The Fundamental Theorem of Calculus True or False

1.	Let For what values of x does F(x) = 0? -> x = 0 True False
2.	Let . For which values of x is F(x) positive? -> x > 1 True False
3.	Define a function F(x) by Which of the following best represents the value F(π)? -> True False
4.	Let f(x) be a continuous function. The second Fundamental Theorem of Calculus says that -> the function is an antiderivative of f(x). True False
5.	Which of the following is NOT an antiderivative of e^{e^x}? -> True False
6.	Which of the following is an antiderivative of cos (x²) that equals 2 when x = π? -> True False
7.	Let and . Then -> 0 True False
8.	The equation means -> F is an antiderivative of f. True False
9.	-> cos (x²) True False
10.	-> e^{x⁶ × 3x²} True False

Submit

Join today and never see them again.

Get Started