Geogebra/C3/Tangents-to-a-circle/English

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Title of script: Tangents to a circle in Geogebra.

Author: Neeta Sawant

Keywords: video tutorial

Click here for Slides

Note to Translators - Translators do no translate theorems , please refer to standard mathematics text books of classes IX and X of your language for the original version of the theorems.


Visual Cue Narration
Slide Number 1 Hello everybody.

Welcome to this tutorial on "Tangents to a circle in Geogebra".

Slide Number 2 Learning Objectives

At the end of this tutorial you will be able to

  • Draw tangents to a circle
  • Understand the properties of Tangents
Slide Number 3

Pre-requisites

We assume that you have the basic working knowledge of Geogebra.

If not,

For relevant tutorials on Geogebra,

Please visit our website

http://spoken-tutorial.org

Slide Number 4

System Requirement

To record this tutorial I am using

Ubuntu Linux OS Version 11.10

Geogebra Version 3.2.47.0

Slide Number 5

GeoGebra Tools used

We will use the following Geogebra tools
  • Tangents
  • Perpendicular Bisector
  • Intersect two Objects
  • Compass
  • Polygon
  • Circle with Center and Radius
Switch to GeoGebra window

Dash home >>Media Apps>>Under Type >>Education>>Geogebra

Let's open a new GeoGebra window.

Click on Dash home Media Apps. Under Type Choose Education and GeoGebra.

Let's draw Tangents to a circle

let's define tangents to a circle

Slide 6

Definition of a tangent

Show the finished figure

Tangent is a line that touches a circle at only one point

The point of contact is called "point of tangency"

Right Click on the drawing pad >>

Graphic view box opens>> un-check on Axes>>Select Grid

For this tutorial I will use "Grid" instead of "Axes"

Right Click on the drawing pad

In the "Graphic view"

uncheck "Axes"

Select "Grid"

Select “Circle with Center and Radius” tool>>Mark point 'A' First let's draw a circle.

Select “Circle with Center and Radius” tool

Mark a point 'A' on the drawing pad

A dialogue box opens A dialogue box opens.
Type value '3' for radius

Click OK

Visually show that you can move point 'A', but the circle remains of the same radius.

Let's type value '3' for radius

Click OK

A circle with centre 'A' and radius '3' cm is drawn.

Let's 'Move' the point 'A' and see that circle has same radius

Click on "New point" tool >> Mark point 'B' Click on "New point" tool

Mark a point 'B' outside the circle

"Select Segment between two points" tool>> join points 'A' and 'B' "Select Segment between two points" tool.

Join points 'A' and 'B'. Segment AB is drawn

Select "Perpendicular Bisector" Tool >> Point A >> point B

Move the point B and show how the perpendicular bisector moves along with B.

Select "Perpendicular Bisector" tool

Mark points 'A' and then 'B'

A perpendicular bisector is drawn

Let's Move the point 'B' and see how the 'perpendicular bisector' moves along with 'B'.

Click on "Intersect two objects" tool>>Point C

Again, move point 'B', and show that 'C' moves accordingly.

Segment 'AB' and Perpendicular bisector intersect at a point

Click on "Intersect two objects" tool

Mark point of intersection as 'C'

Let's Move point 'B', and see how point 'C' moves along with 'B'

Click on "Distance" tool>>click on points 'A' and 'B'


How to verify whether 'C' is the midpoint of 'AB'?

Click on "Distance" tool. click on points 'A' , 'C'. and 'C' ,'B'

Notice that 'AC' = 'CB'

Select "Compass" tool from tool bar>> Point 'C'>>Point 'B'>>Point 'C' Select "Compass" tool from tool bar.

Click on points 'C', 'B'. and 'C' once again... to complete the figure.

Click on "Intersect two objects" tool>>Point 'D'>> Point 'E'

Point to the two points of intersection

Two circles intersect at two points

Click on "Intersect two objects" tool Mark the points of intersection as 'D' and 'E'

Select "Segment between two points" tool>>Join 'B' and 'D' >>join B' and 'E' Select "Segment between two points" tool

Join points 'B' and 'D'. 'B' and 'E' .

Point to the circle 'c' Can you see that the Segements 'BD' and 'BE' are tangents to the circle 'c'?
Now, let's explore some of the properties of these Tangents to the circle
Click "Segment between two points" tool>> join 'AD'>>join 'AE' Select "Segment between two points" tool

join points 'A', 'D' and 'A', 'E' Segment 'AD'=Segment 'AE' (radii of circle 'c').

outline the triangles 'ABD' and 'ABE'.

Point to Segments 'AD' and 'AE'


In triangles 'ABD' and 'ABE'

Segment 'AD'= segment 'AE'

Let's check from Algebra view

Point to angles 'ADB' and 'BEA'

Outine the semicircle 'd'.

