Difference between revisions of "PhET/C2/Equation-Grapher/English"

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(Created page with " {|border=1 | | '''Visual Cue''' | | '''Narration''' |- | | '''Slide Number 1''' '''Title Slide''' | | Welcome to this tutorial on ''' Equation Grapher'''. |- | | '''Slide N...")
 
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{|border=1
 
{|border=1
| | '''Visual Cue'''
+
|| '''Visual Cue'''
| | '''Narration'''
+
|| '''Narration'''
  
 
|-
 
|-
| | '''Slide Number 1'''
+
|| '''Slide Number 1'''
  
 
'''Title Slide'''
 
'''Title Slide'''
| | Welcome to this tutorial on ''' Equation Grapher'''.
+
|| Welcome to this tutorial on ''' Equation Grapher'''.
 
|-
 
|-
| | '''Slide Number 2'''
+
|| '''Slide Number 2'''
  
 
'''Learning Objectives'''
 
'''Learning Objectives'''
  
We will demonstrate '''PhET simulation,'''
+
We will demonstrate '''PhET simulation''',
  
 
'''Equation Grapher'''
 
'''Equation Grapher'''
| | In this tutorial, we will demonstrate '''Equation Grapher PhET simulation'''.
+
|| In this tutorial, we will demonstrate '''Equation Grapher PhET simulation'''.
 
|-
 
|-
| | '''Slide Number 3'''
+
|| '''Slide Number 3'''
  
 
'''System Requirements'''
 
'''System Requirements'''
Line 28: Line 27:
  
 
'''Firefox Web Browser''' 60.0.2
 
'''Firefox Web Browser''' 60.0.2
| | Here I am using,
+
|| Here I am using,
  
 
'''Ubuntu Linux OS''' version 16.04
 
'''Ubuntu Linux OS''' version 16.04
Line 36: Line 35:
 
'''Firefox Web Browser''' version 60.0.2
 
'''Firefox Web Browser''' version 60.0.2
 
|-
 
|-
| | '''Slide Number 4'''
+
|| '''Slide Number 4'''
  
 
'''Pre-requisites'''
 
'''Pre-requisites'''
| | Learner should be familiar with topics in high school mathematics.
+
|| Learner should be familiar with topics in high school mathematics.
 
|-
 
|-
| | '''Slide Number 5'''
+
|| '''Slide Number 5'''
  
 
'''Learning Goals'''
 
'''Learning Goals'''
Line 47: Line 46:
 
Lines '''y = bx + c''' and '''y = c'''
 
Lines '''y = bx + c''' and '''y = c'''
  
'''Quadratic polynomials''' '''y = ax<sup>2</sup> + bx + c'''
+
'''Quadratic polynomials''' '''y = ax<sup>2</sup> + bx + c'''.
 
+
 
+
  
| | Using this '''simulation''' we will look at,
+
|| Using this '''simulation''' we will look at,
  
 
Lines of the form '''y = bx + c''' and '''y = c'''
 
Lines of the form '''y = bx + c''' and '''y = c'''
Line 57: Line 54:
 
'''Quadratic polynomials''' '''y equals ax squared plus bx plus c'''
 
'''Quadratic polynomials''' '''y equals ax squared plus bx plus c'''
 
|-
 
|-
| | '''Slide Number 6'''
+
|| '''Slide Number 6'''
  
 
'''Binomial Theorem'''
 
'''Binomial Theorem'''
  
'''Binomial theorem''' states that if ''a, b'' ∈ ℝ, index ''n'' is a positive '''integer''', ''0 ≤ r ≤n, then,''
+
'''Binomial theorem''' states that if ''a, b'' ∈ ℝ, index ''n'' is a positive integer, ''0 ≤ r ≤n, then,''
  
 
''(a + b)<sup>n</sup> <nowiki>= </nowiki><sup>n</sup>C<sub>0</sub> a<sup>n</sup> + <sup>n</sup>C<sub>1</sub> a<sup>n-1 </sup>b<sup>1</sup> + <sup>n</sup>C<sub>2</sub> a<sup>n-2 </sup>b<sup>2</sup> + … + <sup>n</sup>C<sub>r</sub> a<sup>n-r </sup>b<sup>r</sup> + … + <sup>n</sup>C<sub>n</sub> b<sup>n''</sup>
 
