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$Bat>]Grj*K%.uU>Bptى^t:]X{w{%EhH)^Z^HU]!ˑ)vUPyo,kԍȝcbOFLcEW1N/fUXn_$.j%|MT<!8tF57֞Y3"Qw)HL:zQwhgVSؘL,c[3x=u\7 .[97q{&x)4'X;Q ٓէw`!aS.R>nN!:` /2 xڥTIK@~mZ5.]QDA ؋q9 R֥Vɂ_̓GxU"xJ&K3 R! /qHo!t|đfȘXa8Xebe NKb-|6`4A8$2Ѱm5' +,@ 7d Oͣ@[q1~M'ԛꙧз/b~5iO0Z~E-M-[-7_|H?|{%N7zWj^!~Ex')* ܗ\Ű\1|lp,%e?neMK3swl} 'ق߃Z#e (   9Equation Equation.30,Microsoft Equation 3.0  Equation Equation.30,Microsoft Equation 3.0 Equation Equation.30,Microsoft Equation 3.0"Equation Equation.30,Microsoft Equation 3.0&Equation Equation.30,Microsoft Equation 3.03Equation Equation.30,Microsoft Equation 3.0b/ 0DTimes New Roman(0(z[ 0 DSymbolew Roman(0(z[ 0  B . @n?" dd@  @@`` d\H} C'/PR$FE-Qڛb>"R$7Nl0Rc#,)2$2$p>e^sϠ'w82$ziz|-LF&G92$-Lߞ+}D:2$?rouўoPZ(<2$st&pБi>2$aS.R>nN!x@ 0AA 3ffj@33ʚ;ʚ;g4KdKd@z[ 0ppp@ <4!d!dl 0h<4ddddl 0h <4ddddl< 080___PPT10 pp? %             ` ` ̙33` 333MMM` ff3333f` f` f` 3>?" dd@,|?" dd@   " @ ` n?" dd@   @@``PR    @ ` ` p>>  0(  n  VA޽h ?Pergamena ̙33 *Struttura predefinita 0,(    H&))?l` s ,$D  0 HIl differenziale 2033H  0޽h ? ̙33 ___PPT10+tXpD' = @B DP' = @BA?%,( < +O%,( < +D' =%(D/' =%(D' =A@BBB B0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D%' =+4 8?pCBB+#ppt_w*sin(2.5*pi*$)CB?B*Y3>B ppt_w<*D' =+4 8?\CB#ppt_hBCB#ppt_hB*Y3>B ppt_h<*+8+0+ +[p  YQ &(   ! vBCpDEF0pp @ 00 ,$D  0  0쎲 @,$D  0 Sia y=f(x) una funzione derivabile nel punto x , diamo a x un incremento Dx e consideriamo:8\ 2?  s *@33p p,$D  0 V Df= f(x+Dx)-f(x) 2  c 6AparabolaP ,$D 0  08P@,$D 0 5x 2  lBCDEF@6  ,$D  0B  @ s *D0 00 ,$D 0   0 @} ,$D 0 8f(x) 2r   <PPjJ0@,$D   0   0ࡲ 0 ,$D  0 :Dx 2   0<@P,$D  0 L x+ Dx& 2B  s *D00 ,$D   0B @ s *D00,$D 0  0લ ,$D 0 Tf(x+ Dx )& 2r @ 6PPo`P0 ,$D  0  0௲ pd ,$D 0 >Df 2PP  0<P@ 7,$D  0 a/Consideriamo la retta tangente alla curva in x:0 20   BAC DEF1 A@,6 ,$D  0  0Pp P@D ,$D 0 5P 2B  s *D0 `0 ,$D  0  0 0  ,$D 0 5H 2  0L p0 ,$D 0 5Q 2  0ܲ,$D  0 RP'4 2".  0Dɲ@ w,$D  0 <Approssimiamo Df =PH con QHB 2r @ 633o 00 ,$D  0  0tϲy ` ,$D 0 La. 2  0HԲ @0 ,$D 0 Tdf 233z  0ز@  ,$D  0 .QH=Dx tg a = Dx f '(x)z 2  s *\33 p  ,$D  0  d f = Dx f '(x)P 22 & 6op @0 ,$D 0H  0޽h ?& ̙33UU___PPT10U+tOIDvQ' = @B D1Q' = @BA?%,( < +O%,( < +D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-6B%barn(outVertical)*<3<*D.' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bbox(out)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(down)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D9' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-u6Bwipe(right)*<3<* D' =%( D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(DH' =%( D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D#' =+4 8?nCB!#ppt_x-#ppt_w/2BCB#ppt_xB*Y3>B ppt_x<* D' =+4 8?\CB#ppt_yBCB#ppt_yB*Y3>B ppt_y<* D' =+4 8?RCBBCB#ppt_wB*Y3>B ppt_w<* D' =+4 8?\CB#ppt_hBCB#ppt_hB*Y3>B ppt_h<* D' =%( D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(down)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(|D9' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-u6Bwipe(right)*<3<*D' =%(pDF' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-u6Bwipe(right)*<3<*D' =%(dD7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(XD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(DH' =%(LD' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =+4 8?