7.1 Coordinate geometry, equation of tangent, transformations

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Co-ordinate geometry

Equation of a circle

We know that every point on the circumference of a circle is the same distance away from the centre of the circle. Consider a point $(x_{1}, y_{1})$ on the circumference of a circle of radius $r$ with centre at $(x_{0}, y_{0})$ .

In [link] , $▵ O P Q$ is a right-angled triangle. Therefore, from the Theorem of Pythagoras, we know that:

O P^{2} = P Q^{2} + O Q^{2}

But,

\begin{matrix} P Q & = & y_{1} - y_{0} \\ O Q & = & x_{1} - x_{0} \\ O P & = & r \\ ∴ r^{2} & = & {(y_{1} - y_{0})}^{2} + {(x_{1} - x_{0})}^{2} \end{matrix}

But, this same relation holds for any point $P$ on the circumference. In fact, the relation holds for all points $P$ on the circumference. Therefore, we can write:

{(x - x_{0})}^{2} + {(y - y_{0})}^{2} = r^{2}

for a circle with centre at $(x_{0}, y_{0})$ and radius $r$ .

For example, the equation of a circle with centre $(0, 0)$ and radius 4 is:

\begin{matrix} {(y - y_{0})}^{2} + {(x - x_{0})}^{2} & = & r^{2} \\ {(y - 0)}^{2} + {(x - 0)}^{2} & = & 4^{2} \\ y^{2} + x^{2} & = & 16 \end{matrix}

Khan academy video on circles - 1

Find the equation of a circle (centre $O$ ) with a diameter between two points, $P$ at $(- 5, 5)$ and $Q$ at $(5, - 5)$ .

Draw a picture
Draw a picture of the situation to help you figure out what needs to be done.
Find the centre of the circle
We know that the centre of a circle lies on the midpoint of a diameter. Therefore the co-ordinates of the centre of the circle is found by finding the midpoint of the line between $P$ and $Q$ . Let the co-ordinates of the centre of the circle be $(x_{0}, y_{0})$ , let the co-ordinates of $P$ be $(x_{1}, y_{1})$ and let the co-ordinates of $Q$ be $(x_{2}, y_{2})$ . Then, the co-ordinates of the midpoint are:

$\begin{matrix} x_{0} & = & \frac{x_{1} + x_{2}}{2} \\ = & \frac{- 5 + 5}{2} \\ = & 0 \\ y_{0} & = & \frac{y_{1} + y_{2}}{2} \\ = & \frac{5 + (- 5)}{2} \\ = & 0 \end{matrix}$

The centre point of line $P Q$ and therefore the centre of the circle is at $(0, 0)$ .
Find the radius of the circle
If $P$ and $Q$ are two points on a diameter, then the radius is half the distance between them.

The distance between the two points is:

$\begin{matrix} r = \frac{1}{2} P Q & = & \frac{1}{2} \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}} \\ = & \frac{1}{2} \sqrt{{(5 - (- 5))}^{2} + {(- 5 - 5)}^{2}} \\ = & \frac{1}{2} \sqrt{{(10)}^{2} + {(- 10)}^{2}} \\ = & \frac{1}{2} \sqrt{100 + 100} \\ = & \sqrt{\frac{200}{4}} \\ = & \sqrt{50} \end{matrix}$
Write the equation of the circle
$x^{2} + y^{2} = 50$

Find the center and radius of the circle

$x^{2} - 14 x + y^{2} + 4 y = - 28$ .

Change to standard form
We need to rewrite the equation in the form $(x - x_{0}) + (y - y_{0}) = r^{2}$

To do this we need to complete the square

i.e. add and subtract $(\frac{1}{2}$ cooefficient of ${x)}^{2}$ and $(\frac{1}{2}$ cooefficient of ${y)}^{2}$
Adding cooefficients
$\begin{matrix} x^{2} - 14 x + y^{2} + 4 y & = & - 28 \\ ∴ x^{2} - 14 x + {(7)}^{2} - {(7)}^{2} + y^{2} + 4 y + {(2)}^{2} - {(2)}^{2} & = & - 28 \end{matrix}$
Complete the squares
$∴ {(x - 7)}^{2} - {(7)}^{2} + {(y + 2)}^{2} - {(2)}^{2} = - 28$
Take the constants to the other side
$\begin{matrix} ∴ {(x - 7)}^{2} - 49 + {(y + 2)}^{2} - 4 & = & - 28 \\ ∴ {(x - 7)}^{2} + {(y + 2)}^{2} & = & - 28 + 49 + 4 \\ ∴ {(x - 7)}^{2} + {(y + 2)}^{2} & = & 25 \end{matrix}$
Read the values from the equation
$∴ center is (7; - 2) and the radius is 5 units$

Equation of a tangent to a circle at a point on the circle

We are given that a tangent to a circle is drawn through a point $P$ with co-ordinates $(x_{1}, y_{1})$ . In this section, we find out how to determine the equation of that tangent.

We start by making a list of what we know:

We know that the equation of the circle with centre $(x_{0}, y_{0})$ and radius $r$ is ${(x - x_{0})}^{2} + {(y - y_{0})}^{2} = r^{2}$ .
We know that a tangent is perpendicular to the radius, drawn at the point of contact with the circle.

As we have seen in earlier grades, there are two steps to determining the equation of a straight line:

Calculate the gradient of the line, $m$ .
Calculate the $y$ -intercept of the line, $c$ .

The same method is used to determine the equation of the tangent. First we need to find the gradient of the tangent. We do this by finding the gradient of the line that passes through the centre of the circle and point $P$ (line $f$ in [link] ), because this line is a radius line and the tangent is perpendicular to it.

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Source: OpenStax, Siyavula textbooks: grade 12 maths. OpenStax CNX. Aug 03, 2011 Download for free at http://cnx.org/content/col11242/1.2

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