Advanced Math Archive: Questions from May 12, 2022
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Use runge-kutta Numerical method to solve pls
Runge Kutta method = = 8 y'= 2x - y 9 y'= x - y2 10 y' = y2 – xy 11 y'= 2x+y 12 y'= 1- x/y x = 0, y = 1 x= 0, y1 x = 0, y = 0-4 x = 1, y = 2 x = 0, y = 1 x=0(0-2)1.0 x=0(0-1)0.5 x = 0(0.2)1.0 x = 1.0 answers -
Use the method of Frobenius to obtain series solutions of the following 3xy" + y - y = 0. y" + y = 0. y" – xy = 0. 3xy" + 4y' + y = 0. y" - xy + y = 0. xy" – 3y' + y = 0. xy" + y' - 3y = 0.1 answer -
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Halle la solución del problema de valor inicial 09 y" - 24"+y = 4– 12e* + 20258, 20) = V10- _ 1'(0) = " * + - 5 4 4 4. y" + 2y - 24y= 4 - (x + 2)e4x PREGUNTA 5. QUESTION 1. Determine la solución d1 answer -
PROBLEMA 3. Halle la solución general de la ecuación diferencial no homogénea con coeficientes constantes Find the general solution of the nonhomogeneous linear differential equation with constant1 answer -
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The general solution for the DE- 2y – 2y = is Od. = ceX(1 +v3) + czeX(1 v3). . . y e. None of these. O O b. C. y = que cos(x^3) + cze' sin(xv3. y= q xexv3 + Czexva cı y= Ge\V3 + cze-xv3 - O a.1 answer -
help please!
x = 2 + 3+ - 1800, y = 2+3 + 3t2 + 5 horizontal tangent (x, y) = vertical tangent (x, y) =1 answer -
Solve the following integrals
EJERCICIO 4.84. Resuelve las siguientes integrales: ei (a) ſedz , para r(t) = exp(it) con 0 st 5 27. , y(1 answer -
Find the residuals of the following functions at the indicated points. Use the theorem
EJERCICIO 4.82. Encuentre los residuos de las siguientes funciones en los puntos indicados: e-1 (a) en zo = 0; sen 1+e (b) en zo = 0; 24 Teorema 4.3. Si f tiene un polo de orden n en zo entonces 1 R1 answer -
3. Find the real functions u(x, y) and v(x, y) where R(z) = x and I(z) = y = 1 끓 = = u(x, y) + iv(x,y) 221 answer -
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In Exercises 17–24 solve the initial value problem. 4 17. y' -6 -2 y, y(0) = 5 2 3 18. y' = 7 15 -3 1 y, y(0) = 19. y 7 3 - 15 -5 y, y(0) = = [ [- 17 7 20. y -2 2 y, y(0) = 5 21. y - - do 1 2 2 -3 21 answer -
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Give reasons for your choices. II. F(x, y) = (y,x) 12. F(x, y) = (1. sin y) 13. F(x, y) = (x - 2, x + 1) 14. F(x, y) = (y. 1/x) A B 11 1 1 11 1 1 1 1 1 1 11 3 3 5 11 -3 -5 I С IV 1 1 1 1 1 1 11 1 - M1 answer -
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Solve the following integrals. Use the residue theorem
Teorema 4.1 (Teorema de Residuo). Sea f una función analítica en una región G con excepción de las singularidades aisladas a1, 22, , An, si es una curva cerrada suave a trozos en G, tal que no pas1 answer -
Solve the integrals. Use the residue theorem
(1) | (x – a)2 +1 2 dx a xdx x4 + x2 +1' (g) 09 0 Teorema 4.1 (Teorema de Residuo). Sea f una función analítica en una región G con excepción de las singularidades aisladas a1, 22, , An, si es1 answer -
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