\CB#ppt_xBCB#ppt_xB*Y3>B ppt_x<*D#' =+4 8?nCB!#ppt_y-#ppt_h/2BCB#ppt_yB*Y3>B ppt_y<*D' =+4 8?\CB#ppt_wBCB#ppt_wB*Y3>B ppt_w<*D' =+4 8?RCBBCB#ppt_hB*Y3>B ppt_h<*D' =%(@D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D> ' =%(D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(down)*<3<*D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*&%(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D1' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*!%(D' =-m6Bbox(in)*<3<*!D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*Dx' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bwipe(up)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(++0+ ++0+ ++0+ ++0+  ++0+  ++0+  ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ +og  B $(   9  0p0,$D  0 ?Consideriamo un quadrato di lato x , la sua area sar f(x)=x2 J@ 27    BCDEF @` ,$D 0r  6PPjJ ,$D  0  0t0,$D 0 5x 2  0,4,$D 0 Px22 2 *  0(9 ,$D  0 @Diamo un incremento Dx al lato x:! 2 B  s *D,$D  0B  s *D  ,$D  0r  6PPjJ P,$D   0  0@,$D  0 :Dx 2  0 B0 ,$D  0 PDi quanto variata l area del quadrato?) 2) ! s *,$D 0 " s * ,$D 0 # s *33,$D 0 $ 0I,$D 0 Jx Dx& 2 % 0N,$D 0 ZDx28 2& & 04TPPop@i,$D  0  Df = 2x Dx+ Dx2V 2 33333333  7 0PZp0@ W,$D  0 v$approssimiamo Df 6 233D 8 0_PPoP0I,$D  0 .d f = Dx f (x)=2x Dx f 23333 333333 9 0 gP p,$D 0 "si trascura Dx2 F 2 3333 : s *,$D 0 ; BC0DEFPPop@h0@  pp,$D  0B = @ 0DPPop0,$D 0 @ 0P  ,$D  0 :Esempio: 2 " A 0q P g ,$D  0 PPrendiamo x = 2 e Dx = 0.1 otteniamo ") 2L B 08v p `g ,$D  0 2Df =0.41 mentre df = 0.4H 233 33H  0޽h ? ̙33O{O___PPT10[O+ -DK' = @B DK' = @BA?%,( < +O%,( < +D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-o6Bbox(out)*<3<* DH' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =+4 8?\CB#ppt_xBCB#ppt_xB*Y3>B ppt_x<* D#' =+4 8?nCB!#ppt_y-#ppt_h/2BCB#ppt_yB*Y3>B ppt_y<* D' =+4 8?\CB#ppt_wBCB#ppt_wB*Y3>B ppt_w<* D' =+4 8?RCBBCB#ppt_hB*Y3>B ppt_h<* D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =+4 8?\CB#ppt_xBCB#ppt_xB*Y3>B ppt_x<* D' =+4 8?dCB0-#ppt_h/2BCB#ppt_yB*Y3>B ppt_y<* D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* DH' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =+4 8?\CB#ppt_xBCB#ppt_xB*Y3>B ppt_x<* D#' =+4 8?nCB!#ppt_y-#ppt_h/2BCB#ppt_yB*Y3>B ppt_y<* D' =+4 8?\CB#ppt_wBCB#ppt_wB*Y3>B ppt_w<* D' =+4 8?RCBBCB#ppt_hB*Y3>B ppt_h<* D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*! %(D' =-o6Bbox(out)*<3<*! D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*" %(D' =-o6Bbox(out)*<3<*" D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*# %(D' =-o6Bbox(out)*<3<*# D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*$ %(D' =%( D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*% %(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*& %(D' =-s6Bwipe(left)*<3<*& D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*7 %(D' =-s6Bwipe(left)*<3<*7 D ' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*8 %(D' =-6B%barn(outVertical)*<3<*8 D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*: %(D' =-o6Bbox(out)*<3<*: D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*; %(D' =-o6Bwipe(up)*<3<*; D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*= %(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*9 %(D' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*@ %(D' =-6B%barn(outVertical)*<3<*@ D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*A %(D' =-s6Bwipe(left)*<3<*A D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*B %(D' =-s6Bwipe(left)*<3<*B +H+0+  ++0+  ++0+  ++0+  ++0+  ++0+  ++0+$  ++0+%  ++0+&  ++0+7  ++0+8  ++0+9  ++0+@  ++0+A  ++0+B  +s  IA` .