1. Suppose that p(x)=∞∑n=0 an x^n converges on (−1, 1], find the internal of convergence of...

1) Suppose that p(x)=∞∑n=0 anx^n converges on (−1, 1], find the internal of convergence of p(8x−5)....

1) Suppose that p(x)=∞∑n=0 anx^n converges on (−1, 1], find the internal of convergence of p(8x−5). x= to x= 2)Given that 11−x=∞∑n=0xn11-x=∑n=0∞x^n with convergence in (−1, 1), find the power series for 1/9−x with center 3. ∞∑n=0 Identify its interval of convergence. The series is convergent from x= to x=

1. Find the radius of convergence for: ∞∑n=1 (−1)^n x^n / √n+9 2. If f(x)=∞∑n=0 n...

1. Find the radius of convergence for: ∞∑n=1 (−1)^n x^n / √n+9 2. If f(x)=∞∑n=0 n /n^2+1 x^n and g(x)=∞∑n=0 (−1)^n n /n^2+1 x^n, find the power series of 1/2(f(x)+g(x)). ∞∑n=0 =

1. Given that 1 /1−x = ∞∑n=0 x^n with convergence in (−1, 1), find the power...

1. Given that 1 /1−x = ∞∑n=0 x^n with convergence in (−1, 1), find the power series for x/1−2x^3 with center 0. ∞∑n=0= Identify its interval of convergence. The series is convergent from x= to x= 2. Use the root test to find the radius of convergence for ∞∑n=1 (n−1/9n+4)^n xn

Given that 1/ 1 − x = ∑ n = 0 x^n with convergence in (−1,...

Given that 1/ 1 − x = ∑ n = 0 x^n with convergence in (−1, 1), find the power series for 1 x with center 5. ∞ ∑ n = 0 Identify its interval of convergence. The series is convergent from x = , left end included (enter Y or N): to x = , right end included (enter Y or N):

Suppose X∞ n=0 cnxn converges when x = −4 and diverges when x = 6. State...

Suppose X∞ n=0 cnxn converges when x = −4 and diverges when x = 6. State if the following series are convergent or divergent, or if there is not information to determine convergence or divergence. (a) X∞ n=0 cn3n (b) X∞ n=0 cn5n (c) X∞ n=0 cn7n

Find the interval of convergence for the series ∑∞n=0(3x+1)n/5n(n+1)  

Find the interval of convergence for the series ∑∞n=0(3x+1)n/5n(n+1)  

Find the interval of convergence of the power series  f ( x ) = ∑ n =...

Find the interval of convergence of the power series  f ( x ) = ∑ n = 1 ∞ ( x + 3 ) n 2 n.

1. The Taylor series for f(x)=x^3 at 1 is ∞∑n=0 cn(x−1)^n. Find the first few coefficients....

1. The Taylor series for f(x)=x^3 at 1 is ∞∑n=0 cn(x−1)^n. Find the first few coefficients. c0=    c1= c2=    c3= c4=   2. Given the series: ∞∑k=0 (−1/6)^k does this series converge or diverge? diverges converges If the series converges, find the sum of the series: ∞∑k=0 (−1/6)^k=

Find a power series representation for the function; determine the interval of convergence. f(X) = (3x^2)/(5x+1)

Find a power series representation for the function; determine the interval of convergence. f(X) = (3x^2)/(5x+1)

Consider The Power Series: ∞∑n=0 (2x)^n a)Find the radius of convergence b)Find the interval of convergence

Consider The Power Series: ∞∑n=0 (2x)^n a)Find the radius of convergence b)Find the interval of convergence