If a(alpha)= n, some of their solutions are polynomial. Show that p(t)=dˆn/dtˆn (tˆ2 - 1)ˆn is a solution by the follow equation
Legendre Polynomials
If a(alpha)= n, some of their solutions are polynomial. Show that p(t)=dˆn/dtˆn (tˆ2 - 1)ˆn is a solution by the follow equation Legendre Polynomials ) =ア 교흙(t2-1)" son conocidos corno los pol...
If a(alpha)= n, some of their solutions are polynomial. Show that p(t)=dˆn/dtˆn (tˆ2 - 1)ˆn is a solution by the follow equation Legendre Polynomials (e) Los polinomios de Legendre tienen una variedad amplia de aplicaciones aparte de tener aplicaciones en la solución de problemas de vibración de ondas y trans- ferencia de calor. También son útiles para crear reglas de integración numérica. manera de ejemplo, considere el polinomio P.(t). Sus raices son t1/3, veri- fique que f(-1/V3)+ f(-1/v3) da el...
If a(alpha)= n, some of their solutions are polynomial. Show that p(t)=dˆn/dtˆn (tˆ2 - 1)ˆn is a solution by the follow equation Legendre Polynomials. para obtener lo siguiente +(b) Derive n +1 veces la ecuación (-(0-2ntol) para obtener lo siguiente +(b) Derive n +1 veces la ecuación (-(0-2ntol)
TRANSLATION: Derivate n+1 times the equation (t^2-1)v’(t) -2ntv(t)=0 to obtain the following: ------------------------ If a(alpha)= n, some of their solutions are polynomial. Show that p(t)=dˆn/dtˆn (tˆ2 - 1)ˆn is a solution by the follow equation Legendre Polynomials PLEASE HELP ME!! para obtener lo siguiente +(b) Derive n +1 veces la ecuación (-(0-2ntol) para obtener lo siguiente +(b) Derive n +1 veces la ecuación (-(0-2ntol)
From Arfken, demostrate equation 12.85. Step by step solution please. Associated Legendre Polynomials The regular solutions, relabeled pn (x), are (12.73c) These are the associated Legendre functions.16 Since the highest power of x in Pn (x) is xn, we must have m n (or the m-fold differentiation will drive our function to zero) In quantum mechanics the requirement that m n has the physical interpretation that the expectation value of the square of the z component of the angular momentum...