Fundamental Thm O Calculus Flashcards
What is linearity of integration
Linearity of integration is:
If f,g are integrable on [a,b] then f+g is integrable and integral (f+g) = integral f + integral g
Integral b down to a Af = A integral b down to a f
If f(x) <= g(x) for all a,b in interval, what does this mean for the integrals
If f(x) <= g(x) for all a,b in interval, then integral b down to a f(x) <= integral b down to a g(x)
If f is integrable on [a,b], then what does it mean for mod(f)
If f is integrable on [a,b], it means mod(f) is integrable on [a,b] and mod( integrable b down to a f) <= integral b down to a mod(f)
What is 1st version of fundamental theorem of calculus
1st version of fundamental theorem of calculus is:
There is a function I : [a,b] to R s.t
F is continuous and differentiable on [a,b]
F’(x) = f(x) F is primitive/derivative of f
Then integral b down to a f = F(b) - F(a)
What does the mean value theorem state
Mean value theorem states:
F(Xj+1) - F(Xj) = F’(Cj)(Xj+1 - Xj)
If F(x) = integral x down to a f, then what is F
If F(x) = integral x down to a f, then F is:
Continuous on [a,b]
If f is continuous on (a,b), then F’(x) = f(x) for all x in (a,b)
What does 2nd version of fundamental theorem of calculus state
2nd version of fundamental theorem of calculus states:
Define F = integral x down to a f
Then F: [a,b] to R is continuous on [a,b]
F’(c) = f(c) if f is continuous at c in (a,b) (then F is differentiable at c )
What happens if f is not continuous at c
If f is not continuous at c then:
In general F may not be differentiable at c, but if f is increasing it is integrable