''(a + b)<sup>n</sup> <nowiki>= </nowiki><sup>n</sup>C<sub>0</sub> a<sup>n</sup> + <sup>n</sup>C<sub>1</sub> a<sup>n-1 </sup>b<sup>1</sup> + <sup>n</sup>C<sub>2</sub> a<sup>n-2 </sup>b<sup>2</sup> + … + <sup>n</sup>C<sub>r</sub> a<sup>n-r </sup>b<sup>r</sup> + … + <sup>n</sup>C<sub>n</sub> b<sup>n''</sup>
  
 
'''Reminder:''''' <sup>n</sup>C<sub>1</sub> = n!/[1! (n-1)!]''
 
'''Reminder:''''' <sup>n</sup>C<sub>1</sub> = n!/[1! (n-1)!]''
| | '''Binomial Theorem'''
+
|| '''Binomial Theorem'''
  
'''''a''''' and '''''b''''' are '''real numbers''', '''index''' '''''n''''' is a '''positive integer'''.
+
'''a''' and '''b''' are real numbers, '''index''' '''n''' is a positive integer.
  
'''''r''''' lies between 0 and '''''n'''''. Then,
+
'''r''' lies between 0 and '''n'''. Then,
  
 
'''Binomial theorem''' states that '''a''' plus '''b''' raised to '''n''' can be expanded as shown.
 
'''Binomial theorem''' states that '''a''' plus '''b''' raised to '''n''' can be expanded as shown.
 
|-
 
|-
| | '''Slide Number 7'''
+
|| '''Slide Number 7'''
  
 
'''Link for PhET simulation'''
 
'''Link for PhET simulation'''
  
 
[http://phet.colorado.edu/ http://phet.colorado.edu]
 
[http://phet.colorado.edu/ http://phet.colorado.edu]
| | Use the given link to download the simulation.
+
|| Use the given link to download the simulation.
  
 
[http://phet.colorado.edu/ http://phet.colorado.edu]
 
[http://phet.colorado.edu/ http://phet.colorado.edu]
 
|-
 
|-
| |
+
||
| | I have already downloaded '''Equation Grapher''' simulation to my '''Downloads''' folder.
+
|| I have already downloaded '''Equation Grapher''' simulation to my '''Downloads''' folder.
 
|-
 
|-
| | Press Ctrl+Alt+T to open the terminal.
+
|| Press Ctrl+Alt+T to open the terminal.
  
 
Type '''cd Downloads''' >> press '''Enter'''.
 
Type '''cd Downloads''' >> press '''Enter'''.
Line 93: Line 90:
  
 
Point to the opened '''file format'''.
 
Point to the opened '''file format'''.
| | To open the '''jar file''', open the '''terminal'''.
+
|| To open the '''jar file''', open the '''terminal'''.
  
 
At the '''terminal prompt''', type '''cd Downloads''' and press '''Enter'''.
 
At the '''terminal prompt''', type '''cd Downloads''' and press '''Enter'''.
Line 103: Line 100:
 
'''File''' opens in the '''browser''' in '''html format'''.
 
'''File''' opens in the '''browser''' in '''html format'''.
 
|-
 
|-
| | Cursor on the '''interface'''.
+
|| Cursor on the '''interface'''.
| | This is the '''interface''' for the '''Equation Grapher''' simulation.
+
|| This is the '''interface''' for the '''Equation Grapher simulation'''.
 
|-
 
|-
| | Point to the '''interface'''.
+
|| Point to the '''interface'''.
  
 
Point to the first quadrant.
 
Point to the first quadrant.
Line 112: Line 109:
 
Point to the quadratic function, '''y = ax<sup>2</sup> + bx + c'''.
 
Point to the quadratic function, '''y = ax<sup>2</sup> + bx + c'''.
  
Point to the '''sliders''' and '''display boxes'''.
+
Point to the '''sliders''' and display boxes.
  
Point to the red '''Zero button'''.
+
Point to the red '''Zero''' button.
  
Point to the green '''Save button'''.
+
Point to the green '''Save''' button.
  
 
Point to the equation.
 
Point to the equation.
| | The interface shows '''Cartesian co-ordinate system''' of '''x''' and '''y axes'''.
+
|| The interface shows '''Cartesian co-ordinate system''' of '''x''' and '''y axes'''.
  
