Solving Complex Polynomial Equations

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To solve the polynomial equation x^5 = x, it can be rearranged to x^5 - x = 0. The equation can be factored as x(x^4 - 1) = 0, leading to solutions of x = 0, 1, -1, and the complex roots x = i and x = -i. The discussion also touches on the concept of dividing by zero, which is debated among participants, with some suggesting it leads to infinite solutions. Overall, the key takeaway is the method of factoring and identifying both real and complex roots of the polynomial.
Exulus
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Hi guys, can anyone tell me how I would go about solving this equation? :

x^5 = x

Rearranging it gives:
x^5 - x = 0

But then I don't really know what to do next. I know just from looking at it and thinking about it that the roots should be x = 0, 1, -1, -i, i...but I need to be able to come to that conclusion rather than state it.

Thanks for any help :)
 
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Well, you can clearly see x=0 is a solution, so for the other solutions, you can divide the equation by x.
Can you solve the remaining equation? (There's a general method for finding the n n-th roots of unity).

By the way, since you have all the solutions, you can factor the polynomial or so.
 
Last edited:
ahh of course! That'll explain it. I did wonder as i was looking through my notes, we were taught how to find roots of unity but not this. Dividing by x makes that possible, cheers :)
 
hey
x can also be infinity
 
you can simply factor it like this:

x^5 - x = 0
x(x^4-1)=0
x(x^2+1)(x^2-1)=0
x(x^2+1)(x+1)(x-1)=0

now its obvious the real solutions are:
0,-1,1

and the complex solutions are:
x^2+1=0
x^2=-1
x=i
x=-i
 
Last edited:
Exulus said:
Hi guys, can anyone tell me how I would go about solving this equation? :

x^5 = x

Rearranging it gives:
x^5 - x = 0

But then I don't really know what to do next. I know just from looking at it and thinking about it that the roots should be x = 0, 1, -1, -i, i...but I need to be able to come to that conclusion rather than state it.

Thanks for any help :)

The only way this is posible is if x:=0; 0^5 = 0;
 
Of course,the complex exponential is multivalued,that means that the # of solutions to

x^{4}=1

is infinite.

Daniel.
 
nice work anzas,
and u exulus,my idea was this divide both side by x,u get x^4=1call this equation one,and rem. x[x^4-1]=0 this was resolved from the above question sub. x^4as 1 x(0)=0now divide both sides by 0 x=0/0 which is infinity.if u disagree let me know .see ya
 
abia ubong said:
now divide both sides by 0

bad idea. What does it mean to divide by zero exactly? And why do you think 0/0 is infinity?

dextercioby said:
Of course,the complex exponential is multivalued,that means that the # of solutions to

x^4 =1

is infinite.

Daniel.

I always thought the complex exponential was pretty single-valued. What's a value of e^{ i\alpha}, other than \cos \alpha + i\sin \alpha?
 
  • #10
the complex exponential is single valued. maybe he meant the complex log.
 

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