Difference between revisions of "Geogebra/C3/Theorems-on-Chords-and-Arcs/English-timed"

||Hello,Welcome to this  tutorial on '''Theorems on Chords and Arcs in Geogebra'''

||you will be able to  verify theorems on  

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

||If not, For relevant tutorials, please visit our website:  http://spoken-tutorial.org

||To record this tutorial I am using   

||Ubuntu Linux OS Version  11.10   

||Geogebra Version 3.2.47.0  

||We will use the following Geogebra tools   

||Perpendicular line  

||Click on  Dash home,  Media Apps.

||Under Type Choose Education and  GeoGebra.

||Let's state a  theorem

||   '''Perpendicular from center of  circle to a chord bisects the chord'''

||'''Perpendicular from the center A   of a circle to chord BC bisects it'''

||Let's verify a theorem.

||For this tutorial I will use '''Grid layout''' instead of Axes

||Right Click on the drawing pad  

||In the '''Graphic view''' uncheck '''Axes'''  

||Select '''Grid'''

||Mark a point '''A''' on the drawing pad.

||A dialogue box   opens

||Let's type value '''3''' for radius  

||A Circle with center '''A''' and radius '''3cm''' is drawn

||Let's Move the  point '''A''' and  see the movement of the circle.

||Mark points '''B'''  and '''C'''  on the circumference of the circle  

||Let's draw a  perpendicular line to Chord '''BC''' which passes through point '''A'''

||Click on  '''Perpendicular line'''  tool from tool bar

||Click on  the chord  '''BC''', and point '''A'''.

||Let's Move the  point '''B''', and see how the perpendicular line moves along with point 'B'.

||Perpendicular line and Chord '''BC''' intersect at a point  

||Click on '''Intersect Two objects'''  tool,

 

||Let's verify whether '''D''' is the mid point of chord '''BC'''

||Click on the points ,'''B''' '''D''' ...'''D''' '''C''' ...

||Let's measure the angle '''CDA'''  

||Click on Angle tool ...

||Click on the points '''C''','''D''', '''A'''  

||  angle '''CDA''' is '90 degrees

|| The Theorem is verified.

||Let's Move the point  '''C'''  and see how the distances move along with point 'C'

||Let us save the file now

||Click on  '''File'''>> '''Save As'''

||I will type the file name as '''circle-chord'''  

||'''circle-chord'''

|| Click on '''Save'''

||'''Inscribed angles subtended by the same arc are equal.'''    

||'''Inscribed angles BDC and BEC subtended by the same arc BC are equal'''   

||Let'sOpen a new Geogebra window,

||Click on '''File''' >> '''New'''

||Let's draw a circle

||Click on '''the Circle with Center through Point''' tool from toolbar

||Mark a point '''A''' as centre  

|| and click again to get point '''B'''  

||Let's draw an arc '''BC'''

||Click on "'''Circular Arc with Center between Two points"'''

||Click on the point '''A''', '''B''' and '''C''' on the circumference  

||An Arc '''BC''' is drawn  

||Let's change the  properties of arc '''BC'''

||In the '''Algebra View'''  

||Right click on the object '''d'''

||Select  '''Object Properties'''

||Select color as '''green''',  click on '''Close.'''

|| Click on '''new point tool''', mark points  '''D''' and '''E''' on the circumference of the circle.

||let's subtend two angles from arc BC to points  '''D''' and '''E'''.

||click on the  points  '''E''', '''B''', '''D''', '''C''' and '''E'''  again to complete the figure.

||Let's measure the angles  '''BDC'''  and '''BEC'''  

||Click  on points  '''B''', '''D''', '''C''' and    '''B''', '''E''', '''C'''

||Let's state a next theorem

||'''Angle subtended by an arc at the center, is twice the inscribed angles subtended by the same arc'''    

||'''Angle BAC subtended by arc BC at A is twice the inscribed angles BEC and BDC subtended by the same  arc'''

||Let's verify the theorem

||Let's draw a sector '''ABC'''

||click on the  points '''A''', '''B''', '''C'''

||Let's change the color of   sector '''ABC'''.

||Right click on sector '''ABC'''

||Let's the measure angle '''BAC'''

||Click on  the '''Angle''' tool , Click on the points '''B''', '''A''', '''C'''

||Angle  '''BAC''' is twice the angles  '''BEC''' and '''BDC'''

||Let's move the point '''C'''

||Notice that  angle  '''BAC''' is always twice the angles  '''BEC''' and '''BDC'''

||hence theorems  are verified

||With this we come to the end of this tutorial  

||let's summarize

||*  Perpendicular   from center to a  chord bisects it  

||* the Central angle of a circle is twice any inscribed angle subtended by the same arc

|| As an assignment  I would like you to verify  

||Select Segment with Given length from point tool  

||Assignment  output should look like this

||It summarises the Spoken Tutorial project  

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||This is Madhuri Ganapathi from IIT Bombay signing off .Thank you  for joining