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## #1 2005-12-15 05:51:22

yonski
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### Finding an inverse function

Hey,
i'm struggling with finding inverse functions so I was wondering whether anyone would be able to run me through it? For simple ones I can manage it, but this one is really bugging me:

f(x) = S(x+L)/x^2

I've plotted it on my calculator, so I know that the domain would have to be restricted to make the inverse function valid. But no matter how I rearrange it I just can't figure it out    Do I have to do some differentiation or something?

Any help would be greatly appreciated!

Jon.

Student: "What's a corollary?"
Lecturer: "What's a corollary? It's like when a theorem has a child. And names it corollary."

## #2 2005-12-15 06:14:38

mathsyperson
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### Re: Finding an inverse function

It's got me stumped too. I've never seen a problem involving finding the inverse that needed differentiation before, and I don't think this one's any different. It's just quite hard. I'll try it again later, because it's annoying me with its unsolved-ness.

Why did the vector cross the road?
It wanted to be normal.

## #3 2005-12-15 06:45:32

yonski
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### Re: Finding an inverse function

Okay cool thanks. It's really annoying me too now lol!

Student: "What's a corollary?"
Lecturer: "What's a corollary? It's like when a theorem has a child. And names it corollary."

## #4 2005-12-15 07:30:48

Ricky
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### Re: Finding an inverse function

S(x+L) is S*(x+L) and not a function, right?  Using y as f(x) (as it's easier):

y = S(x+L)/x²
yx² = Sx + SL
yx² - Sx - SL = 0

x = (S ± √(S² - 4ySL) ) / 2y

Which is the inverse.

Last edited by Ricky (2005-12-15 07:31:16)

"In the real world, this would be a problem.  But in mathematics, we can just define a place where this problem doesn't exist.  So we'll go ahead and do that now..."

## #5 2005-12-15 07:35:32

yonski
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### Re: Finding an inverse function

It was staring at me all along! Thank you very much

Student: "What's a corollary?"
Lecturer: "What's a corollary? It's like when a theorem has a child. And names it corollary."

## #6 2005-12-21 15:37:33

John E. Franklin
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### Re: Finding an inverse function

Ricky,  I thought you have to set y=0 for quadratic equation.  Please explain.
Plus, what is the inverse of a function, is it when you swap x and y axis and look
at the graph through the back of the paper, or just look through the back of the
paper and turn 90 degrees??  I can't remember.
...
Okay, I looked up inverses, (x,y) goes to (y,x), so look through back of
paper after flip paper through the y=x slope of 1 axis.
But I still don't understand the use of the quadratic equation with y as a variable and
not y set to zero.

Last edited by John E. Franklin (2005-12-21 15:44:21)

Imagine for a moment that even an earthworm may possess a love of self and a love of others.

## #7 2005-12-22 02:32:50

Ricky
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### Re: Finding an inverse function

If you draw the line y = x, the inverse of a function should be mirrored across that line.  That is, f(x,y) = f-¹(y,x)

But I still don't understand the use of the quadratic equation with y as a variable and
not y set to zero.

y isn't the variable.  x is:

yx² - Sx - SL = 0

a = y, b = -S, c = -SL

ax² + bx + c = 0

There are two ways to find the inverse.  Take y = f(x), and swap y with x, then solve for y.  This is more natural to most students because they are used to having y as the dependant variable and solving for it.

I prefer to take the other route.  That is, keep x and y in the same place and just solve for x.  You will find the same exact inverse, only x will be the dependant variable instead of y.

"In the real world, this would be a problem.  But in mathematics, we can just define a place where this problem doesn't exist.  So we'll go ahead and do that now..."

## #8 2005-12-22 10:13:40

John E. Franklin
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### Re: Finding an inverse function

x and y are variables, so I don't think you can set y equal to a.
How can you do that?

Imagine for a moment that even an earthworm may possess a love of self and a love of others.

## #9 2005-12-22 13:03:40

Ricky
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### Re: Finding an inverse function

Variable or constant, it doesn't matter, a is just a "label" for y.

For example:

y = x^2 + 2

z = y

z = x^2 + 2

You really aren't saying anything new, just calling y a different name.

"In the real world, this would be a problem.  But in mathematics, we can just define a place where this problem doesn't exist.  So we'll go ahead and do that now..."

## #10 2005-12-24 01:14:03

austin81
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### Re: Finding an inverse function

S(x+L) is S*(x+L) and not a function, right?  Using y as f(x) (as it's easier):

y = S(x+L)/x²
yx² = Sx + SL
yx² - Sx - SL = 0