The first '''quadrant''' contains:
+
The first quadrant contains:
  
The red-colored''' quadratic equation''', '''y equals ax squared plus bx plus c'''
+
The red-colored '''quadratic equation''', '''y equals ax squared plus bx plus c'''
  
Three '''sliders''' and '''display boxes''' under '''ax<sup>2</sup>, bx''' and '''c'''
+
Three '''sliders''' and display boxes under '''ax<sup>2</sup>, bx''' and '''c'''
  
The '''sliders''' allow you to change the values of the '''coefficients, a, b''' and '''c'''.
+
The '''sliders''' allow you to change the values of the coefficients, '''a''', '''b''' and '''c'''.
  
The '''display boxes''' show these values and can be used to enter values.
+
The display boxes show these values and can be used to enter values.
  
A red '''Zero button''' to set all '''sliders''' at '''0'''
+
A red '''Zero''' button to set all '''sliders''' at '''0'''
  
A green '''Save button''' to save the '''equation'''
+
A green '''Save''' button to save the '''equation'''
  
The updated '''equation''' in red is shown below the '''sliders'''.
+
The updated equation in red is shown below the '''sliders'''.
 
|-
 
|-
| | Point to the fourth '''quadrant'''.
+
|| Point to the fourth quadrant.
  
 
Point to the '''quadratic equation'''.
 
Point to the '''quadratic equation'''.
  
Point to the '''check boxes'''.
+
Point to the check boxes.
  
 
Point to the violet, green and blue terms.
 
Point to the violet, green and blue terms.
  
| | The fourth '''quadrant''' contains the
+
|| The fourth quadrant contains the
  
 
'''quadratic''' equation '''y = ax<sup>2</sup>+bx+c'''
 
'''quadratic''' equation '''y = ax<sup>2</sup>+bx+c'''
  
three '''check boxes''' under '''ax<sup>2</sup>, bx''' and '''c'''
+
three check boxes under '''ax<sup>2</sup>, bx''' and '''c'''
  
 
Note that the '''ax squared''' term is violet, '''bx''' is green and '''c''' is blue.
 
Note that the '''ax squared''' term is violet, '''bx''' is green and '''c''' is blue.
 
|-
 
|-
| | In the first '''quadrant''', in the '''display box''' below '''ax<sup>2'''</sup>, type 1.
+
|| In the first quadrant, in the display box below '''ax<sup>2'''</sup>, type 1.
  
 
Point to the '''slider''' under '''ax<sup>2'''</sup>.
 
Point to the '''slider''' under '''ax<sup>2'''</sup>.
| | In the first '''quadrant''', in the '''display box''' below '''ax squared''', type 1.
+
|| In the first quadrant, in the display box below '''ax squared''', type 1.
  
 
Observe how the '''slider''' under '''ax squared''' also moves to 1.
 
Observe how the '''slider''' under '''ax squared''' also moves to 1.
 
|-
 
|-
| | Point to the red parabola and origin '''(0,0)'''.
+
|| Point to the red parabola and origin '''(0,0)'''.
| | A red parabola with vertex at origin '''0 comma 0''' appears in the window.
+
|| A red parabola with vertex at origin '''0 comma 0''' appears in the window.
  
 
It opens upwards.
 
It opens upwards.
 
|-
 
|-
| | In the first '''quadrant''', in the '''display box''' below '''bx''', type 1
+
|| In the first quadrant, in the display box below '''bx''', type 1
| | In the first '''quadrant''', in the '''display box''' below '''bx''', type 1.
+
|| In the first quadrant, in the display box below '''bx''', type 1.
 
|-
 
|-
| | Point to the parabola.
+
|| Point to the parabola.
| | Observe how the parabola shifts downwards and to the left.
+
|| Observe how the parabola shifts downwards and to the left.
 
|-
 
|-
| | In the first '''quadrant''', in the display '''box''' below '''c''', type 1.
+
|| In the first quadrant, in the display box below '''c''', type 1.
| | In the first '''quadrant''', in the '''display box''' below '''c''', type 1.
+
|| In the first quadrant, in the display box below '''c''', type 1.
 
|-
 
|-
| | Point to the parabola.
+
|| Point to the parabola.
| | Observe how the parabola moves upwards.
+
|| Observe how the parabola moves upwards.
 
|-
 
|-
| | In the fourth '''quadrant''', check the box below the violet colored '''ax<sup>2'''</sup> term.
+
|| In the fourth quadrant, check the box below the violet coloured '''ax<sup>2'''</sup> term.
| | In the fourth '''quadrant''', check the box below the violet colored '''ax squared''' term.
+
|| In the fourth quadrant, check the box below the violet coloured '''ax squared''' term.
 
|-
 
|-
| | Point to the violet and red parabolas.
+
|| Point to the violet and red parabolas.
  
