Find the general solution around x=0 for (x^2-x)y’’-xy’+y=0
25.0 The solution of the differential equation 3x?y* + xy + y = 0(x > 0) is the function y(x) = C, y(x) + C, Y.(x). Find y, (x) and y(x). Also, find the constants, and if y(t)- 2. y1)-2. O A. y. V2 COS Y;x) .6, -2,6-2V2 4.-2,6--2V2 ΕΕΕ OC. y. - 00.30He com mo).wow - 25 m (12 moco). -(02) 6.-2,0-2v3 Us confic). -* [* mc) LK oots To C) In(x)) (x), -2,4,-- ODY,00 -
2a,2b, and 2c 1. Assuming x > 0, find the general solution of the following Euler equa- tions. f) 5x2y" +12xy' +2y = 0 g) 2y"xy 0 h) a2y" - 2xy =0 i) a2y"-ay-n(n + 2)y 0, where n is a positive integer a) x2y"-3ay 4y 0 b) x2y"-5ay +10y 0 c) 6x2y" +7xy - y 0 d) xy"y0 e) x2y"-3ay' +13y 0 2. Find the solution of the following problems. Before doing these prob- lems, you might want to...
Q #1 (2 marks) Find the general solution for the DExy'-ymx1y, x>0, y>0.
First-Order ODE (a) .Find the general solution of the following ODE: (b). Find the general solution (for x > 0) of the ODE : Hint: try the change of variables u ≜ x, v ≜ y/x. (c). Find the solution to the ODE that satisfies y(2) = 15. Hint: Try separation of variables. For integration, try partial fraction decomposition. 2Ꮖy 2 Ꭸ , . + <+5 12 , fi - z - ,fix = zu y' = y2...
1. Consider the equation xy" - 2y' + (2 - x)y = 0,x > 0. We can easily verify that y(x) = e* is a solution of the equation. Use reduction of order to determine the general solution of the equation.
Consider the solution to the IVP y' - xy = x; y(0) = 2 Find y' (0) Consider the solution to the IVP y' - xy = t; y(0) = 2 Find y" (0)
5. Let F(x, y, z) = (yz, xz, xy) and define 2 Crin = {(x,y,z) : x2 + y2 = r2, 2 = h} Show that for any r > 0 and h ER, le F. dx = 0 Crih
Please do 1a 1b 1d thanks Assuming x > 0, find the general solution of the following Euler equa- tions. a) x²y" – 3xy' +4y=0 (b)x²y" – 5xy +10y=0 f) 5x2y" + 12. y' + 2y = 0 g) x²y" + xy = 0 1. Assuming 2 > 0, find the general solution of the following Euler equa- tions. a) " - 3xy' + 4y = 0 b) – 5xy +10g = 0 c) 6x²y" + 7xy' - y =...
( xy 7. CHALLENGE: fxy(x, y) = 0< < 2, 0 <y <1 otherwise 0 Find P(X+Y < 1) HINT: consider the region of the XY plane where the inequality is true.