Homework SourseApply Theorem 11 to find a minimum value for the radius of c
Apply Theorem 1.1 to find a minimum value for the radius of convergence of a power series solution at x_0 of the following equations. (x + 1)y\" - 3xy + y = 0, x_0 = 1 xy\" + 2x/1 - x y\' - (sin^2 x) y = 0, x_0 = 0![Apply Theorem 1.1 to find a minimum value for the radius of convergence of a power series solution at x_0 of the following equations. (x + 1)y\](/WebImages/11/apply-theorem-11-to-find-a-minimum-value-for-the-radius-of-c-1006473-1761518901-0.webp "Apply Theorem 1.1 to find a minimum value for the radius of convergence of a power series solution at x_0 of the following equations. (x + 1)y\")
Solution
Given
1. (x+1)y\'\'-3xy+y=0
In standard form this differential equation can be written as
Y\'\' - 3X/(X+1) Y\' + Y =0
The singular point for this equation is
x+1 = 0
x= -1
The distance from this singular point to the point x0=1 is x=-1
so the radius of convergence is greater than or equal to -1
r > = -1
2 . xy\'\' + 2x/(1-x) Y\' - (sin^2x)y = 0
Y\'\' + 2x/x(1-x)Y\' - sin^2x/x y = 0
the singular point for this equation is 1-x=0
x=1
The distance from this singular point from x0=0 is 1
so the radius of convergence is greater than or equal to 1
r>=1