 
Point to the equation.
 
Point to the equation.
| | A violet parabola appears next to the red parabola.
+
|| A violet parabola appears next to the red parabola.
  
 
This violet parabola corresponds to the '''y equals ax squared''' part of the red equation.
 
This violet parabola corresponds to the '''y equals ax squared''' part of the red equation.
 
|-
 
|-
| | Point to the equation, '''y = x<sup>2'''</sup>, in the first '''quadrant'''.
+
|| Point to the equation, '''y = x<sup>2'''</sup>, in the first quadrant.
| | The equation for the violet parabola is '''y equals x squared'''.
+
|| The equation for the violet parabola is '''y equals x squared'''.
 
|-
 
|-
| | Now, check the box below the green '''bx''' term in the fourth '''quadrant'''.
+
|| Check the box below the green '''bx''' term in the fourth quadrant.
| | Now, in the fourth '''quadrant''', check the box below the green '''bx''' term.
+
|| Now, in the fourth quadrant, check the box below the green '''bx''' term.
 
|-
 
|-
| | Point to the green line.
+
|| Point to the green line.
  
 
Point to the origin '''(0,0)'''.
 
Point to the origin '''(0,0)'''.
  
Point to the equation, '''y = x''', in the first '''quadrant'''.
+
Point to the equation, '''y = x''', in the first quadrant.
| | Observe how a green line appears in the '''Cartesian plane'''.
+
|| Observe how a green line appears in the '''Cartesian''' plane.
  
 
It passes through the origin '''0 comma 0'''.
 
It passes through the origin '''0 comma 0'''.
Line 204: Line 201:
 
It corresponds to the '''x''' term and its equation is '''y equals x'''.
 
It corresponds to the '''x''' term and its equation is '''y equals x'''.
 
|-
 
|-
| | Now, check the box below the blue '''c''' term in the fourth '''quadrant'''.
+
|| Check the box below the blue '''c''' term in the fourth quadrant.
| | Now, check the box below the blue '''c''' term in the fourth '''quadrant'''.
+
|| Now, check the box below the blue '''c''' term in the fourth quadrant.
 
|-
 
|-
| | Point to the blue line.
+
|| Point to the blue line.
  
 
Point to the equation, '''y=c'''.
 
Point to the equation, '''y=c'''.
| | Observe how a blue line appears in the '''Cartesian plane'''.
+
|| Observe how a blue line appears in the '''Cartesian''' plane.
  
 
Its equation is '''y equals c''' and it corresponds to the constant term of the equation.
 
Its equation is '''y equals c''' and it corresponds to the constant term of the equation.
 
|-
 
|-
| | Click on the green '''Save button'''.
+
|| Click on the green '''Save''' button.
| | Click on the green '''Save button'''.
+
|| Click on the green '''Save''' button.
 
|-
 
|-
| | Point to the blue saved parabola, '''y = x<sup>2</sup>+ x + 1'''.
+
|| Point to the blue saved parabola, '''y = x<sup>2</sup>+ x + 1'''.
| | This saves the equation '''y equals x squared plus x plus 1'''.
+
|| This saves the equation '''y equals x squared plus x plus 1'''.
 
|-
 
|-
| | Change values for '''a, b '''and''' c'''.
+
|| Change values for '''a''', '''b'''and '''c'''.
  
Point to the '''sliders''' and the '''display boxes''' below the terms.
+
Point to the '''sliders''' and the display boxes below the terms.
  
 
Point to the graphs.
 
Point to the graphs.
| | Change the values for '''a, b '''and''' c'''.
+
|| Change the values for '''a''', '''b''' and '''c'''.
  
You can either use the '''sliders''' or type in the '''display boxes''' below the terms.
+
You can either use the '''sliders''' or type in the display boxes below the terms.
  
 
Observe the effects of these changes on the graphs.
 
