There are numerous ways to apply transformations to functions to create new functions. Let's look at some of the possibilities. Remember to utilize your graphing calculator to compare the graphs of your functions and their transformations.
Stretch or Compress Functions: Examining f (ax) and a f (x) |
Horizontal Stretch or Compress f (ax) stretches/compresses f (x) horizontally |
A horizontal stretching is the stretching of the graph away from the y-axis. A horizontal compression is the squeezing of the graph towards the y-axis.If the original (parent) function is y = f (x), the horizontal stretching or compressing of the function is the function f (ax).
- if 0 < a < 1 (a fraction), the graph isstretched horizontally by a factor
of a units.
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- if a > 1, the graph is compressed horizontally by a factor of a units.
- if a should be negative, the horizontal compression or horizontal stretching of the graph is followed by a reflection of the graph across the y-axis.
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Vertical Stretch or Compress a f (x) stretches/compresses f (x) vertically |
A vertical stretching is the stretching of the graph away from the x-axis. A vertical compression is the squeezing of the graph towards the x-axis.If the original (parent) function is y = f (x), the vertical stretching or compressing of the function is the function a f(x).
- if 0 < a < 1 (a fraction), the graph iscompressed vertically by a factor
of a units.
- if a > 1, the graph is stretched vertically by a factor of a units.
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- If a should be negative, then the vertical compression or vertical stretching of the graph is followed by a reflection across the x-axis.
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