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Parent function and Transformation.ppt

This document discusses parent functions and transformations of functions. It defines parent functions as the simplest functions that satisfy a function definition, such as y=x for linear functions. It then explains various parent functions including quadratic, square root, absolute value, and cubic functions. The document also covers transformations including vertical and horizontal shifting, stretching and compressing, and reflection. It provides examples of writing equations for transformed graphs and combining transformations.

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Parent Functions and Transformations
Graphs of common functions It is important to be able to sketch these from memory.
PARENT FUNCTIONS A parent function is the simplest function that still satisfies the definition of a certain type of function. For example, linear functions which make up a family of functions, the parent function would be y = x.
The identity function/linear function f(x) = x
The quadratic function 2 ) ( x x f 
x x f  ) ( The square root function/radical function
x x f  ) ( The absolute value function
3 ) ( x x f  The cubic function
The rational function 1 ( ) f x x 
Transformation of Functions Transformation of functions will give us a better idea of how to quickly sketch the graph of certain functions.
The transformations are (1) Vertical (2) Horizonal (3) Stretch/Compression. (4) Reflection in the x-axis (whenever the sign in front is negative)
VALUE of a For f(x) = x (Linear functions) It general form is given by: f(x)=ax+d if |a|>1, vertical stretch (narrow) makes the graph move closer to y-axis if |a|<1, vertical shrink (opens wide) makes the graph move way from y- axis
SIGN of a for negative in front of a, flip over (i.e..Reflection in x-axis)
Positive k means, move k-units up Negative k, move k-units down k represents vertical shift
Vertical Translation The graph of y = f(x) + d is the graph of y = f(x) shifted up d units; The graph of y = f(x)  d is the graph of y = f(x) shifted down d units. 2 ( ) f x x  2 ( ) 3 f x x   2 ( ) 2 f x x  
In general, a vertical translation means that every point (x, y) on the graph of f(x) is transformed to (x, y + c) or (x, y – c) on the graphs of or respectively.
Horizontal Translation The graph of y = f(x  c) is the graph of y = f(x) shifted right c units; The graph of y = f(x + c) is the graph of y = f(x) shifted left c units. 2 ( ) f x x    2 2 y x     2 2 y x  
The values that translate the graph of a function will occur as a number added or subtracted either inside or outside a function. Numbers added or subtracted inside translate left or right, while numbers added or subtracted outside translate up or down. ( ) y f x c d   
Sketch the following: ( ) 3 f x x   2 ( ) 5 f x x   3 ( ) ( 2) f x x   ( ) 3 f x x  
Combining a vertical & horizontal shift Example of function that is shifted down 4 units and right 6 units from the original function. ( ) 6 ) 4 ( , g x x f x x    
To remember the difference between vertical and horizontal translations, think: “Add to y, go high.” “Add to x, go left.” Helpful Hint
Use the basic graph to sketch the following: TRY ( ) f x x   ( ) f x x   2 ( ) f x x   ( ) f x x  
Example  Write the equation of the graph obtained when the parent graph is translated 4 units left and 7 units down.  Parent graph:  Transformation: 3 y x  3 ( 4) 7 y x   
Example  Explain the difference in the graphs 2 ( 3) y x   2 3 y x   Horizontal Shift Left 3 Units Vertical Shift Up 3 Units
 Describe the differences between the graphs  Try graphing them… 2 y x  2 4 y x  2 1 4 y x 
A combination If the parent function is  Describe the graph of  2 y x  2 ( 3) 6 y x    The parent would be horizontally shifted right 3 units and vertically shifted up 6 units
 If the parent function is  What do we know about  3 y x  3 2 5 y x   The graph would be vertically shifted down 5 units and vertically stretched two times as much.
What can we tell about this graph? 3 (2 ) y x   It would be a cubic function reflected across the x-axis and horizontally compressed by a factor of ½.
If a is positive, then the graph will go up. If a is negative, then the graph will go down.
Transformations of graphs y = a(x - h)²+k h is the horizontal shift. The graph will move in the opposite direction. K is the vertical shift. The graph will move in the same direction. If a is positive, then the graph will go up.
For example: y = x² + 6  y = (x – 0)² + 6, so the V.S. is up 6 and the H.S. is none. Therefore, the vertex is V (0, 6).  Since a is positive, the direction of the parabola is up.  Since a is 1, then the parabola is neither fat or skinny. It is a standard parabola.

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In this document
Powered by AI

Introduction to parent functions, their purpose, and examples like linear (y=x) and quadratic functions.

Detailed descriptions of parent functions including identity, quadratic, square root, absolute value, cubic, and rational functions.

Overview of function transformations, including vertical/horizontal shifts, stretches and reflections.