Observe the effects of these changes on the graphs.
 
|-
 
|-
| | Point to the blue saved parabola, '''y = x<sup>2</sup> + x + 1'''.
+
|| Point to the blue saved parabola, '''y = x<sup>2</sup> + x + 1'''.
| | Note that as you change '''a, b '''and''' c''', you can still see the parabola '''y equals x squared plus x plus 1'''.
+
|| Note that as you change '''a''', '''b''' and '''c''', you can still see the parabola '''y equals x squared plus x plus 1'''.
  
 
This is because we saved this equation.
 
This is because we saved this equation.
 
|-
 
|-
| |
+
||
| | Save other graphs that you want to compare to see the effects of '''a, b '''and''' c'''.
+
|| Save other graphs that you want to compare to see the effects of '''a''', '''b ''' and '''c'''.
  
 
You can only save one equation at a time.
 
You can only save one equation at a time.
 
|-
 
|-
| | Point to the blue '''Erase button'''.
+
|| Point to the blue '''Erase''' button.
| | Note that after you have saved an equation, a blue '''Erase button''' appears.
+
|| Note that after you have saved an equation, a blue '''Erase''' button appears.
  
 
This will erase the saved equation.
 
This will erase the saved equation.
 
|-
 
|-
| | Click on the red '''Zero button'''.
+
|| Click on the red '''Zero''' button.
  
| | Click on the red '''Zero button'''.
+
|| Click on the red '''Zero''' button.
  
This resets all coefficients '''a, b '''and''' c''' to 0.
+
This resets all coefficients '''a''', '''b''' and '''c''' to 0.
 
|-
 
|-
| | '''Slide Number 8'''
+
|| '''Slide Number 8'''
  
 
'''Assignment'''
 
'''Assignment'''
| | As an '''assignment''', compare the parabolas graphed for different combinations of:
+
|| As an '''assignment''', compare the parabolas graphed for different combinations of:
  
'''a'''<0 and '''a'''>0
+
'''a''' <0 and '''a''' >0
  
'''b'''<0 and '''b'''>0
+
'''b''' <0 and '''b''' >0
  
'''c'''<0 and '''c'''>0
+
'''c''' <0 and '''c''' >0
 
|-
 
|-
| | '''Slide Number 9'''
+
|| '''Slide Number 9'''
  
 
'''Summary'''
 
'''Summary'''
| | In this '''tutorial''', we have demonstrated the
+
|| In this '''tutorial''', we have demonstrated the
  
 
'''Equation Grapher PhET simulation'''
 
'''Equation Grapher PhET simulation'''
 
|-
 
|-
| | '''Slide Number 10'''
+
|| '''Slide Number 10'''
  
 
'''Summary'''
 
'''Summary'''
| | Using this '''simulation''', we have looked at:
+
|| Using this '''simulation''', we have looked at:
  
 
Lines of the form '''y = bx + c''' and '''y = c'''
 
Lines of the form '''y = bx + c''' and '''y = c'''
Line 279: Line 276:
 
'''Quadratic polynomials''' '''y = ax<sup>2</sup> + bx + c'''
 
'''Quadratic polynomials''' '''y = ax<sup>2</sup> + bx + c'''
 
|-
 
|-
| | '''Slide Number 11'''
+
|| '''Slide Number 11'''
  
 
'''About the Spoken Tutorial Project'''
 
'''About the Spoken Tutorial Project'''
Line 288: Line 285:
  
 
If you do not have good bandwidth, you can download and watch it
 
If you do not have good bandwidth, you can download and watch it
| | The video at the following link summarizes the '''Spoken Tutorial project'''.
+
|| The video at the following link summarizes the '''Spoken Tutorial project'''.
  
 
Please download and watch it
 
Please download and watch it
 
|-
 
|-
| | '''Slide Number 12'''
+
|| '''Slide Number 12'''
  
 
'''Spoken Tutorial workshops'''
 
'''Spoken Tutorial workshops'''
| | The '''Spoken Tutorial Project '''team conducts workshops using spoken tutorials and gives certificates on passing online tests.
+
|| The '''Spoken Tutorial Project '''team conducts workshops using spoken tutorials and gives certificates on passing online tests.
  
 
For more details, please write to us.
 
