Problem 7. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) Given that a function f(x) has...
Problem 13. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) If f(x) = 3x + 4 x + 1 then f(n + 1) = 3n +7 A. n+2 5x + 7 B. x + 2 3n +7 C. n + 1 D. 7 2 3n +4 E. n+1 Entered Answer Preview Problem 15. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) In a standard coordinate system, the graph of the equation y = 2x - 8 is O A. a...
Problem 7. (1 point) Given that a function f(x) has a tangent line at x = 3 given by y 7(x – 3) +1. Which of the following could be the Taylor Series representation for f(x)? O 7 A. (2-3)" non! O 0+ (7)" B. (2-3)" n! n0 c. 1+ (7)" n! (2x - 3)" O D. 1 (x - 3)" n!
(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 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)"
Problem 20. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) The inequality (x - 41 < 7 is equivalent to O A. x > -3 or x > 11 OB. x < -3 O C.x < 11 O D. x > 11 or x < -3 O E. -3 < x < 11 Entered Answer Preview Jump to Problem: [ 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 Preview Test Grade Test...
Problem 1. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) Use sigma notation to write the Taylor series about x = xo for the function. e4t, xo = : Taylor series = k=0 Entered Answer Preview
Problem 4. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point) Line tangent to an implicitly defined curve. Find the equation of the line tangent to the graph of x4y - 2y3 = 48 at the point (-2,2). Type answer in form y = mx + b. Entered Answer Preview Problem 5. PREVIEW ONLY -- ANSWERS NOT RECORDED (1 point)
(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
please answer all... thank u Problem 1. PREVIEW ONLY -- ANSWERS NOT RECORDED The Leibnitz notation for the chain (4 points) Suppose y = sin(-3x? - 3x + 1). We can write y = sin(u), where u = dy dy du du nule is The factors are (written as a function of u ) and dx du dx du dx function of x for u to get Now substitue in the dy dx (written as a funct as a function...