How vertical (up/down) and horizontal (left/right) translations affect graph positioning.

Instructions for sketching graphs of functions after vertical and horizontal translations.

Examples of combined transformations on parent functions, illustrating shifts in both directions.

Effects of transformations on graph behavior, such as direction of openings and vertex positioning.

Parent function and Transformation.ppt

  • 1.
  • 2.
    Graphs of commonfunctions It is important to be able to sketch these from memory.
  • 3.
    PARENT FUNCTIONS A parentfunction is the simplest function that still satisfies the definition of a certain type of function. For example, linear functions which make up a family of functions, the parent function would be y = x.
  • 4.
  • 5.
  • 6.
    x x f  ) ( The squareroot function/radical function
  • 7.
  • 8.
    3 ) ( x x f  Thecubic function
  • 9.
  • 10.
    Transformation of Functions Transformationof functions will give us a better idea of how to quickly sketch the graph of certain functions.
  • 11.
    The transformations are (1)Vertical (2) Horizonal (3) Stretch/Compression. (4) Reflection in the x-axis (whenever the sign in front is negative)
  • 12.
    VALUE of a Forf(x) = x (Linear functions) It general form is given by: f(x)=ax+d if |a|>1, vertical stretch (narrow) makes the graph move closer to y-axis if |a|<1, vertical shrink (opens wide) makes the graph move way from y- axis
  • 13.
    SIGN of a fornegative in front of a, flip over (i.e..Reflection in x-axis)
  • 14.
    Positive k means,move k-units up Negative k, move k-units down k represents vertical shift
  • 15.
    Vertical Translation The graphof y = f(x) + d is the graph of y = f(x) shifted up d units; The graph of y = f(x)  d is the graph of y = f(x) shifted down d units. 2 ( ) f x x  2 ( ) 3 f x x   2 ( ) 2 f x x  
  • 16.
    In general, avertical translation means that every point (x, y) on the graph of f(x) is transformed to (x, y + c) or (x, y – c) on the graphs of or respectively.
  • 17.
    Horizontal Translation The graphof y = f(x  c) is the graph of y = f(x) shifted right c units; The graph of y = f(x + c) is the graph of y = f(x) shifted left c units. 2 ( ) f x x    2 2 y x     2 2 y x  
  • 18.
    The values thattranslate the graph of a function will occur as a number added or subtracted either inside or outside a function. Numbers added or subtracted inside translate left or right, while numbers added or subtracted outside translate up or down. ( ) y f x c d   
  • 19.
    Sketch the following: () 3 f x x   2 ( ) 5 f x x   3 ( ) ( 2) f x x   ( ) 3 f x x  
  • 20.
    Combining a vertical& horizontal shift Example of function that is shifted down 4 units and right 6 units from the original function. ( ) 6 ) 4 ( , g x x f x x    
  • 21.
    To remember thedifference between vertical and horizontal translations, think: “Add to y, go high.” “Add to x, go left.” Helpful Hint
  • 22.
    Use the basicgraph to sketch the following: TRY ( ) f x x   ( ) f x x   2 ( ) f x x   ( ) f x x  
  • 23.
    Example  Write theequation of the graph obtained when the parent graph is translated 4 units left and 7 units down.  Parent graph:  Transformation: 3 y x  3 ( 4) 7 y x   
  • 24.
    Example  Explain thedifference in the graphs 2 ( 3) y x   2 3 y x   Horizontal Shift Left 3 Units Vertical Shift Up 3 Units
  • 25.
     Describe thedifferences between the graphs  Try graphing them… 2 y x  2 4 y x  2 1 4 y x 
  • 26.
    A combination If theparent function is  Describe the graph of  2 y x  2 ( 3) 6 y x    The parent would be horizontally shifted right 3 units and vertically shifted up 6 units
  • 27.
     If theparent function is  What do we know about  3 y x  3 2 5 y x   The graph would be vertically shifted down 5 units and vertically stretched two times as much.
  • 28.
    What can wetell about this graph? 3 (2 ) y x   It would be a cubic function reflected across the x-axis and horizontally compressed by a factor of ½.
  • 29.
    If a ispositive, then the graph will go up. If a is negative, then the graph will go down.
  • 30.
    Transformations of graphs y= a(x - h)²+k h is the horizontal shift. The graph will move in the opposite direction. K is the vertical shift. The graph will move in the same direction. If a is positive, then the graph will go up.
  • 31.
    For example: y= x² + 6  y = (x – 0)² + 6, so the V.S. is up 6 and the H.S. is none. Therefore, the vertex is V (0, 6).  Since a is positive, the direction of the parabola is up.  Since a is 1, then the parabola is neither fat or skinny. It is a standard parabola.