So f(x) in option (B) satisfy both condition f(3)=1, and f'(3)=7 so option B is correct.
Problem 7. (1 point) Given that a function f(x) has a tangent line at x =...
(1 point) Given that a function f(x) has a tangent line at 4 given by y = 6(x – 4) +5. Which of the following could be the Taylor Series representation for f(x)? 0 5+ (6)" A. (2 - 4)" n! 10 00 5 B. (2 - 4)" O 4+ (2)" C. ( no n! 4)" 6 D. (2 on! n0 4)"
(1 point) Given that a function f(+) has a tangent line at x = 3 given by y = 9(2 - 3) + 6. Which of the following could be the Taylor Series representation for f(x)? A 5 n! (x - 3)" 8.5+ ()" (2 – 3)" B n! 9 (-3) D.6+ () (31 - 3)"
(1 point) Given that a function f(x) has a tangent line at x = 4 given by y = 9(x – 4) + 12. Which of the following could be the Taylor Series representation for f(x)? 00 A. (x – 4)" n! n=0 B. 12 + (9)" -(x – 4)" n! n=0 Ž 11 + (-2)" -(x – 4)" n! n=0 -(x – 4)" n! n=0
(1 point) Given that a function f(x) has a tangent line at x = 4 given by y = 9(x – 4) + 12. Which of the following could be the Taylor Series representation for f(x)? 00 A. (x – 4)" n! n=0 B. 12 + (9)" -(x – 4)" n! n=0 Ž 11 + (-2)" -(x – 4)" n! n=0 -(x – 4)" n! n=0
Problem 7. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) Given that a function f(x) has a tangent line at x = 2 given by y 6(x - 2) + 4. Which of the following could be the Taylor Series representation for f(x)? A. 3 (x - 2) B. Σ 4+ (6)" (x - 2)" ! C 3+ (3)" -(x - 2)" ! D. 3x - 27"
(1 point) In order to determine the convergence or divergence of the series (-6)" (n2 + 6n) 51+1 n=1 we calculate the limit I needed to run the Ratio Test. Which of the following values would we get? -6 A. L 30 6 B. L= olo olio C. L D. L= 0 E. L=0. F. the limit L does not exist. (1 point) Given that a function f(x) has a tangent line at x = 2 given by y =...
(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.
(1 point) Consider a function f(x) that has a Taylor Series centred at x = -3 given by an(x + 3)" n=0 If the radius of convergence for this Taylor series is R = 4, then what can we say about the radius of convergence of the Power Series Š an -(x + 3)" ? no n=0 A. R= 2 4 OB.R = 6 OC. R = 4 OD. R = 24 O E. R= 8 F. It is impossible...
72 Partial Derivatives: Problem 16 Next Previous Problem List (1 point) Suppose the f(x, y) is a smooth function and that its partial derivatives have the values, f(0,-4) 5 and f,(0, -4) =-1. Given that f(0,-4) = 0, use this information to estimate the value of f(1,-3) Note this is analogous to finding the tangent line approximation to a function of one variable. In fancy terms, it is the first Taylor approximation. Estimate of (integer value) f(1,-3) 72 Partial Derivatives:...