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Intersection of Forward and Inverse Function (1 Viewer)

laters

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Hi,

for some exam questions I have seen they might give an equation (say f(x)=e^x - 4) and ask why the x coordinate of any intersection points of f(x) and its inverse satisfy an equation (e^x - x - 4 = 0) which obviously requires you to equate f(x)=x.

But in the textbook I have seen a question y=-x^3 which intersects with its inverse on the line y=-x.

So is there a general rule or something I need to know? Or should I be actually equating the forward with the inverse all the time, or draw a graph to make sure?
 

turntaker

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I'd equate them and/or graph to make sure.
 

braintic

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A function and its inverse don't have to intersect on y=x or on y=-x.
 

braintic

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Why not? (unless their asymptotes are y = x, -x)
My wording does not precisely reflect what I was trying to say.

It should be:
The points of intersection of a function and its inverse don't have to lie on y=x or y=-x.
 
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leehuan

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Fair enough, I forgot about the family of curves that have inverse functions as themselves.

y=-x+b; y=c/x; y=-c/x. y=x etc.
 

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