.cl#h)=fcc+h)-pn.ecctw)=tynt.yf?_hnt. "k+oh ) T.tn#mh. f ' " ext C-1) II. : L"Ixn

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7 Suppse pits Thi I l Cii eg T g Cu cii By i Fudmetl Thm_ Let Thm Clculus eitegrk Fc t F tti Ii p the ctiuus ceir i the M s the Ml ; $ e ll Il iths Fr Ltdt cstt E M itegrk c R c d F AEXEB put ucti ctiuus eep itegrk ids the s d IFIEM CECA Tke M itegrk i itegrk ll dctiuus my prticulr I iii iitely ly h q creitegrk eg ig Ci with itegrte itegrte th re c s itegrte g hl Let Tim Suppse uded Thm_ l u D ut k dieretile t Furthermre d X i Fk c ct

8 t Ft i c FHDI ct Fy PI Sice itegrte i Set s M lctsl te uded Give e ys hve / Fcy Ltdt/ FH / utdt gpdt E M y i ly XI ME hve IFCY ME E Th prves tht F ct ctully uit Suppse ct Wt t shw F e Ci Fl l s udt ctdt X X esuplittcl 11 dt 11? Yddt_ ttl H E I 8 whe c Xts sup E Ict c ttl FlEF L i / 5 ttihmdt_ g spllt ttl similrly lessfgp e µ FK i t c } Ft

9 Flk i d Fl Fl Fu Fl Thi I itegrk i there dieretile ucti F i F them c d Fl p p t PI F E ki Mk sice itegrk c id e prtit mk k E t O ech Xkt XD kl i the MVT Flk Nte FHDOXK I ltrdk where tke k d ct 2 Xr Fcr smltk Mk Fl l 5 d e Fl IF d E Mr Xk mk k E Sice ritrrily smll hve Ft hd B * Itegrti sustituti * Itegrti prts

f(t)dt 2δ f(x) f(t)dt 0 and b f(t)dt = 0 gives F (b) = 0. Since F is increasing, this means that

f(t)dt 2δ f(x) f(t)dt 0 and b f(t)dt = 0 gives F (b) = 0. Since F is increasing, this means that Uiversity of Illiois t Ur-Chmpig Fll 6 Mth 444 Group E3 Itegrtio : correctio of the exercises.. ( Assume tht f : [, ] R is cotiuous fuctio such tht f(x for ll x (,, d f(tdt =. Show tht f(x = for ll x [,