Problem 12. (1 point) Consider the function f(0) = %,* cos(t) – 1 dt. +2 Which...
(1 point) Consider the function cos(t) f(x) = dt. Which of the following is the Taylor Series for f(2) centred at x = 0? O (-1)" A. 2n-1 (2n - 1)(2n)! O B. (-1)" (2n – 1)(2n)! 2n-1 +C n0 O C. (-1)" 220-2 (2n +1)! (-1)"(2n - 2) (2n)! D. n=1 2n 3
(1 point) Consider the function f(x) = f* cos(t) – 1 dt. t2 Which of the following is the Taylor Series for f(x) centred at x = 0? w A. (-1)" (2n – 1)(2n)! -x2n- +C. n=0 (-1)"(2n – 2) 2n–3. B. (2n)! n=1 c. Σ (-1)" (2n + 1)! -x2n-2 n=1 D. Š (-1)" -X2n-1 (2n – 1)(2n)! n=1
f(x) = | (1 point) Consider the function cos(t) - 1 dt. Which of the following is the Taylor Series for f(x) centred at 2-07 A (-1)"(2n - 2). 2-3 (2n) B. (-1)" (2n - 1)(2n)! 2-1 + C. no ho 2n-1 (-1)" (2n - 1)(2n)! (-1)"_222 D. (2n +1)!
(1 point) Consider the function f(x) = Es cos(t) – 1 t2 dt. Which of the following is the Taylor Series for f(x) centred at x = 0? 2n-1 Α.Σ (-1)" (2n – 1)(2n)! X +C. n=0 oo 2n-1 B. (-1)" (2n – 1)(2n)!" X n=1 (-1)" X20-2 (2n + 1)! M n=1 D. iM: (-1)"(2n – 2), 2n–3 (2n)! X n=1
point) Consider a function f(x) that has a Taylor Series centred at x = 5 given by ſan(x – 5)" n=0 he radius of convergence for this Taylor series is R= 4, then what can we say about the radius of convergence of the Power Series an ( 5)"? nons A. R= 20 B.R= 8 C. R=4 D. R= E. R= 2 F. It is impossible to know what R is given this information. point) Consider the function f(x) =...
Problem 11. (1 point) Consider the following series Σ 3n2 + 10n6 876 - 772 ). If we were to calculate the limit L needed to run the Root Test, which of the following values would we get? A. L= // B. L = C. L = 1. D. L = 10 E. It diverges Problem 12. (1 point) Consider the function f(x) = cos(t) - 1 dt. 12 Which of the following is the Taylor Series for f(x) centred...
Problem 10. (1 point) Determine the Taylor Series of the function f(2)= 6c2 (1 - 2) centred at = 0. A. 622n+2 n=1 B. 6" 22n n-1 O c.(-6)".2 n=1 O 6 D. 143 on +1 E. 6n2+1+1 n=1
(1 point) Consider a function f(x) that has a Taylor Series centred at x = 1 given by Žar(2 – 1)" n0 If the radius of convergence for this Taylor series is R=2, then what can we say about the radius of convergence of the Power Series an (2 – 1)"? hins A. R= 2 5 OB. R=4 OC. R=2 OD. R=1 O ER= 10 OF. It is impossible to know what R is given this information.
(1 point) Consider a function f(x) that has a Taylor Series centred at x = 1 given by Žar(2 – 1)" n0 If the radius of convergence for this Taylor series is R=2, then what can we say about the radius of convergence of the Power Series an (2 – 1)"? hins A. R= 2 5 OB. R=4 OC. R=2 OD. R=1 O ER= 10 OF. It is impossible to know what R is given this information.
Problem 13. (1 point) Consider a function f(x) that has a Taylor Series centred at x = -1 given by 00 3 4. (x + 1)" HO If the radius of convergence for this Taylor series is R = 2, then what can we say about the radius of convergence of the Power Series Σ ax (x + 1)"? ns 2 IOARE B. R = 10 C. R=4 D. R=1 E. R= 2 F. It is impossible to know what...