solving three equations for 3 unknows
Ältere Kommentare anzeigen
Hi Guys, I have the three following equations:
(2*c*w1)+b2 == 0.3205;
((2*c*b2)+ w1)*w1 == 214200;
(b2*w1)==1.2260e+05;
And I need to find the values of: c, w1 and b2.... is there a function for me to do it?
Thanks for your time.
Akzeptierte Antwort
Star Strider
am 10 Jun. 2019
For your system, use vpasolve (link) to get numeric results. You may also need to use the double function if you want to use the results in other calculations.
syms c w1 b2
Eqs = [(2*c*w1)+b2 == 0.3205;
((2*c*b2)+ w1)*w1 == 214200;
(b2*w1)==1.2260e+05];
[c,w1,b2] = vpasolve(Eqs, [c,w1,b2])
4 Kommentare
Valerie Cala
am 10 Jun. 2019
Star Strider
am 10 Jun. 2019
As always, my pleasure.
Each equaton is defined by the product of two of the variables, and in the second equation ‘w1’ is also squared.
It is a vector because all the variables are then defined as 
degree polynomials (the Symbolic Math Toolbox defines them as such with respect to the parameter ‘z’):
degree polynomials (the Symbolic Math Toolbox defines them as such with respect to the parameter ‘z’): c =
(641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1))/490400000 - root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1)^2/245200
(641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2))/490400000 - root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2)^2/245200
(641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3))/490400000 - root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3)^2/245200
(641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4))/490400000 - root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4)^2/245200
w1 =
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1)^3/122600 - (641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1)^2)/245200000 + (1071*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1))/613
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2)^3/122600 - (641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2)^2)/245200000 + (1071*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2))/613
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3)^3/122600 - (641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3)^2)/245200000 + (1071*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3))/613
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4)^3/122600 - (641*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4)^2)/245200000 + (1071*root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4))/613
b2 =
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 1)
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 2)
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 3)
root(z^4 - (641*z^3)/2000 + 214200*z^2 - 15030760000, z, 4)
So there are 4 roots of each variable.
Valerie Cala
am 10 Jun. 2019
Star Strider
am 10 Jun. 2019
As always, my pleasure!
Weitere Antworten (1)
Jon Wieser
am 10 Jun. 2019
0 Stimmen
try:
D=solve('(2*c*w1)+b2 = 0.3205','((2*c*b2)+ w1)*w1 = 214200','(b2*w1)=1.2260e+05;','c','w1','b2')
Kategorien
Mehr zu Mathematics finden Sie in Hilfe-Center und File Exchange
Produkte
am 10 Jun. 2019
am 10 Jun. 2019
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
