Functions: Fractional functions
Inverse of linear fractional function
We have seen that determining the inverse function is the same as isolating the variable #x# in a formula of the form #y=\ldots#. Now we will investigate how to do that for linear fractional functions.
Procedure We determine the inverse function of the linear fractional function #\green{y}=\frac{a\blue{x}+b}{c\blue{x}+d}# with #a#, #b#, #c# and #d# as numbers. |
Example #\green{y}=\frac{2\blue{x}-5}{3\blue{x}+2}# |
|
Step 1 | Multiply by the denominator of the fraction: #c\blue{x}+d#. | #\green{y} \left(3\blue{x}+2\right)=2\blue{x}-5# |
Step 2 | Expand the brackets. | #3\blue{x}\green{y}+2 \green{y}=2\blue{x}-5# |
Step 3 | By means of reduction move the terms without #x# to the right and the terms with a #x# to the left hand side. | #3\blue{x}\green{y}-2\blue{x}=-2 \green{y}-5# |
Step 4 | Move #x# outside brackets. | #\blue x \left(3 \green{y}-2\right)=-2 \green{y}-5# |
Step 5 | Divide by what's in between the brackets, so that we only have #x# at the left hand side. | #\blue x=\frac{-2 \green{y}-5}{3 \green{y}-2}# |
Step 6 |
Swap the #\blue x# into a #\green y# and the #\green y# into a #\blue x# to get the inverse function. |
#\green y=\frac{-2 \blue{x}-5}{3 \blue{x}-2}# |
Isolate #x# in
\[y={{9-2\cdot x}\over{2\cdot x-5}}\]
\[y={{9-2\cdot x}\over{2\cdot x-5}}\]
#x={{5\cdot y+9}\over{2\cdot y+2}}#
#\begin{array}{rcl}
y&=&{{9-2\cdot x}\over{2\cdot x-5}} \\ &&\phantom{xxx}\blue{\text{the original function }}\\
y \cdot \left(2\cdot x-5\right)&=& 9-2\cdot x \\ &&\phantom{xxx}\blue{\text{both sides divided by }2\cdot x-5}\\
2\cdot x\cdot y-5\cdot y&=&9-2\cdot x \\ &&\phantom{xxx}\blue{\text{brackets expanded}}\\
2\cdot x\cdot y+2\cdot x &=&5\cdot y+9 \\&&\phantom{xxx}\blue{\text{terms with } x \text{ to the left hand side, terms without }x \text{ to the right hand side }}\\
x\cdot \left(2\cdot y+2\right) &=& 5\cdot y+9 \\ &&\phantom{xxx}\blue{x \text{ moved outside brackets}}\\
x&=&{{5\cdot y+9}\over{2\cdot y+2}} \\ &&\phantom{xxx}\blue{\text{divided by }2\cdot y+2}\\
\end{array}#
#\begin{array}{rcl}
y&=&{{9-2\cdot x}\over{2\cdot x-5}} \\ &&\phantom{xxx}\blue{\text{the original function }}\\
y \cdot \left(2\cdot x-5\right)&=& 9-2\cdot x \\ &&\phantom{xxx}\blue{\text{both sides divided by }2\cdot x-5}\\
2\cdot x\cdot y-5\cdot y&=&9-2\cdot x \\ &&\phantom{xxx}\blue{\text{brackets expanded}}\\
2\cdot x\cdot y+2\cdot x &=&5\cdot y+9 \\&&\phantom{xxx}\blue{\text{terms with } x \text{ to the left hand side, terms without }x \text{ to the right hand side }}\\
x\cdot \left(2\cdot y+2\right) &=& 5\cdot y+9 \\ &&\phantom{xxx}\blue{x \text{ moved outside brackets}}\\
x&=&{{5\cdot y+9}\over{2\cdot y+2}} \\ &&\phantom{xxx}\blue{\text{divided by }2\cdot y+2}\\
\end{array}#
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