(1 point) Represent the function 82 2+2 as as a power series f(z) = { Co...
82 00 (1 point) Represent the function as a power series f(z) = 42" 2+2 n=0 CO 0 C1 4 0 C3 = 1/2 C4 = 1/4 Find the radius of convergence R = I
Сл 00 (1 point) Represent the function as a power (1 - 90) r series f(2)= ES n=0 = C1 = C2 C3 CA = Find the radius of convergence R =
(1 point) The function f(3) = ln(1 – z?) is represented as a power series f(3) = EMOCI" Find the FOLLOWING coefficients in the power series. Со Il C1 = C2 = C3 = C4 Find the radius of convergence R of the series. R=
2x (1 point) Represent the function as a power series f(x) = { Cnx" 4 + x n=0 Co = 0 C1 = 1 C2 = C3 = C4 = Find the radius of convergence R =
3 is represented as a power series: (1 point) The function f(x) 1+36x2 Σ f(x) - n-0 Find the first few coefficients in the power series. CO CI C2 C3 CA Find the radius of convergence R of the series R =
00 (1 point) Represent the function 3 (1 - 2x) as a power series f(x) = { n=0 3 C1 = 9 C2 = 300 C3 = 3000 C4 = 30000 Find the radius of convergence R =
- (1 point) The function f(x) 4 (1-2x)2 is represented as a power series f(x) = 0,*". n=0 Find the first few coefficients in the power series. Co = C1 = C2 = C3 = C4 = Find the radius of convergence R of the series. R=
7 Represent the function - as a power series f(x) = { 1 – 40 Chan n=0 Compute the first few coefficients of this power series: Co = Preview C1 = Preview C2 Preview C3 = Preview C4 = Preview Find the radius of convergence R = Preview Get help: Video
9 (1 point) The function f(1) = 11622 is represented as a power series: f(x) = 42" Find the first few coefficients in the power series. Co = 9 C1 = -9*16 C2 = 9*16^2 C3 = -9*1643 9*16^4 Find the radius of convergence R of the series. R= 1/4
(1 point) The function f(x) = 4x arctan(6x) is represented as a power series f(x) = Xcnx". n=0 Find the first few coefficients in the power series. co = 0 Ci = 0 C2 = 24 C3 = 0 C4 = -288 Find the radius of convergence R of the series. R= II