Hello, how to solve this equation EIk^4-mv^2k^2+2mvwk+(m+M)w^2=0 numerically where w is variable,

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shoaib Shoaib il 10 Dic 2019

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Commentato: shoaib Shoaib il 12 Dic 2019

Risposta accettata: Star Strider

can we solve this for k numerically, sorry this is fourth order equation not two order

Thanks

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Star Strider il 10 Dic 2019

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Modificato: Star Strider il 10 Dic 2019

Apri in MATLAB Online

Supply all the scalar parameters, then:

Eqn = @(w) E*I*k^2-m*​v^2*k^2+2*​m*v*w*k+(m​+M)w^2;
w0 = 42;
[w,fval] = fsolve(Eqn, w0)

Experiment with the correct value of ‘w0’ to get the correct result.

EDIT — (Dec 10 2019 at 13:18)

The Symbolic Math Toolbox produces:

w = (k*(- E*I*k^2*m - E*I*M*k^2 + 2*m^2*v^2 + M*m*v^2)^(1/2) - k*m*v)/(M + m)

or to calculate both roots:

w = [(k*(- E*I*k^2*m - E*I*M*k^2 + 2*m^2*v^2 + M*m*v^2)^(1/2) - k*m*v)/(M + m)
     -(k*(- E*I*k^2*m - E*I*M*k^2 + 2*m^2*v^2 + M*m*v^2)^(1/2) - k*m*v)/(M + m)]

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Walter Roberson il 12 Dic 2019

Apri in MATLAB Online

syms E I k m v w M
Eqn =  E*I*k^4-m*v^2*k^2+2*m*v*w*k+(m+M)*w^2
sol_exact = solve(Eqn, k, 'MaxDegree', 4);   %valid for symbolic variables, gives LONG exact solutions
sol_numeric = vpasolve(Eqn, k);   %valid only if numeric values are known for everything except k, gives numeric solutions