Applications-of-GeoGebra/C2/Conic-Sections-Parabola/English-timed
From Script | Spoken-Tutorial
Time | Narration |
00:01 | Welcome to this tutorial on Conic Sections Parabola. |
00:06 | In this tutorial, we will learn how to use GeoGebra to: |
00:11 | Study standard equations and parts of a parabola |
00:16 | Construct parabolas. |
00:19 | Here I am using:
Ubuntu Linux Operating System version 14.04, GeoGebra 5.0.388.0 hyphen d |
00:33 | To follow this tutorial, you should have basic knowledge of
GeoGebra interface, Conic sections in geometry |
00:42 | For relevant tutorials, please visit our website. |
00:46 | Parabola
A parabola is the locus of points equidistant from the fixed point called the focus. |
00:57 | The points on the parabola are also equidistant from the fixed line called the directrix. |
01:05 | Observe the different features of the parabola in the image. |
01:10 | The Axis of Symmetry is perpendicular to the Directrix and passes through the Focus and Vertex. |
01:19 | Latus Rectum passes through the Focus and is perpendicular to the Axis of Symmetry. |
01:27 | Let us construct a parabola in GeoGebra. |
01:31 | I have already opened GeoGebra interface. |
01:35 | Click on Point tool and click in Graphics view.
This creates point A. |
01:44 | Right-click on point A and select the Rename option. |
01:49 | In the New Name text box, type Focus instead of A and click OK. |
01:57 | This renames point A as Focus. |
02:01 | Click on Line tool and click on two places in Graphics view, below Focus. |
02:10 | This creates line AB. |
02:14 | Right-click on line AB and choose the Rename option. |
02:20 | In the New Name field, type directrix and click OK. |
02:28 | This renames line AB as the directrix. |
02:33 | Click on Perpendicular Line tool, then click on line AB. |
02:41 | Drag the cursor until the resulting line passes through Focus and click on Focus. |
02:51 | This draws a line perpendicular to line AB, passing through Focus.
|
03:01 | Right-click on this line perpendicular to line AB. |
03:07 | Choose the Rename option. |
03:10 | Type axis of symmetry in New Name field.
Click OK. |
03:19 | Under Ellipse tool, click on Parabola tool. |
03:25 | Then click on Focus and the directrix. |
03:31 | This creates a parabola with its focus at Focus and with line AB as the directrix. |
03:39 | Under Point tool, click on Intersect tool. |
03:44 | Click on the parabola and axis of symmetry. |
03:50 | This creates point C at the intersection. |
03:54 | It is the vertex of the parabola. |
03:58 | Right-click on point C and choose the Rename option. |
04:04 | In the New Name field, type Vertex and click OK. |
04:10 | Click on Perpendicular Line tool and click on the axis of symmetry. |
04:18 | Drag the cursor until the line passes through the Focus and click on it. |
04:24 | This results in a line parallel to the directrix, passing through the Focus. |
04:31 | Under Point tool, click on Intersect tool. |
04:35 | Click on the parabola and the newly drawn line through Focus. |
04:42 | This creates points C and D. |
04:46 | Under Line tool, click on Segment tool and click on points C and D. |
04:55 | Resulting Segment CD is the latus rectum. |
04:59 | Right-click on Segment CD and choose the Rename option. |
05:05 | In the New Name field, type Latus Rectum and click OK. |
05:13 | Move the Latus label so you can see it properly. |
05:18 | Click and drag Graphics view to see the parabola properly. |
05:24 | In Algebra view, you can see the equation describing the parabola. |
05:30 | Drag boundary so you can see the equation properly. |
05:35 | Also, you can see the equations for the axis of symmetry, directrix and latus rectum. |
05:43 | Drag boundary so you can see Graphics view properly again. |
05:49 | Click in Graphics view and drag background. |
05:54 | Under Point tool, click on Intersect tool. |
05:59 | Click on axis of symmetry and directrix. |
06:05 | This creates point E. |
06:08 | Under Angle tool, click on Distance or Length tool. |
06:13 | Click on Focus and Vertex. |
06:18 | Note the distance of FocusVertex appearing in Graphics view. |
06:23 | Click on Vertex and point E. |
06:27 | Note the distance of Vertex E appearing in Graphics view.