For more details, please write to us.
 
|-
 
|-
| | '''Slide Number 13'''
+
|| '''Slide Number 13'''
  
 
'''Forum for specific questions:'''
 
'''Forum for specific questions:'''
Line 312: Line 309:
  
 
Someone from our team will answer them
 
Someone from our team will answer them
| | Please post your timed queries in this forum.
+
|| Please post your timed queries in this forum.
 
|-
 
|-
| | '''Slide Number 14'''
+
|| '''Slide Number 14'''
  
 
'''Acknowledgement'''
 
'''Acknowledgement'''
| | This project is partially funded by '''Pandit Madan Mohan Malaviya National Mission on Teachers and Teaching'''
+
|| This project is partially funded by '''Pandit Madan Mohan Malaviya National Mission on Teachers and Teaching'''
 
|-
 
|-
| | '''Slide Number 15'''
+
|| '''Slide Number 15'''
  
 
'''Acknowledgement'''
 
'''Acknowledgement'''
| | '''Spoken Tutorial Project''' is funded by '''NMEICT''', MHRD, Government of India
+
|| '''Spoken Tutorial Project''' is funded by '''NMEICT''', MHRD, Government of India
  
 
More information on this mission is available at this link.
 
More information on this mission is available at this link.
 
|-
 
|-
| |
+
||
| | This is '''Vidhya Iyer''' from '''IIT Bombay'''.
+
|| This is '''Vidhya Iyer''' from '''IIT Bombay'''.
  
 
Thank you for joining.
 
Thank you for joining.
 
|-
 
|-
 
|}
 
|}

Revision as of 12:38, 17 September 2018

Visual Cue Narration
Slide Number 1

Title Slide

Welcome to this tutorial on Equation Grapher.
Slide Number 2

Learning Objectives

We will demonstrate PhET simulation,

Equation Grapher

In this tutorial, we will demonstrate Equation Grapher PhET simulation.
Slide Number 3

System Requirements

Ubuntu Linux OS version 16.04

Java version 1.8.0

Firefox Web Browser 60.0.2

Here I am using,

Ubuntu Linux OS version 16.04

Java version 1.8.0

Firefox Web Browser version 60.0.2

Slide Number 4

Pre-requisites

Learner should be familiar with topics in high school mathematics.
Slide Number 5

Learning Goals

Lines y = bx + c and y = c

Quadratic polynomials y = ax2 + bx + c.

Using this simulation we will look at,

Lines of the form y = bx + c and y = c

Quadratic polynomials y equals ax squared plus bx plus c

Slide Number 6

Binomial Theorem

Binomial theorem states that if a, b ∈ ℝ, index n is a positive integer, 0 ≤ r ≤n, then,

(a + b)n = nC0 an + nC1 an-1 b1 + nC2 an-2 b2 + … + nCr an-r br + … + nCn bn

Reminder: nC1 = n!/[1! (n-1)!]

Binomial Theorem

a and b are real numbers, index n is a positive integer.

r lies between 0 and n. Then,

Binomial theorem states that a plus b raised to n can be expanded as shown.

Slide Number 7

Link for PhET simulation

http://phet.colorado.edu

Use the given link to download the simulation.

http://phet.colorado.edu

I have already downloaded Equation Grapher simulation to my Downloads folder.
Press Ctrl+Alt+T to open the terminal.

Type cd Downloads >> press Enter.

Type java space hyphen jar space equation-grapher_en.jar.

Point to the opened file format.

To open the jar file, open the terminal.

At the terminal prompt, type cd Downloads and press Enter.

Type java space hyphen jar space equation-grapher_en.jar.

Press Enter.

File opens in the browser in html format.

Cursor on the interface. This is the interface for the Equation Grapher simulation.
Point to the interface.

Point to the first quadrant.

Point to the quadratic function, y = ax2 + bx + c.

Point to the sliders and display boxes.

Point to the red Zero button.

Point to the green Save button.

Point to the equation.

The interface shows Cartesian co-ordinate system of x and y axes.

The first quadrant contains:

The red-colored quadratic equation, y equals ax squared plus bx plus c

Three sliders and display boxes under ax2, bx and c

The sliders allow you to change the values of the coefficients, a, b and c.

The display boxes show these values and can be used to enter values.

A red Zero button to set all sliders at 0

A green Save button to save the equation

The updated equation in red is shown below the sliders.

Point to the fourth quadrant.

Point to the quadratic equation.

Point to the check boxes.

Point to the violet, green and blue terms.