'∠ADB'= '∠BEA' = '90°' (angle of the semicircle of circle 'd')

Lets check with "Angle" tool

Click "Angle" tool>>click on points >> ADB and BEA Click on the "Angle" tool...

Click on the points 'A', 'D', 'B' and 'B', 'E', 'A'

Point to segment 'AB'

Outline the two triangles

Segment 'AB' is common side for both the triangles

therefore '△ABD' '≅' '△ABE' by "SAS rule of conguency"

Point to tangents 'BD' and 'BE' It implies that Tangents 'BD' and 'BE' are equal!
point to the Algebra view From the Algebra view,

we can find that the tangents 'BD' and 'BE' are equal

Point to the Angle,Radius, Tangent Please Notice

A tangent is always at right angles to the radius of the circle where it touches

Let us save this file now

Click on “File”>> "Save As"

I will type the file name as "Tangent-circle" Click on "Save"

Let us save this file now

Click on “File”>> "Save As"

I will type the file name as "Tangent-circle" Click on "Save"

Let's state a theorem
Slide 7

Theorem

"Angle between tangent and chord at the point of tangency, is same as an inscribed angle subtended by the same chord".
Let's verify the theorem
Click on “File” >> New Let's open a new Geogebra window.

click on “File” >> "New"

Select "Circle with center through point" tool>>point 'A' >> point 'B' Click on "Circle with center through point" tool.

Click on point 'A' as center, then on point 'B'.

Click on "New point" tool >> point 'C'>>Point 'D' Click on "New point" tool.

Mark points 'C' on circumference of the circle and point 'D' outside the circle.

Click "Tangents" tool >>point D>> circumference Click on "Tangents" tool.

click on point 'D'... and circumference.

Two Tangents are drawn to the circle.

Point to 'E' and 'F'

Click on "Intersect two objects" tool>>Mark points of intersection

The tangents intersect at two points on the circle.

Click on "Intersect two objects" tool Mark points of intersection as 'E' and 'F'.

Click on "Polygon" tool>>Click on point B>> point C>>point F>>point B again to complete the figure Let's draw a triangle.

Click on the "Polygon" tool.

Click on the points 'B' 'C' 'F' and 'B' once again to complete the figure

Point to the segment 'BF' In the figure segment 'BF' is the chord to the circle 'c'
Point to '∠FCB' and the chord '∠FCB' is the inscribed angle by the chord to the circle 'c'
Point '∠DFB' and tangent '∠DFB' is angle subtended by the tangent.and chord to the circle
Click on "Angle" tool >> Point 'F' 'C' 'B' >> ' point D' 'F' 'B' Lets Measure angles

Click on "Angle" tool click on the points 'F' 'C' 'B' and 'D' 'F' 'B'

Show the angles Notice that '∠FCB' = '∠DFB'
Hence the theorem is verified
Click on “File”>> "Save As"

I will type the file name as "Tangent-angle" Click on "Save"

Let us save this file now

Click on “File”>> "Save As"

I will type the file name as "Tangent-angle" Click on "Save"

With this we come to the end of this tutorial.

Summary Let's summarize

In this tutorial, we have learnt to verify that

"Two tangents drawn from an external point are equal"

"Angle between a tangent and radius of a circle is 90^0"

"Angle between tangent and a chord is equal to inscribed angle subtended by the chord "

Assignment As an assignment I would like you to verify:

"Angle between tangents drawn from an external point to a circle, is supplementary to the angle subtended by the line-segment joining the points of contact at the centre".

To verify the theorem

Draw a circle

Draw tangents from an external point

Mark points of intersection of the tangents

Join center of circle to intersection points

Measure angle at the center, and

Measure angle between the tangents

What is the sum of the two angles?

Join center and external point

Does the line-segment bisect angle at the center?

Hint - Use Angle Bisector tool

Show the output of the Assignment The output of the assignment should look like this

Sum of the angles =180^0. The line bisects the angle

Slide number 8

Acknowledgement

Watch the video available at

http://spoken-tutorial.org/What is a Spoken Tutorial

It summarises the Spoken Tutorial project

If you do not have good bandwidth,

you can download and watch it

Slide Nubmber 9 The Spoken Tutorial Project Team :

Conducts workshops using spoken tutorials

Gives certificates to those who pass an online test

For more details, please write to

contact@spoken-tutorial.org

Slide number 10 Spoken Tutorial Project is a part of the Talk to a Teacher project

It is supported by the National Mission on Education through ICT, MHRD, Government of India

More information on this Mission is available at ttp://spoken-tutorial.org/NMEICT-Intro ]

Script – contributed by Neeta Sawant from SNDT Mumbai

Naration- Madhuri Ganpathi from IIT Mumbai

Thank you for joining

Contributors and Content Editors

Chandrika, Madhurig, PoojaMoolya