by Peter Good
Published Sunday December 07 2025 (link)
Secret agent Robert Holmes was searching the hotel room of a foreign agent who was downstairs having breakfast. Holmes discovered a piece of paper containing the text DKCCVTCSZQRZYTAZXTTX and he thought this might be a coded message about the foreign agent’s mission so he sent it to his code-breaking experts.
They discovered that it was a message that had been scrambled by consistently replacing each letter of the alphabet with a different letter (no letter being used to replace more than one different letter). They decoded the message as a sentence containing four words, which they sent back to Holmes with spaces inserted between words. Holmes realised that his life was in imminent danger as soon as he read it.
What was the decoded message?
Sunday Times Teaser 3297 – 6oker
by Stephen Hogg
Published Sunday November 30 2025 (link)
6oker is a 6-card version of poker. Like 5-card poker the rank of a hand is based on the number of distinct variants of that type possible from a 52-card pack. Fewer variants gives a higher (winning) rank. For example, a running flush (A2345 to 10JQKA in one suit) has 40 variants, beating four-of-a-kind (eg, four aces with another card) which has 624 variants.
Playing 6oker, Al and Di held hands of different rank. Each comprised only two card values and no aces, jacks, queens or kings (eg, four 3s and two 6s). These four values had no common prime factors. Ignoring suits, if you were told just Al’s hand you couldn’t be sure of Di’s, but if you were told just Di’s you could be sure of Al’s.
Who won? Ignoring suits, give Al’s hand.
by Colin Vout
Published Sunday November 23 2025 (link)
Having racked my brains all day trying to devise a suitable Teaser, I woke with my mind racing, just after 4am according to my digital clock. I couldn’t get back to sleep, so I decided to try counting sheep. I imagined them to be numbered starting with the figures shown on the clock, then counting upwards. Each sheep jumped through a particular gap in a fence according to the number of prime factors of its number. Repetitions were counted, so that sheep 405 (=3x3x3x3x5) jumped through the fifth gap.
The last thing I remember noticing before eventually falling asleep was that, for the first time, five consecutive sheep had jumped through the same gap.
What was the number of the last of these five sheep?
by Andrew Skidmore
Published Sunday November 16 2025 (link)
I have a map showing the location of four castles. All of the distances between the castles are different two-figure whole numbers of miles, as the crow flies. Alton is due north of Sawley; Derry is furthest west. Fenwick is due east of Derry. Alton and Derry are the shortest distance apart, while the distance from Alton to Sawley is the largest possible to comply with all the other information. Again, as the crow flies,
How far is a round trip of the castles (A to F to S to D to A)?
by Howard Williams
Published Sunday November 09 2025 (link)
With the school inspector scheduled to visit her school, Tina is taking extra care in preparing her lesson plan. The lesson deals with areas, shapes and symmetries. She has produced soft cards on which have been printed a four by four grid, and will ask the pupils to cut the grid into two shapes of equal area, but by only cutting along the lines. She wanted them to create as many different possible shapes in this way, explaining that two shapes are different only if you can’t make one the same as the other by rotating it, turning it over, or both. It turned out that the maximum number of different shapes was the same as the number of pupils in the class.
How many pupils are there in the class?
by Victor Bryant
Published Sunday November 02 2025
I have three granddaughters Jay, Kay and Elle. I set Jay and Kay a test and asked each of them to produce a list of positive numbers that used just nine digits with no digit occurring more than once. I wanted the majority of the numbers in each list to be odd and the majority of the numbers in each list to be perfect squares.
Jay’s list (which contained more numbers than Kay’s) added up to give the year of Elle’s birth, whereas Kay’s list added up to give the year in which Elle will be 25.
In one of the lists the highest number was a perfect square.
What (in increasing order) were the numbers in that list?
by Stephen Hogg
Published Sunday October 26 2025 (link)
My blood pressure was 160 systolic over 100 diastolic. I knew 120 over 80 is “normal”, so Doctor Hoo was concerned. She loaned me a TARDSI (Test And Record Diastolic Systolic Indicator) for a few days. I logged 12 blood pressure readings, comprising 24 different values (12 systolic between 120 and 160, and 12 diastolic between 80 and 100). I noticed some curious things about these values. Each systolic:diastolic pair had no repeated digits nor common prime factors. The systolic and diastolic sets each had exactly six odd values, but the lowest and highest values in each set were the only primes. No value was a digit rearrangement of any other and the systolic set had no consecutive values.
Give the systolic:diastolic pair you can be sure I measured (as SSS:DD eg 123:74)
by Danny Roth
Published Sunday October 19 2025
George and Martha are keen pop music fans. They recently followed the progress of one record in the charts and noticed that it was in the Top Ten for three weeks in three different positions, the third week’s position being the highest. In practice, a record never zigzags; it reaches a peak and then drops. For example, 5,4,9 or 5,6,9 are possible but 2,5,3 is not.
“That’s interesting!” commented Martha. “If you add the three positions, you get the day of the month when my father was born and if you multiply them, you get a number giving the month and last two digits of that year.” “Furthermore,” added George “two of the positions also indicate the last two digits of that year.”
What were the three positions in chronological order, and what was the date of Martha’s father’s birth?
by Colin Vout
Published Sunday October 12 2025 (link)
In our town centre the scheduled times taken for stages between bus stops are 5, 8 or 9 minutes. The only possible stages (in either direction) are between: stops Market and Castle; Market and Park; Market and Hospital; Station and Castle; Station and University; Castle and Park; University and Park; Park and Hospital.
Route 1 is from Market to Castle in 5 stages, which sum to 29 minutes; Route 2 is University to Market, totalling 19 minutes; Route 3 from University to Hospital takes 31 minutes for its 4 stages; Route 4 goes from University to Station in 27 minutes; Route 5 uses 4 stages to get from Market to University in 24 minutes. No route visits a stop more than once.
What are the stage times (in order) for Route 1, and Route 4?
by Peter Good
Published Sunday October 05 2025 (link)
Jack has a set of 28 standard dominoes: each domino has a spot pattern containing 0 to 6 spots at either end and every combination ([0 0], [0 1] and so on up to [6 6]) is represented in the set. He discarded a non-blank domino and arranged the remaining dominoes into six “groups”, each of which contained a positive cube number of spots; a group might comprise a single domino. He then discarded another non-blank domino and rearranged the remaining dominoes into six groups each of which again contained a positive cube number of spots. He managed to do this the maximum possible number of times.
How many dominoes did Jack discard, and how many spots in total were there on the dominoes that remained at the end?