Both these distances are equal. |
06:36 | Let us look at the general equations of parabolas. |
06:41 | I have opened a new GeoGebra window. |
06:45 | In input bar, type x minus a in parentheses caret 2 equals 4 space p space y minus b in parentheses. |
07:02 | To type caret symbol, hold Shift key down and press 6. |
07:09 | Note that the spaces denote multiplication.
Press Enter. |
07:16 | Create Sliders window pops up asking if you want to create sliders for a, b and p. |
07:24 | Click on Create Sliders. |
07:27 | Sliders are created for a, p and b. |
07:32 | The default setting for all three coefficients is 1. |
07:36 | A parabola opening upwards appears in Graphics view. |
07:41 | a comma b correspond to the co-ordinates of the vertex. |
07:47 | Double click on the parabola, click on Object Properties and then on Color tab. |
07:56 | Select red and close the Preferences box. |
08:00 | The parabola and its equation appear red in the Graphics and Algebra views. |
08:08 | Move boundary so you can see the equation properly. |
08:13 | Right click on slider a and check Animation On option. |
08:19 | Note the effects on the horizontal movement of the red parabola. |
08:24 | Right-click on slider a and uncheck Animation On option. |
08:30 | Right-click on slider p and check Animation On option. |
08:35 | Note the effects on the shape and orientation of the parabola. |
08:40 | Right-click on slider p and uncheck Animation On option. |
08:46 | Right-click on slider b and check Animation On option. |
08:52 | Note the effects on the vertical movement of the parabola. |
08:57 | Right-click on slider b and uncheck Animation On option. |
09:03 | Note that when a, p and b are equal to 1, the red parabola c is described by equation c. |
09:16 | Click on parabola c in Graphics view and note highlighting of equation c in Algebra view. |
09:25 | Equation c is given by x squared minus 2x minus 4y equals minus 5. |
09:33 | In input bar, type Focus c in parentheses.
Press Enter. |
09:41 | Focus is drawn at point A in Graphics view. |
09:46 | The coordinates of Focus of parabola c, which is point A, appear in Algebra view. |
09:53 | In input bar, type Vertex c in parentheses.
Press Enter. |
10:01 | Vertex is drawn at point B in Graphics view. |
10:05 | The coordinates of Vertex of parabola c, which is point B, appear in Algebra view. |
10:12 | In input bar, type Directrix c in parentheses.
Press Enter. |
10:21 | Directrix appears as a line along x axis in Graphics view. |
10:26 | The equation for the Directrix of parabola c, y equals 0, appears in Algebra view. |
10:34 | Double click on Directrix in Graphics view. |
10:38 | In the Redefine text box, click on Object Properties, then the Color tab. |
10:45 | In the left panel, note that the Directrix is highlighted. |
10:51 | Identify Focus and Vertex created for parabola c. |
10:56 | While pressing the Control key, click and highlight Focus and Vertex. |
11:03 | Click on red. |
11:06 | Close the Preferences box. |
11:09 | For parabola c, Focus, Vertex and Directrix and their coordinates and equation appear red. |
11:19 | Follow the earlier steps to construct parabola d. |
11:24 | Let us summarize. |
11:26 | In this tutorial, we have learnt how to use GeoGebra to:
Study the standard equations and parts of a parabola, Construct parabolas |
11:36 | As an assignment:
Try these steps to construct parabolas with these foci and directrices. |
11:45 | Find their equations. |
11:47 | As an assignment: Find the coordinates of the foci and length of the latus recti for these parabolas. |
11:56 | Also, find the equations of the axes of symmetry and directrices. |
12:03 | The video at the following link summarizes the Spoken Tutorial Project.
Please download and watch it. |
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12:24 | Spoken Tutorial Project is funded by NMEICT, MHRD, Government of India.
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12:37 | This is Vidhya Iyer from IIT Bombay, signing off.
Thank you for joining. |