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Math 160

Math 160. 2.7 – One-to-One Functions and Their Inverses. A function is ____________ if whenever . In other words, a function is one-to-one if two different inputs always give you two different outputs. A function is ____________ if whenever .

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Math 160

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  1. Math 160 2.7 – One-to-One Functions and Their Inverses

  2. A function is ____________ if whenever . In other words, a function is one-to-one if two different inputs always give you two different outputs.

  3. A function is ____________ if whenever . In other words, a function is one-to-one if two different inputs always give you two different outputs. one-to-one

  4. A function is ____________ if whenever . In other words, a function is one-to-one if two different inputs always give you two different outputs. one-to-one

  5. We can test this visually by using the __________________, which says that a function is one-to-one if no horizontal line intersects its graph more than once.

  6. We can test this visually by using the __________________, which says that a function is one-to-one if no horizontal line intersects its graph more than once. Horizontal Line Test

  7. Inverse Functions Let be a one-to-one function with domain A and range B. The _______of , called , has domain B and range A, and is defined by for any in B. So, any input/output pair of is switched for .

  8. Inverse Functions Let be a one-to-one function with domain A and range B. The _______of , called , has domain B and range A, and is defined by for any in B. So, any input/output pair of is switched for . inverse

  9. Inverse Functions Let be a one-to-one function with domain A and range B. The _______of , called , has domain B and range A, and is defined by for any in B. So, any input/output pair of is switched for . inverse

  10. Inverse functions “undo” other functions. For example, if , then . To show that and are inverse functions, we can use the following properties: ___ for every in A ___ for every in B

  11. Inverse functions “undo” other functions. For example, if , then . To show that and are inverse functions, we can use the following properties: ___ for every in A ___ for every in B

  12. Inverse functions “undo” other functions. For example, if , then . To show that and are inverse functions, we can use the following properties: ___ for every in A ___ for every in B

  13. Inverse functions “undo” other functions. For example, if , then . To show that and are inverse functions, we can use the following properties: ___ for every in A ___ for every in B

  14. Ex 1. Show that and are inverses of each other.

  15. Note: Only one-to-one functions have inverses.

  16. How to find the inverse of : 1. Replace with ___.2. __________ and .3. Solve for ____.4. Replace with _________.

  17. How to find the inverse of : 1. Replace with ___.2. __________ and .3. Solve for ____.4. Replace with _________.

  18. How to find the inverse of : 1. Replace with ___.2. __________ and .3. Solve for ____.4. Replace with _________. Switch

  19. How to find the inverse of : 1. Replace with ___.2. __________ and .3. Solve for ____.4. Replace with _________. Switch

  20. How to find the inverse of : 1. Replace with ___.2. __________ and .3. Solve for ____.4. Replace with _________. Switch

  21. Ex 2.Find the inverse of .

  22. Graphs and Inverses Ex 3.Given the graph of , draw the graph of .

  23. Graphs and Inverses Ex 3.Given the graph of , draw the graph of .

  24. Graphs and Inverses Ex 3.Given the graph of , draw the graph of .

  25. Graphs and Inverses Ex 3.Given the graph of , draw the graph of .

  26. Graphs and Inverses Ex 3.Given the graph of , draw the graph of .

  27. Graphs and Inverses Given any point on the graph of , we can get a point on the graph of by switching the coordinates: . As a result, the entire graph of will be the mirror image of across the line.

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