One side of a triangle is divided into segments of length a and b by the inscribed circle, with radius r. Prove that the area is: abr(a+b)/ab-r^2
Three squares are drawn on the sides of a triangle ABC. Their areas are respectively 18 000, 20 000 and 26 000 square centimetres. If the outer vertices of the squares are joined, three more. . . .
Draw three equal line segments in a unit circle to divide the circle into four parts of equal area.
Can you prove this formula for finding the area of a quadrilateral from its diagonals?
Six circular discs are packed in different-shaped boxes so that the discs touch their neighbours and the sides of the box. Can you put the boxes in order according to the areas of their bases?
The area of a square inscribed in a circle with a unit radius is, satisfyingly, 2. What is the area of a regular hexagon inscribed in a circle with a unit radius?
A belt of thin wire, length L, binds together two cylindrical welding rods, whose radii are R and r, by passing all the way around them both. Find L in terms of R and r.
Follow instructions to fold sheets of A4 paper into pentagons and assemble them to form a dodecahedron. Calculate the error in the angle of the not perfectly regular pentagons you make.
Can you deduce the familiar properties of the sine and cosine functions starting from these three different mathematical representations?
It is obvious that we can fit four circles of diameter 1 unit in a square of side 2 without overlapping. What is the smallest square into which we can fit 3 circles of diameter 1 unit?
Ten squares form regular rings either with adjacent or opposite vertices touching. Calculate the inner and outer radii of the rings that surround the squares.
Straight lines are drawn from each corner of a square to the mid points of the opposite sides. Express the area of the octagon that is formed at the centre as a fraction of the area of the square.
What are the shortest distances between the centres of opposite faces of a regular solid dodecahedron on the surface and through the middle of the dodecahedron?
A dot starts at the point (1,0) and turns anticlockwise. Can you estimate the height of the dot after it has turned through 45 degrees? Can you calculate its height?
The sides of a triangle are 25, 39 and 40 units of length. Find the diameter of the circumscribed circle.
Two places are diametrically opposite each other on the same line of latitude. Compare the distances between them travelling along the line of latitude and travelling over the nearest pole.
What does Pythagoras' Theorem tell you about these angles: 90°, (45+x)° and (45-x)° in a triangle?
On a nine-point pegboard a band is stretched over 4 pegs in a "figure of 8" arrangement. How many different "figure of 8" arrangements can be made ?
From the measurements and the clue given find the area of the square that is not covered by the triangle and the circle.
Re-arrange the pieces of the puzzle to form a rectangle and then to form an equilateral triangle. Calculate the angles and lengths.
The first of three articles on the History of Trigonometry. This takes us from the Egyptians to early work on trigonometry in China.
Join some regular octahedra, face touching face and one vertex of each meeting at a point. How many octahedra can you fit around this point?
Prove that the shaded area of the semicircle is equal to the area of the inner circle.
Describe how to construct three circles which have areas in the ratio 1:2:3.
Can you explain what is happening and account for the values being displayed?
How can you represent the curvature of a cylinder on a flat piece of paper?
Trigonometry, circles and triangles combine in this short challenge.
The third of three articles on the History of Trigonometry.
The sine of an angle is equal to the cosine of its complement. Can you explain why and does this rule extend beyond angles of 90 degrees?
What angle is needed for a ball to do a circuit of the billiard table and then pass through its original position?
If you were to set the X weight to 2 what do you think the angle might be?
If a is the radius of the axle, b the radius of each ball-bearing, and c the radius of the hub, why does the number of ball bearings n determine the ratio c/a? Find a formula for c/a in terms of n.
Use simple trigonometry to calculate the distance along the flight path from London to Sydney.
How far should the roof overhang to shade windows from the mid-day sun?
A moveable screen slides along a mirrored corridor towards a centrally placed light source. A ray of light from that source is directed towards a wall of the corridor, which it strikes at 45 degrees. . . .
Prove Pythagoras' Theorem for right-angled spherical triangles.
The length AM can be calculated using trigonometry in two different ways. Create this pair of equivalent calculations for different peg boards, notice a general result, and account for it.
Find the exact values of some trig. ratios from this rectangle in which a cyclic quadrilateral cuts off four right angled triangles.
The Earth is further from the Sun than Venus, but how much further? Twice as far? Ten times?
In this problem we are faced with an apparently easy area problem, but it has gone horribly wrong! What happened?
An observer is on top of a lighthouse. How far from the foot of the lighthouse is the horizon that the observer can see?
The area of a regular pentagon looks about twice as a big as the pentangle star drawn within it. Is it?
An environment that simulates a protractor carrying a right- angled triangle of unit hypotenuse.
Without using a calculator, computer or tables find the exact values of cos36cos72 and also cos36 - cos72.
Two perpendicular lines lie across each other and the end points are joined to form a quadrilateral. Eight ratios are defined, three are given but five need to be found.
This problem in geometry has been solved in no less than EIGHT ways by a pair of students. How would you solve it? How many of their solutions can you follow? How are they the same or different?. . . .
The second of three articles on the History of Trigonometry.
Three points A, B and C lie in this order on a line, and P is any point in the plane. Use the Cosine Rule to prove the following statement.
There are many different methods to solve this geometrical problem - how many can you find?
How would you design the tiering of seats in a stadium so that all spectators have a good view?