The fourth quadrant contains the

quadratic equation y = ax2+bx+c

three check boxes under ax2, bx and c

Note that the ax squared term is violet, bx is green and c is blue.

In the first quadrant, in the display box below ax2, type 1.

Point to the slider under ax2.

In the first quadrant, in the display box below ax squared, type 1.

Observe how the slider under ax squared also moves to 1.

Point to the red parabola and origin (0,0). A red parabola with vertex at origin 0 comma 0 appears in the window.

It opens upwards.

In the first quadrant, in the display box below bx, type 1 In the first quadrant, in the display box below bx, type 1.
Point to the parabola. Observe how the parabola shifts downwards and to the left.
In the first quadrant, in the display box below c, type 1. In the first quadrant, in the display box below c, type 1.
Point to the parabola. Observe how the parabola moves upwards.
In the fourth quadrant, check the box below the violet coloured ax2 term. In the fourth quadrant, check the box below the violet coloured ax squared term.
Point to the violet and red parabolas.

Point to the equation.

A violet parabola appears next to the red parabola.

This violet parabola corresponds to the y equals ax squared part of the red equation.

Point to the equation, y = x2, in the first quadrant. The equation for the violet parabola is y equals x squared.
Check the box below the green bx term in the fourth quadrant. Now, in the fourth quadrant, check the box below the green bx term.
Point to the green line.

Point to the origin (0,0).

Point to the equation, y = x, in the first quadrant.

Observe how a green line appears in the Cartesian plane.

It passes through the origin 0 comma 0.

It corresponds to the x term and its equation is y equals x.

Check the box below the blue c term in the fourth quadrant. Now, check the box below the blue c term in the fourth quadrant.
Point to the blue line.

Point to the equation, y=c.

Observe how a blue line appears in the Cartesian plane.

Its equation is y equals c and it corresponds to the constant term of the equation.

Click on the green Save button. Click on the green Save button.
Point to the blue saved parabola, y = x2+ x + 1. This saves the equation y equals x squared plus x plus 1.
Change values for a, band c.

Point to the sliders and the display boxes below the terms.

Point to the graphs.

Change the values for a, b and c.

You can either use the sliders or type in the display boxes below the terms.

Observe the effects of these changes on the graphs.

Point to the blue saved parabola, y = x2 + x + 1. Note that as you change a, b and c, you can still see the parabola y equals x squared plus x plus 1.

This is because we saved this equation.

Save other graphs that you want to compare to see the effects of a, b and c.

You can only save one equation at a time.

Point to the blue Erase button. Note that after you have saved an equation, a blue Erase button appears.

This will erase the saved equation.

Click on the red Zero button. Click on the red Zero button.

This resets all coefficients a, b and c to 0.

Slide Number 8

Assignment

As an assignment, compare the parabolas graphed for different combinations of:

a <0 and a >0

b <0 and b >0

c <0 and c >0

Slide Number 9

Summary

In this tutorial, we have demonstrated the

Equation Grapher PhET simulation

Slide Number 10

Summary

Using this simulation, we have looked at:

Lines of the form y = bx + c and y = c

Quadratic polynomials y = ax2 + bx + c

Slide Number 11

About the Spoken Tutorial Project

Watch the video available at http://spoken-tutorial.org/ What_is_a_Spoken_Tutorial

It summarizes the Spoken Tutorial project

If you do not have good bandwidth, you can download and watch it

The video at the following link summarizes the Spoken Tutorial project.

Please download and watch it

Slide Number 12

Spoken Tutorial workshops

The Spoken Tutorial Project team conducts workshops using spoken tutorials and gives certificates on passing online tests.

For more details, please write to us.

Slide Number 13

Forum for specific questions:

Do you have questions in THIS Spoken Tutorial?

Please visit this site

Choose the minute and second where you have the question

Explain your question briefly

Someone from our team will answer them

Please post your timed queries in this forum.
Slide Number 14

Acknowledgement

This project is partially funded by Pandit Madan Mohan Malaviya National Mission on Teachers and Teaching
Slide Number 15

Acknowledgement

Spoken Tutorial Project is funded by NMEICT, MHRD, Government of India

More information on this mission is available at this link.

This is Vidhya Iyer from IIT Bombay.

Thank you for joining.

Contributors and Content Editors

Madhurig, Vidhya