A Pythagorean triangle can never have a 22.5 degree angle, since tan(22.5) is 1-sqrt(2) which is irrational, however a 5,12,13 triangle comes very close. (It isn’t surpassed in accuracy until it is marginally improved in a triangle whose shortest side is 3648).

If three triangles with sides in the ratio 5,12,13 are placed with their smallest angles together as shown, what Pythagorean triangle has the necessary angle to complete the right angle?

If each of the line segments in this figure are integers, what is the length of the red line?

a, b and c are each real numbers between 0 and 1.

I have a number ‘a’ and I want to find an exact expression for it.

I take the reciprocal and get that 1/a = 1+b.

I subtract the 1 and take the reciprocal. I find that 1/b = 3+c.

I subtract the 3 and take the reciprocal. I discover that 1/c = 4+b.

What is the exact value of a?

In this figure the two horizontal lines are parallel. The area of four of the regions is given, what is the unknown area?

What is the angle x in this figure?

A series of self-driving cars are driving along a road such that the distance between the cars is precisely the minimum recommended according to the formula:

Overall stopping distance (ft) = (Speed(mph)^2)/20 + Speed(mph)/2

So that at, for instance, at 40mph, the distance would be (40^2)/20 + 40/2 which is 100ft.

For simplicity let’s ignore the length of the cars themselves.

Two lanes that are each travelling at 60mph merge into a single lane. What speed will the cars in the merged lane be travelling at?

There are 108 possible arrangements of the digits 1-8 such that the number formed by the first two digits is divisible by 3, the third & fourth digits divisible by 4, the fifth and sixth digits divisible by 5, and the seventh and eighth digits divisible by 6.

For example 42763518: 42 = 3x14; 76=4x19; 35=5x7; 18=6x3.

Now if I were to add together those multipliers 14, 19, 7 and 3 I would get a ‘score’ for 42763518 of 43. I did the same for all 80 possible arrangements and found the maximum possible score was 62 and the minimum was 28.

What were the arrangements that led to those scores?

I have a number N that is simultaneously equal to 8^(x-1) and 4^(x+2).

What is the value of N?

When one solver (Roger) asked this week how I came up with the puzzle about the recurrence sequence my surprising answer was that it emerged from investigations into the semicircles-in-a-segment puzzle from the week before.

Here I unite the two.

Start with a sequence where after an initial fair of 1s each term is 4x the previous term minus the term before: 1,1,3,11,41,etc.

A second sequence is the product of pairs of consecutive terms in that sequence: 1,3,33,451,etc.

Finally form a series of semicircles whose radii are the reciprocals of the numbers in the product sequence, then place them in a segment of a circle such that the diameters of the semicircles lie on the chord of the segment.

What is the radius and central angle of the segment that exactly fits all of those semicircles?

A sequence starts 1,3,21 and then every subsequent term is 5 times the sum of the previous two terms, less the term before that, so that the fourth term is 5*(21+3)-1 = 119, and the fifth term is 5*(119+21)-3 = 697, etc. The sequence continues:

1,3,21,119,697,4059,23661,137903,803761,4684659…

None of those numbers after 3 is prime.

In fact I know for certain that 3 is the only prime number in this sequence and that each of the infinity of subsequent terms is composite.

How can I possibly know that?

In this figure, an equilateral triangle is drawn within a unit radius circle. In one of the resulting segments, two identical semicircles are drawn. Finally a circle is drawn tangent to the two semicircles and the large circle.

What is the radius of this small circle?

These words have been grouped into three sets of three words according to some property.

The fact that there are three sets is a big clue. What is that property and why would trying the same thing with only two sets of words be practically impossible?

PYJAMAS

MAYDAY

SAVVY

BETWEEN

WHEEZE

TENTH

COLOURFUL

CRUCIFIX

FLOOR

If it is possible to pack 7 of these L shaped triominoes inside a circle that is inscribed in a square, how many of those same L-triominoes could you pack into the square?

ABCDE x F = EDCBA

 A, B, C, D, E and F are all different digits, what are they?

In this figure, the red shapes and the partially obscured blue shape are all squares. The partially obscured green shape is a rectangle.

What are the relative areas of the visible red, blue and green regions?

Four isosceles triangles are drawn next to one another with collinear bases with length 18, 23, 27 and 38 respectively. Above these a couple of rows of rhombuses and a square are drawn.

What is the area of the square?