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Unit 6: Properties of Definite Integral
Notes
Did u know? The properties of definite integral make the integration simpler.
6.1.1 Integrability on all Subintervals
When a function involves a calculus integral on an interval it must also contain a calculus
integral on all subintervals.
Theorem (integrability on subintervals): If f is integrable on a closed, bounded interval [a,b] then
f is integrable on any subinterval [c,d] [a,b].
6.1.2 Additivity of the Integral
When a function involves a calculus integral on two contiguous intervals it must also contain a
calculus integral on the amalgamation of the two intervals.
Did u know? The integral on the large interval is the sum of the other two integrals.
Theorem (additivity of the integral): Suppose f and g be integrable functions on the interval
[a; b]. Subsequently f +g is also integrable on [a; b] and we have
b b b
a f g x dx a f x dx a g x dx .
Proof:
Let f and g are integrable on [a; b]. Select an arbitrary n N. Then we observe that there exists a
b 1 b 1 1
I
step function s f so that s n x dx I f a f x , or else f would be an
dx
n a 4n 4n 4n
b
a
upper bound to S = { s x dx s f ; s is a step function} less than f , in destruction of the
I
I
definition f sup S
Similarly we locate t s and with t , b t x dx a b f x dx 1 , a b n s x dx a b g x dx 1 .
n , n n a n 4n 4n
b b 1
and n t x dx a g x dx .
a 4x
Merging these equations, and by means of the additivity for step functions provides us
That
b b b 1
s
a n n s x dx a f x dx a g x dx 2n ,
b b b 1
dx
t
a n n t x dx a f x dx a g x 2n .
Furthermore we know that s n s f g t n t (for all n N), so s n s is a step function
n n n
bounding f + g from below, and t n t is a step function bounding f + g from above. Therefore
n
we locate that (still, for all n N) we have
b b 1 b b 1
a f x dx a g x dx 2n I f g I f g a f x a g x 2n
dx
dx
for all n N.
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