Hi Is there any way by maple to determine the real roots of the plolynomial of order 6 R:= 3*alpha^6-6*alpha^5*delta+(6*delta*a-c_p+mu^2-4*a^2)*alpha^4+mu^2*(6*delta*a-c_p+mu^2-4*a^2)*alpha^2-6*delta*alpha*mu^4+3*mu^6 based on the constants parameters mu, a, delta and c_p. The only information about this polynomial I found is that R has even number of real solutions. This is because mu^6*R(alpha)-R(mu^2/alpha)=0 Thanks Sayed

Please Wait...