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Finding the inverse of y = x^7 + x^5


Lightmeow

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I think it's likely impossible to do so using radicals (i.e. using only addition, multiplication, and taking nth roots); you'd be solving x^7 + x^5 - a = 0. I'd guess that the Galois group is probably some large subgroup of S7, and so likely isn't solvable.

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I'm using "solvable" in the sense of group theory - the Galois group for this polynomial is likely not a solvable group. It turns out that this has implications for whether it's possible to find x using radicals.

Edited by uncool
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I can "brute force"it by simply swapping the axes. So, there is an inverse; there might not be an analytic one.

Is there a way to prove that it is unsolvable by normal means? Why isn't it solvable from an analytic approach?

 

I think it's likely impossible to do so using radicals (i.e. using only addition, multiplication, and taking nth roots); you'd be solving x^7 + x^5 - a = 0. I'd guess that the Galois group is probably some large subgroup of S7, and so likely isn't solvable.

Thanks for saying that. I am trying to figure out what the Galois group is and S7 is. Could you shed some light or links, because Google isn't telling me that much(Or I am using wrong terms, which seems more likely)

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Hey all. I am trying to figure something out that I can't. Basically, for some reason I wanted to find the inverse of y = x7+x5. How the heck would you do that. I know it is probably possible, but how?

You are trying to find the solution of a 7th degree polynomial equation. In general equations of degree > 4 do not have a closed form solution.

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That's not quite what I meant.

There is a general solution to quadratic equations "minus b pluss or minus the square root of b squared minus four a c all divided by two a"

There is no general solution for 8th order polynomial.

But there is an inverse for the particular instance of y=x^8.

the solution is that y is the 8th root of x

and you can calculate it by pressing the "square root" button on your calculator a few times. (OK, it's messy for negative numbers, but that's not the point)

 

What I don't know is whether X^7+X^5 falls into the group of 7th order polynomials that dos have an analytical solution.

 

I can show, graphically, that x^7 - x^5 does not have an inverse.

Edited by John Cuthber
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What I don't know is whether X^7+X^5 falls into the group of 7th order polynomials that dI can show, graphically, that x^7 - x^5 does not have an inverse.

 

Can you not just flip it across the line y=x? There is only one point of inflexion (there is only one real solution to dy/dx - and the value of d2y/dx2 is zero) so that line would also be 1:1

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Thanks for drawing the graphs.

If you look at the blue line (which indicates what would be the "inverse function") at x= about -0.05, the blue line has 3 different values.

So, if I asked you what's the value of f^-1 of -0.05, which answer would you give?

 

The function isn't monotonic, so there's no reliable way to invert it.

If you do the same with y=x^5+ x^7 you will see what the difference is.

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Thanks for drawing the graphs.

If you look at the blue line (which indicates what would be the "inverse function") at x= about -0.05, the blue line has 3 different values.

So, if I asked you what's the value of f^-1 of -0.05, which answer would you give?

 

The function isn't monotonic, so there's no reliable way to invert it.

If you do the same with y=x^5+ x^7 you will see what the difference is.

 

"If you do the same with y=x^5+ x^7 you will see what the difference is." My problem was that I was doing it with y=x^7 + x^5 - brain fart. Your posts now make perfect sense once I have read it properly

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If you look at the blue line (which indicates what would be the "inverse function") at x= about -0.05, the blue line has 3 different values.

 

i would imagine they are generating the values via brute force though so they are not going to make the graph 100% accurate

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The graph only needs to be fairly accurate to illustrate the point.

There are three values of x where x^7- x^5 = -0.05

How do you invert that? Which one do you choose?

I didn't understand your point about there being three values etc. Both x^7 + x^5 and its inverse are bijective from the real to the reals. Besides, you swapped the + for a -, that confused me too. In any event, there's no elementary inverse. Proof by Wolfram. If an elementary solution exists, Wolfram would know it.

 

https://www.wolframalpha.com/input/?i=inverse%5By+%3D+x%5E7+%2B+x%5E5%5D

 

ps -- It's clear that x^7 - x^5 is not injective.

 

https://www.wolframalpha.com/input/?i=x%5E7-+x%5E5

Edited by wtf
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If I ask you to think of a number, double it and add ten then tell me the result I can work out what number you first thought of by applying the reverse process- subtract ten then halve it.

 

I can do that because the function that I asked you to apply ha a properly defined inverse.

 

 

If I tell you to think of a number and then subtract the fifth power from the seventh, then tell me the result I can't (reliably) say what number you thought of.

However if I asked you to add the fifth and seventh powers then tell me the answer I can work out which number you chose in the first place- I can look on the graph.
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If I ask you to think of a number, double it and add ten then tell me the result I can work out what number you first thought of by applying the reverse process- subtract ten then halve it.

 

I can do that because the function that I asked you to apply ha a properly defined inverse.

 

 

If I tell you to think of a number and then subtract the fifth power from the seventh, then tell me the result I can't (reliably) say what number you thought of.

 

However if I asked you to add the fifth and seventh powers then tell me the answer I can work out which number you chose in the first place- I can look on the graph.

Totally agreed. Some functions are invertible and some aren't. It's the horizontal line test from analytic geometry.

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