Hi, I tried to solve the below equation(roots of w) in Matlab but it gave me no explicit solution. Please help to explain it.
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syms w s
eqn =(59049*pi^4*conj(s)^4 + 1492992*s^4*conj(s)^2 + 2985984*s^4*conj(s)^4 + 1327104*s^6*conj(s)^2 + 2654208*s^6*conj(s)^4 + 2654208*s^8*conj(s)^2 + 5308416*s^8*conj(s)^4 + 1679616*s^4 + 1492992*s^6 + 2985984*s^8 - 734832*pi^2*s^2*conj(s)^2 + 326592*pi^2*s^2*conj(s)^4 - 14405040*pi^2*s^4*conj(s)^2 - 7527168*pi^3*s^2*conj(s)^4 - 21301056*pi^2*s^4*conj(s)^4 - 25365312*pi^2*s^6*conj(s)^2 + 2987442*pi^4*s^2*conj(s)^4 - 16049664*pi^3*s^4*conj(s)^4 - 41202432*pi^2*s^6*conj(s)^4 - 11695104*pi^2*s^8*conj(s)^2 + 6730857*pi^4*s^4*conj(s)^4 - 9517824*pi^3*s^6*conj(s)^4 - 19574784*pi^2*s^8*conj(s)^4 + 4735584*pi^4*s^6*conj(s)^4 - 995328*pi^3*s^8*conj(s)^4 + 933120*pi^4*s^8*conj(s)^4 + 108527616*s^6*w^2*conj(s)^2 - 94371840*s^6*w^2*conj(s)^4 - 108527616*s^6*w^4*conj(s)^2 - 94371840*s^8*w^2*conj(s)^2 + 94371840*s^6*w^4*conj(s)^4 - 75497472*s^8*w^2*conj(s)^4 + 94371840*s^8*w^4*conj(s)^2 + 343932928*s^8*w^4*conj(s)^4 - 536870912*s^8*w^6*conj(s)^4 + 268435456*s^8*w^8*conj(s)^4 + 34836480*pi*s^4*conj(s)^2 + 35831808*pi*s^4*conj(s)^4 + 70668288*pi*s^6*conj(s)^2 + 76529664*pi*s^6*conj(s)^4 + 35831808*pi*s^8*conj(s)^2 + 40697856*pi*s^8*conj(s)^4 - 41554944*pi*s^4*w^2*conj(s)^2 - 48771072*pi*s^4*w^2*conj(s)^4 - 240205824*pi*s^6*w^2*conj(s)^2 - 260898816*pi*s^6*w^2*conj(s)^4 + 156598272*pi*s^6*w^4*conj(s)^2 - 39370752*pi*s^8*w^2*conj(s)^2 + 711327744*pi*s^6*w^4*conj(s)^4 - 218431488*pi*s^8*w^2*conj(s)^4 + 3538944*pi*s^8*w^4*conj(s)^2 - 544210944*pi*s^6*w^6*conj(s)^4 + 441974784*pi*s^8*w^4*conj(s)^4 - 364904448*pi*s^8*w^6*conj(s)^4 + 100663296*pi*s^8*w^8*conj(s)^4 + 16936128*pi^2*s^4*w^2*conj(s)^2 + 9346752*pi^3*s^2*w^2*conj(s)^4 - 204970752*pi^2*s^4*w^2*conj(s)^4 + 74400768*pi^2*s^6*w^2*conj(s)^2 - 3656664*pi^4*s^2*w^2*conj(s)^4 + 207645120*pi^3*s^4*w^2*conj(s)^4 + 223653888*pi^2*s^4*w^4*conj(s)^4 - 117854208*pi^2*s^6*w^2*conj(s)^4 - 44043264*pi^2*s^6*w^4*conj(s)^2 + 21316608*pi^2*s^8*w^2*conj(s)^2 - 46650168*pi^4*s^4*w^2*conj(s)^4 - 190335744*pi^3*s^4*w^4*conj(s)^4 + 242313984*pi^3*s^6*w^2*conj(s)^4 + 57765888*pi^2*s^6*w^4*conj(s)^4 + 79589376*pi^2*s^8*w^2*conj(s)^4 - 9621504*pi^2*s^8*w^4*conj(s)^2 + 39715920*pi^4*s^4*w^4*conj(s)^4 - 57301344*pi^4*s^6*w^2*conj(s)^4 - 368934912*pi^3*s^6*w^4*conj(s)^4 + 44015616*pi^3*s^8*w^2*conj(s)^4 + 113836032*pi^2*s^6*w^6*conj(s)^4 - 185057280*pi^2*s^8*w^4*conj(s)^4 + 90512640*pi^4*s^6*w^4*conj(s)^4 - 14307840*pi^4*s^8*w^2*conj(s)^4 + 136138752*pi^3*s^6*w^6*conj(s)^4 - 102739968*pi^3*s^8*w^4*conj(s)^4 + 209977344*pi^2*s^8*w^6*conj(s)^4 - 37946880*pi^4*s^6*w^6*conj(s)^4 + 34110720*pi^4*s^8*w^4*conj(s)^4 + 77414400*pi^3*s^8*w^6*conj(s)^4 - 84934656*pi^2*s^8*w^8*conj(s)^4 - 29030400*pi^4*s^8*w^6*conj(s)^4 - 17694720*pi^3*s^8*w^8*conj(s)^4 + 8294400*pi^4*s^8*w^8*conj(s)^4)/(5308416*s^8*conj(s)^4) == 0
w=solve(eqn,w)
Warning: Explicit solution could not be found. > In solve at 179
w =
[ empty sym ]
Antworten (1)
Roger Stafford
am 11 Apr. 2015
Bearbeitet: Roger Stafford
am 11 Apr. 2015
0 Stimmen
I believe you have an eighth degree polynomial in w with only even powers, so it can be regarded as a fourth degree polynomial in v = w^2. There does exist an analytic solution for fourth degree polynomials, and taking the two square roots of each of its four roots would give you the eight roots of w as analytic expressions (though in your case hideously complicated) in terms of s. Therefore, in theory, 'solve' should have given you an answer. However apparently its complexity proved to be too much for the poor creature and it gave up. There are some definite limitations to what 'solve' can accomplish.
If you first use the symbolic toolbox to do a 'collect' of the like powers of w, you could write a function which receives the value 's' and calls on 'roots' with the five coefficients you have found to obtain the eight corresponding roots of w. Doing this would probably be simpler than having to deal with quartic polynomial root formulas which are quite complicated.
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