Here is an isosceles trapezoid, a shape with two parallel sides and the other two sides are equal. I have drawn two lines within the shape to split it into three regions of equal area. What is the overall area of the trapezoid?

I learned the interesting fact the other day that any natural number, however large, can be written as the sum of at most three palindromic numbers. For instance, 7369 = 7227+131+11.

 Can you write the ten digit number 7,275,640,031 as the sum of three palindromic numbers?

 Single digit numbers count as palindromes (eg, 7) but numbers with leading zeroes do not (eg 0330).

In this figure, what is the height of the triangle?

Here is a regular polygon with nine sides. If two of the regions have areas 3 and 2 as shown, what is the area of the third region?

If a person is born at a random point in a 400 year period, roughly what is the probability that their fiftieth birthday will be on the same day of the week as they were born?

(2+1/a)(2+1/b)(2+1/c) = d

 a, b, c and d are all prime numbers, what are they?

This set of equations relates unknowns a, b and c. There are five possible sets of solutions for the values of (a,b,c). Can you find them all?

a*b + c = 12

b*c + a = 12

c*a + b = 12

Seven identical bricks fit exactly in a circle as shown. What is the proportion of the length to the height of each of the bricks?

Three squares of areas 968, 722 and 2888 respectively coincide at one corner as shown.

A circle is drawn through their opposite corners.

What is the area of this circle?

The diagram shows five unit circles, centred on the coordinates (0,0), (1,0), (2,0), (0,1) and (1,1).

The area of each unit circle is pi, which is irrational. The area of each of the 17 regions is also irrational, with the exception of one. Which region has a rational area?

You have a bag that contains fifty pebbles, twenty-five painted white and twenty-five painted black.

You randomly remove two pebbles.

If either of them is white, discard it and put the other pebble (whether it is black or white) back into the bag.

If both are black, discard both of them.

You repeat this process until there is only one pebble in the bag, what is the probability that the final pebble is white?

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?