Mathematical Question?

[xtremee]

Hi all,

i wanna to Know What is the BEST way to solve equation of order 6?

if you have equation : s^6+2S^5+S^4+8S^3+4S^2+15S+1562=0

What will be the MOST easiest way to find its roots!!

i know that you can use Bi-Section (Halfing Method)

Any Other Ideas..

N.B. I wanna to solve it manually without the use of PC or Calculator.

Any ideas will be excellent

Regards,

Xtremee

Edited November 8, 2006 by xtremee

[XP-is-a-CRAP]

if you have equation : s^6+2S^5+S^4+8S^3+4S^2+15S+1562=0

WOW ... trying to remember about algebra ...

What is the BEST way to solve equation of order 6?

What will be the MOST easiest way to find its roots!!

I wanna to solve it manually without the use of PC or Calculator.

SORRY but it definitely IS the (a smart one) calculator or PC.

Any Other Ideas..

Well, since the highest exponent is 6 and divisible by 2,

there is the risk that there is NO solution at all ...

The number of solutions may be 0 ... 6 .

There is a good method to solve equations of order 2 (possible result:

no solution exists).

There is a bad method for order 3 (exact solution for any equation)

But there are NO (exact and universal) methods for order >=4 !!!

What one can try is the brute-force method: test for solutions +1, -1, +2, -2, ...

and reduce through polynom division ... works for "artificial" "school" equations

with low integer solutions only

Otherwise, make a graph (preferably with a PC ), and then use an

inexact method (tangent method, ...) to approach the solutions.

BTW: If someone has the result (PC math prog) please post ...

Edited November 3, 2006 by XP-is-a-CRAP

[IcemanND]

the equation posted is not possible.

how about the constant being 62 instead of 1562?

But of course the answer to everything is 42.

[tain]

I'm no good with math but I can tell you that it is spelled Mathematical not Mathimatical.

[LLXX]

There is a good method to solve equations of order 2 (possible result:

no solution exists).

There is a bad method for order 3 (exact solution for any equation)

But there are NO (exact and universal) methods for order >=4 !!!

Correction, a formula using conventional algebra exists for polynomials up to and including order 4 (quartic). It has been proved that no closed-form algebraic solution exists for polynomials of order 5 or higher.

http://en.wikipedia.org/wiki/Cubic_equation

http://en.wikipedia.org/wiki/Quartic_equation

http://en.wikipedia.org/wiki/Quintic_equation

BTW: If someone has the result (PC math prog) please post ...

Here is Mathematica 4.1 attempting to solve your sextic equation. It cannot offer exact roots, as it does not have the capabilities to go beyond ordinary algebra. Below that is an approximation to each of the 6 roots (all complex numbers).

http://img145.imageshack.us/img145/4372/equusuj6.png

(Yes, "equus" is Latin for "horse".)

[gamehead200]

Confirmed my my TI-89 and TI-83+ calculators. There are no solutions for that equation.

However:

d/dS(s^6+2S^5+S^4+8S^3+4S^2+15S+1562)

= 6S^5+10S^4+4S^3+24S^2+8S+15

6S^5+10S^4+4S^3+24S^2+8S+15 = 0

S = -2.18274

Don't know if that will help...

[LLXX]

d/dS(s^6+2S^5+S^4+8S^3+4S^2+15S+1562)

= 6S^5+10S^4+4S^3+24S^2+8S+15

6S^5+10S^4+4S^3+24S^2+8S+15 = 0

S = -2.18274

Fixed.

[ripken204]

ya, just plug it into a calc and u should get the roots, although i havnt tried it yet. just graph and see where x=0

[Zxian]

@gamehead - that'll give you where the original equation is flat (i.e. a maxima or minima). It unfortunately won't give you the zeros of the equation.

[gamehead200]

I know. I just wanted to get in on the conversation!

[EchoNoise]

My head hurts

[RJM]

But S=2.9881167 gives you an error of only 0.000015

[XP-is-a-CRAP]

@gamehead - that'll give you where the original equation is flat (i.e. a maxima or minima). It unfortunately won't give you the zeros of the equation.

BUT I can check the "flat" points for minima, and if all of them are >0 then the fact is proven that

no usable (real numbers) solution exists.

BTW: A flat point does NOT necessarily bring an extreme ... check "y=x^3" function.

Anyone can generate and post the graph of the function on left side of the original equation, so we can see what we are trolling about ?

[LLXX]

The graph is very misleading. At different magnifications it looks very different.

http://img218.imageshack.us/img218/6613/plot1bu7.png

http://img140.imageshack.us/img140/8462/plot2tg3.png

[xtremee]

@ all

1st thanks for trying to help me

2nd sorry for late in my reply

i wanna an easy and quickly method that i can use to solve equation of order 6, 5 and 4

and i don't wanna the solution for 6 order equation that i post in the head of the topic. this equation for example only

@gamehead200,

Why you Diff. (d/ds) HOw it can help?

Regards,

Xtremee

Edited November 8, 2006 by xtremee