one-to-one functions and their inversesbekki/1310/notes/37_done.pdf · m 1310 3.7 inverse function...
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M 1310 3.7 Inverse function
One-to-One Functions and Their Inverses
Let f be a function with domain A. f is said to be one-to-one if no two elements in A have the same image. Example 1: Determine if the following function is one-to-one. a. Domain f Range a -1 b 2 c 5 b. Domain g Range a -1 b 5 c 5
![Page 2: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/2.jpg)
M 1310 3.7 Inverse function Horizontal line test.
Which of the following is a one-to- one function
![Page 3: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/3.jpg)
M 1310 3.7 Inverse function
• A one-to-one function has an inverse function. • The inverse function reverses whatever the first function did.
Example: The formula 3259)( += xxf is used to convert from
x degrees Celsius to y degrees Fahrenheit. The formula
)32(95)( −= xxg is used to convert from x degrees Fahrenheit to
y degrees Celsius
• The inverse of a function f is denoted by 1−f , read “f-inverse”.
• )(
1)(1xf
xf ≠−
Example: Assume that the domain of f is all real numbers and that f is one-to-one. If f (7) = 9 and f (8) = -12
?)9(1−f
?)12(1 −−f Assume that the domain of f is all real numbers and that f is one-to-one. If f (7) = 17 and f (-5) = -11
?)17(1−f
![Page 4: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/4.jpg)
M 1310 3.7 Inverse function If f and g are inverse functions, 3)2( =−f and 2)3( −=f . Find )2(−g . If f and g are inverse functions, 2)1( −=−f and 7)3( =f . Find )2(−g . Domain and Range: The domain of f is the range of 1−f and the range of f is the domain of 1−f . These two statements mean exactly the same thing: 1. f is one-to-one (1-1) 2. f has an inverse function
![Page 5: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/5.jpg)
M 1310 3.7 Inverse function
Property of Inverse Functions Let f and g be two functions such that xxgf =))(( ! for every x in the domain of g and xxfg =))(( ! for every x in the domain of f then f and g are inverses of each other. Example: Show that the following functions are inverses of each other.
43)( x
xf−= and xxg 43)( −=
![Page 6: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/6.jpg)
M 1310 3.7 Inverse function How to find the inverse of a function: (if it exists!)
1. Replace “ f (x) ” by “y”. 2. Exchange x and y. 3. Solve for y. 4. Replace “y” by “ f −1(x) ”. 5. Verify!
Example: Find the inverse function of 72)( −= xxf . Assume )(xf is a one-to-one function. Find the inverse function )(1 xf − given that 25)( 3 −= xxf
![Page 7: One-to-One Functions and Their Inversesbekki/1310/notes/37_done.pdf · M 1310 3.7 Inverse function One-to-One Functions and Their Inverses Let f be a function with domain A. f is](https://reader034.vdocument.in/reader034/viewer/2022050217/5f6300605fbf7809f71e9b8c/html5/thumbnails/7.jpg)
M 1310 3.7 Inverse function Find the inverse function )(1 xf − given that
21)(+
=x
xf
Assume )(xg is a one-to-one function. Find the inverse function )(1 xg − given that
x
xxg
−−=
634)(
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M 1310 3.7 Inverse function Assume )(xg is a one-to-one function. Find the inverse function )(1 xg − given that
x
xg−
=12)(
!