Problem 13 (9 point) Circle your answer for the following statement (True or False). If it...
plz explain why (a) If f(x) is continuous on (a, b), then f(x) +\J(r)l do s ſ. 2. \f(x)\dx Answer: True False (b) ST sec(x) tan(x) dx = sec(x)*/3 = sec(7) - sec(1/3) = -1 -2 = -3 #/3 Answer: True False 1 = +00 (c) If an > 0 for all n > 1 and a, converges, then lim 100 Answer: True False
1. Determine whether the statement is true or false. If false, explain why and correct the statement (T/FIf)exists, then lim ()f) o( T / F ) If f is continuous, then lim f(x) = f(r) (TFo)-L, then lim f(x)- lim F(x) "( T / F ) If lim -f(x)s lim. f(x) L, then lim f(x)s 1. "(T/F) lim. In x -oo . (T/F) lim0 ·(T / F ) The derivative f' (a) is the instantaneous rate of change of y...
any help would be awesome Explain why or why not Determine whether the following state- ments are true and give an explanation or counterexample. a. The sum Σ is a p-series. b. The sumeve IS a p-series. c. Suppose f is a continuous, positive, decreasing function, for re l'and ak =f(k), for k = 1,2,3, . . . . If Σ@g converges to L, then | f(x) dx converges to L. d. Every partial sums, of the series Σ underestimates...
#55, 59 In Exercises 55 and 56, determine whether the statement is true or false. If it is true, explain why it is true. If it is false, give an example to show why it is false. 55. If f is continuous at x = a, then f is differentiable at x = a. 56. If f is continuous at x = a and g is differentiable at x = a, then lim f(x)g(x) = f(a)g(a). X 57. Sketch the...
Determine if the statement is True or False. You do not need to explain your choice. (T/F) a. Any two vectors can be added together. b. If I = c is not in the domain of f(x) and a <csb, then | slo) do f(1) dar is an improper integral (T/F) c. It is possible for a series (-1)*ax to converge and at to diverge. (T/F) d. The vectors u xv and v x u can never be equal. (T/F)...
Detailed proof please. . 1. Determine whether the following statements are true or false. If one is true, provide a proof. If one is false, provide a counterexample (proving that it is in fact a counterexample). IF f is a positive continuous function on [1,00) and (f(x))2dx converges, THEN Sº f(x)dx converges. • IF f is a positive continuous function on [1,00) such that limx700 f(x) O and soon f(x)dx converges, THEN S ° (f (x))2dx converges. IF f is...
11. Circle true or false. No justification is needed. (14 points) (a) If f(x) - o(g(x), and both functions are continuous and positive, then fix dz converges. TRUE FALSE (b) If f(x)- o(g(x)), then f(x)gx)~g(x). TRUE FALSE (c) If the power series Σ an(x + 2)" converges atェ= 5, then it must km0 converge at =-6. TRUE FALSE (d) There exists a power series Σ akz" which converges to f(z)-I on some interval of positive length around FALSE TRUE (e)...
7. [9 pointa) True/Fale: If the answer is true, explain why. If the answer is false, provide a counterample. (n) If the lim -0, then the series in convergemt. (6) 14 869) = , then , * fle)dx = E 8. 18 points) Find the Taylor series for cos(x) centered at a - written out and using the notation. Show it in both forms of the expanded sum
1. Circle T if the statement is correct, and F if it's false (2 pts for each correct answer; no partial credit). 7+1 (a) (2 pts) If partial sums of the series are Sn= then the series converges. T F n + 1 (b) (2 pts) If an = then the series an converges. T F n=1 (c) (2 pts) If an converges then the series lan converges. T F
Determine whether the statement is TRUE or FALSE. You are NOT required to justify your answers. (a) Suppose both f and g are continuous on (a, b) with f > 9. If Sf()dx = Sº g(x)dx, then f(x) = g(x) for all 3 € [a, b]. (b) If f is an infinitely differentiable function on R with f(n)(0) = 0 for all n = 0,1,2,..., then f(x) = 0 for all I ER. (c) f is improperly integrable on (a,...