for A being non empty closed_interval Subset of REAL
for D being Division of A st vol A = 0 holds
len D = 1

for A being non empty closed_interval Subset of REAL holds
( chi (A,A) is integrable & integral (chi (A,A)) = vol A )

for A being non empty closed_interval Subset of REAL
for f being PartFunc of A,REAL
for r being Real holds
( ( f is total & rng f = {r} ) iff f = r (#) (chi (A,A)) )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL
for r being Real st rng f = {r} holds
( f is integrable & integral f = r * (vol A) )

for A being non empty closed_interval Subset of REAL
for r being Real ex f being Function of A,REAL st
( rng f = {r} & f | A is bounded )

for A being non empty closed_interval Subset of REAL
for f being PartFunc of A,REAL st vol A = 0 holds
( f is integrable & integral f = 0 )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded & f is integrable holds
ex a being Real st
( lower_bound (rng f) <= a & a <= upper_bound (rng f) & integral f = a * (vol A) )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL
for T being DivSequence of A st f | A is bounded & delta T is convergent & lim (delta T) = 0 holds
( lower_sum (f,T) is convergent & lim (lower_sum (f,T)) = lower_integral f )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL
for T being DivSequence of A st f | A is bounded & delta T is convergent & lim (delta T) = 0 holds
( upper_sum (f,T) is convergent & lim (upper_sum (f,T)) = upper_integral f )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded holds
( f is upper_integrable & f is lower_integrable )

let A be non empty closed_interval Subset of REAL;
let IT be Division of A;
let n be Nat;

for A being non empty closed_interval Subset of REAL ex T being DivSequence of A st
( delta T is convergent & lim (delta T) = 0 )

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded holds
( f is integrable iff for T being DivSequence of A st delta T is convergent & lim (delta T) = 0 holds
(lim (upper_sum (f,T))) - (lim (lower_sum (f,T))) = 0 )

for C being non empty set
for f being Function of C,REAL holds
( max+ f is total & max- f is total )

for C being non empty set
for X being set
for f being PartFunc of C,REAL st f | X is bounded_above holds
(max+ f) | X is bounded_above

for C being non empty set
for X being set
for f being PartFunc of C,REAL holds (max+ f) | X is bounded_below

for C being non empty set
for X being set
for f being PartFunc of C,REAL st f | X is bounded_below holds
(max- f) | X is bounded_above

for C being non empty set
for X being set
for f being PartFunc of C,REAL holds (max- f) | X is bounded_below

for A being non empty closed_interval Subset of REAL
for X being set
for f being PartFunc of A,REAL st f | A is bounded_above holds
rng (f | X) is bounded_above

for A being non empty closed_interval Subset of REAL
for X being set
for f being PartFunc of A,REAL st f | A is bounded_below holds
rng (f | X) is bounded_below

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded & f is integrable holds
max+ f is integrable

for C being non empty set
for f being PartFunc of C,REAL holds max- f = max+ (- f)

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded & f is integrable holds
max- f is integrable

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded & f is integrable holds
( abs f is integrable & |.(integral f).| <= integral (abs f) )

for a being Real
for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st ( for x, y being Real st x in A & y in A holds
|.((f . x) - (f . y)).| <= a ) holds
(upper_bound (rng f)) - (lower_bound (rng f)) <= a

for a being Real
for A being non empty closed_interval Subset of REAL
for f, g being Function of A,REAL st f | A is bounded & a >= 0 & ( for x, y being Real st x in A & y in A holds
|.((g . x) - (g . y)).| <= a * |.((f . x) - (f . y)).| ) holds
(upper_bound (rng g)) - (lower_bound (rng g)) <= a * ((upper_bound (rng f)) - (lower_bound (rng f)))

for a being Real
for A being non empty closed_interval Subset of REAL
for f, g, h being Function of A,REAL st f | A is bounded & g | A is bounded & a >= 0 & ( for x, y being Real st x in A & y in A holds
|.((h . x) - (h . y)).| <= a * (|.((f . x) - (f . y)).| + |.((g . x) - (g . y)).|) ) holds
(upper_bound (rng h)) - (lower_bound (rng h)) <= a * (((upper_bound (rng f)) - (lower_bound (rng f))) + ((upper_bound (rng g)) - (lower_bound (rng g))))

for a being Real
for A being non empty closed_interval Subset of REAL
for f, g being Function of A,REAL st f | A is bounded & f is integrable & g | A is bounded & a > 0 & ( for x, y being Real st x in A & y in A holds
|.((g . x) - (g . y)).| <= a * |.((f . x) - (f . y)).| ) holds
g is integrable

for a being Real
for A being non empty closed_interval Subset of REAL
for f, g, h being Function of A,REAL st f | A is bounded & f is integrable & g | A is bounded & g is integrable & h | A is bounded & a > 0 & ( for x, y being Real st x in A & y in A holds
|.((h . x) - (h . y)).| <= a * (|.((f . x) - (f . y)).| + |.((g . x) - (g . y)).|) ) holds
h is integrable

for A being non empty closed_interval Subset of REAL
for f, g being Function of A,REAL st f | A is bounded & f is integrable & g | A is bounded & g is integrable holds
f (#) g is integrable

for A being non empty closed_interval Subset of REAL
for f being Function of A,REAL st f | A is bounded & f is integrable & not 0 in rng f & (f ^) | A is bounded holds
f ^ is integrable