What is it?

Footnote: the partial sum converges extremely slowly, such that if you add the first million terms you will only get the first 5 decimal places. However there exists a very nice trick to allow you to work out exactly the number the infinite sum converges upon (without having to do an infinite number of calculations!).

Puzzle of the Week #211 - Angle

B is the midpoint of AC

D is one third of the way along AE

CD is perpendicular to BE

AE is (√2) times the length of AC

What is the angle at A?

Puzzle of the Week #210 - Return Journey

The towns of Abbottsville, Beresford and Christchurch all lie on one straight road. I embark on a journey from Abbottsville, through Beresford, to Christchurch, and back the same way. Each day I cover 1 mile more than the day before. It takes me 10 days to travel from Abbottsville to Beresford, 11 days to travel from Beresford to Christchurch and 12 days to travel from Christchurch (through Beresford) to Abbottsville.

What are the distances between the towns?

The open beta has now started 🎉
Also, there’s now a little trailer on the store page (link to the trailer: https://www.youtube.com/watch?v=is8n293Z_zs).

Unfortunately, Google doesn’t offer Instant Apps for beta versions, so at the moment there is no free
demo available. We can hopefully get that sorted in the next few days.

Moritz Neikes has done a tremendous job with the app, thank you Moritz!

Puzzle of the Week #209 - Coin vs Dice

Which of the following scenarios should on average* take the most throws:

Repeatedly tossing a coin until you have seen at least 6 heads and at least 6 tails, or

Repeatedly throwing a dice until you have seen each of the numbers 1 to 6 at least once each?

*(simple arithmetic mean)

Puzzle of the Week #208 - Factorials Again!

Find a set of three (different positive whole) numbers whose sum is 6! And whose product is 9!

Puzzle of the Week #207 - Factorials

Find a set of four different positive whole numbers whose sum is a factorial number and whose product is also a factorial number.

Puzzle of the Week #206 - Tumbler

A glass tumbler has an outside diameter of 78mm, and inside diameter of 72mm and a solid base that is 30mm deep.

Its centre of gravity is exactly 30mm from the table, ie, at the height of the bottom of the inside of the glass.

What is the overall height of the glass tumbler?

Puzzle of the Week #205 - Formula

I have a sequence. It begins:

1

101

10101

1010101

101010101

etc

As it’s populated entirely with 1s and 0s it is not entirely clear whether these are decimal numbers, or binary numbers, or some other base entirely.

Construct a formula to give the nth term, which works no matter what base we are working in.

***EDIT*** You are looking for a simple formula where you plug in the value of n and get the nth term, no recursive formulae or finite sums required.