23. If f is continuous and a < b, then integral (a,b) f(x) dx = ?Integral (b,a)

Question

23. If f is continuous and a < b, then integral (a,b) f(x) dx = ?Integral (b,a) f(x) dx.

24.Integral (a,a) f(x) dx = 0.

25.Integral (b,a) c dx = c(b ? a), where c is any constant.

26. If f is continuous on an interval containing a, b, and c, then Integral (b,a) f(x) dx =Integral (c,a) f(x) dx ? Integral (c,b) f(x)dx.

27. If Integral ( b,a) f(x) dx >_ 0, then f(x) >_0 on [a, b].

28. d/dx Integral (x,a) f(t) dt = f(x), where f is a continuous function.

29. To check whether the general indefinite integral that you calculated is correct, simply take its derivative anddetermine if you end up with the integrand that you started with.

Explanation / Answer

23 false . that will be -ive of each other

24) true

25) true if there is -ive sign b/w b and a

26) false

27) true

28) false

29) true

Related Questions

Navigate

• Browse (All)
• Browse 2
• Subjects

Integrity-first tutoring: explanations and feedback only — we do not complete graded work. Learn more.