Coordinate Geometry

Straight line graphs

In order to understand coordinate geometry, we will look at straight line graphs in a lot of detail, starting with calculating gradients and intercepts. Then we will move on to parallel and perpendicular lines. Finally, we will start modeling using straight line graphs.

Here's is an example of a question involving straight line graphs. This question will require calculating the gradient.

Circles

Circles are an important part of coordinate geometry. We can use information about circles along with other theories of coordinate geometry to solve more complicated problems.

Parametric equations

Parametric equations represent everything in terms of one variable. The variable normally used is t.

This is because there are a lot of more complicated equations where it is better to represent each x and y in terms of the same variable.

Here's an example of a set of parametric equations.

This is the parameterization of a circle as:

\(x^2+y^2 = (2\cos(t))^2 + (2\sin(t))^2 = 4 \cos^2(t) + 4 \sin^2(t) = 4(\sin^2(t) + \cos^2(t)) = 4(1)= 4\)

Below is an example of a parametric equations question.

A curve C contains the following parametric equations.

1. Prove that \(x + y = 2\sqrt3 \cos(t)\)

2. Show that the Cartesian equation of C is \((x+y)^2 +ay^2 = b\) where a and b are constants to be found.

SOLUTION:

1. Well \(x+y = 4\cos(t+\frac{\pi}{6}) + 2\sin t\).

By addition formula

\(4 \cos(t+\frac{\pi}{6}) = 4\cos(t)\cos(\frac{\pi}{6})-4\sin(t)\sin(\frac{\pi}{6})4\cos(t + \frac{\pi}{6}) = 4\frac{\sqrt3}{2} \cos(t) 2\sin(t) 4\cos(t+\frac{\pi}{6}) = 2\sqrt{3} \cos(t) -2\sin(t)4\cos(t+\frac{\pi}{6}) +2\sin(t) = 2\sqrt3 \cos(t) - 2\sin(t)+2\sin(t) = 2 \sqrt3 \cos(t)\)

2.

\((x+y)^2 = (2\sqrt3 \cos(t))^2 = 12 \cos^2{t}y^2 = 4\sin^2{t} 12\cos^2{t}+4a(\sin^2{t}) = b\)

By \(\sin^2{t} + \cos^2{t} = 1\):

\(12\cos^2{t}+12\sin^2{t} = 124a = 12 \rightarrow a = 3b =12\)