Dear Friends,
This particular blog post is dedicated to Eric & Martine Van Steerteghem. Eric turned 66 earlier this year, and he puts 100% into everything he does…so he should feel nicely at home here in Blog Post #100+66 π. Eric’s wife, Martine, will be turning 60 on 26 April, but I’d rather be a double high-five days π early in posting very happy birthday wishes now, than risk being late due to many other forthcoming commitments!
Rearrange the letters of MARTINE to make a different proper 7-letter English word beginning with M.
In honour of my colleague Jens (one of Eric and Martine’s two sons), rearrange the letters of SON IS MAN to make a proper 8-letter English word.
Beautiful Bible Passage
Super-Special Brainteaser
Get ready to think of some super-special three-digit positive whole numbers…For convenience, we’ll give the set of them the name S. If I were to show you the numbers in S right now, you’d see directly that none of the individual numbers contain repeated digits. In other words, each one of the numbers in S contains three different digits. Also, no zeroes are involved.
Now imagine picking N, a three-digit number in S, and then writing down all the different two-digit positive whole numbers that can be formed using pairs of different digits from N. For example, if N was 185 in honour of Eric & Martine’s 18 May wedding anniversary, then we could use its digits to make 15, 18, 51, 58, 81, 85. However, 185 won’t do for N !! Why not?! The reason is that the sum 15 + 18 + 51 + 58 + 81 + 85 doesn’t equal 185.
EVERY three-digit number N in S is super-special because in each case the two-digit numbers that can be formed from N really do have a sum exactly equal to N. π
Having emphasized that requirement, we’re now ready to state your super-special, fun challenge brainteaser. It‘s to discover exactly which three-digit numbers are in S, and then calculate the arithmetic mean (average) of all of them by adding them up and dividing by the number of numbers in S !
I wish you oodles of enjoyment with all the puzzles π, and please do feel free to send me your solutions by email, if you like. π
With kindest wishes as always,
Paul Mπtwani β€οΈ
Paul Motwani 