A line that cuts a circle at two distinct points is called a secant.The word ‘diameter’ is use to refer both to these intervals and to their common length. Since a diameter consists of two radii joined at their endpoints, every diameter has length equal to twice the radius. A chord that passes through the centre is called a diameter.An interval joining two points on the circle is called a chord.Notice that the word ‘radius’ is being used to refer both to these intervals and to the common length of these intervals. By the definition of a circle, any two radii have the same length. Any interval joining a point on the circle to the centre is called a radius.A circle is the set of all points in the plane that are a fixed distance ( the radius) from a fixed point ( the centre). Throughout this module, all geometry is assumed to be within a fixed plane. We begin by recapitulating the definition of a circle and the terminology used for circles. Spheres and cylinders are the first approximation of the shape of planets and stars, of the trunks of trees, of an exploding fireball, and of a drop of water, and of manufactured objects such as wires, pipes, ball-bearings, balloons, pies and wheels. Circles are the first approximation to the orbits of planets and of their moons, to the movement of electrons in an atom, to the motion of a vehicle around a curve in the road, and to the shapes of cyclones and galaxies. The theoretical importance of circles is reflected in the amazing number and variety of situations in science where circles are used to model physical phenomena. Students traditionally learn a greater respect and appreciation of the methods of mathematics from their study of this imaginative geometric material. The logic becomes more involved − division into cases is often required, and results from different parts of previous geometry modules are often brought together within the one proof. They clearly need to be proven carefully, and the cleverness of the methods of proof developed in earlier modules is clearly displayed in this module. The theorems of circle geometry are not intuitively obvious to the student, in fact most people are quite surprised by the results when they first see them. Tangents are introduced in this module, and later tangents become the basis of differentiation in calculus. Lines and circles are the most elementary figures of geometry − a line is the locus of a point moving in a constant direction, and a circle is the locus of a point moving at a constant distance from some fixed point − and all our constructions are done by drawing lines with a straight edge and circles with compasses. On each proof page is a link to a downloadable pdf version.Most geometry so far has involved triangles and quadrilaterals, which are formed by intervals on lines, and we turn now to the geometry of circles. Eighth circle theorem - perpendicular from the centre bisects the chord.Seventh circle theorem - alternate segment theorem.Sixth circle theorem - angle between circle tangent and radius.Fifth circle theorem - length of tangents.Fourth circle theorem - angles in a cyclic quadlateral.Second circle theorem - angle in a semicircle.Third circle theorem - angles in the same segment.First circle theorem - angles at the centre and at the circumference.Now, having got by with seven theorems and no proofs since 2007, I've looked at part of the AQA specification and noticed they have eight theorems and five proofs, so I've updated the site accordingly. Geogebra is a free dynamic geometry package, which readily lends itself to this sort of activity. pdf file hereīut try out the dynamic geometry pages first - you can move points around and see what happens! There is a summary of all the theorems here and if you want a hard-copy version, you can download a. I've also done proofs for five of the theorems, and activities (which involve paper, pencil &/or scissors) for two of them. You can use them to work out what the theorems are. These pages have a page with a dynamic geometry window for each of the eight theorems. Embeding Geogebra: Embed Geogebra applet into html webpage
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