(  A  <,$D  0 ?Consideriamo un cubo di spigolo x , il suo volume sar f(x)=x3F@8333333   f?0<P@@ 0 p,$D  0   f?0<P@@ p,$D 0    `?0<PP@ 0 @,$D 0   f?0<PP@ @,$D  0    `?0<P ,$D 0   `?0<Pp ,$D 0   ZPP?0<P ,$D 0   Z?0<Pp ,$D 0F  0̚P ,$D  0 JDiamo un incremento Dx allo spigolo L& 233 r  <pPPo ,$D  0  00P,$D 0 9x 233r  6PPo` P,$D   0  0ŚiP,$D  0 >Dx 233  BCDE F1H@t,-T,$D  0B  s *D1pp,$D   0B @ 0Djop,$D 0  s *XjpPpp,$D 0 Lx3. 23333B  0Do @ ,$D  0  s *l @ } ,$D 0 v x2 Dx N 2333333B  0Do`@ ,$D  0   s * > ,$D 0 | x Dx 2T 233333333B  0Do` ,$D  0  s * @P-,$D 0 hDx 3D 2333333   0((p W ,$D  0 Y'Di quanto variato il volume del cubo?( 2( " 0h1p _ ,$D  0 <Df = 3 x2 Dx + 3 x Dx 2 + Dx 3 2333333333333333333 # 0@ ` ,$D  0 d approssimiamo Df( 233R % 0jJ  ,$D  0 df = 3 x2 Dx n 23333333333  & 0Cp@W,$D 0 :Esempio: 2 4 * 0PC w,$D  0 JPrendiamo x=2 e Dx = 0.1 otteniamo : :& 2 8 + 0 ,$D  0 :Df = 1.261 mentre d f= 1.2 N 2 3333H  0޽h ? ̙33VV___PPT10V+4DYS' = @B DS' = @BA?%,( < +O%,( < +D' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-6B%barn(outVertical)*<3<*D' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bbox(out)*<3<*D^ ' =%(D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bwipe(up)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D9' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-u6Bwipe(right)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D ' =%(D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(down)*<3<*D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bwipe(up)*<3<*D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(down)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bbox(out)*<3<*D' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bbox(out)*<3<*Dg' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bbox(out)*<3<*D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bwipe(up)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-o6Bbox(out)*<3<* D' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-o6Bbox(out)*<3<* Dk' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-o6Bbox(out)*<3<* D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(Dg' =%(D' =%(D3' =4@BBB B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-o6Bbox(out)*<3<* D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-o6Bwipe(up)*<3<*D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* D' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*"%(D' =-6B%barn(outVertical)*<3<*"D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*#%(D' =-s6Bwipe(left)*<3<*#D' =%(D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*%%(D' =-6B%barn(outVertical)*<3<*%D' =%(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*&%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<**%(D' =-s6Bwipe(left)*<3<**D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*+%(D' =-s6Bwipe(left)*<3<*++H+0+ ++0+C ++0+ ++0+ ++0+ ++0+ ++0+ ++0+ ++0+  ++0+" ++0+# ++0+% ++0+& ++0+* ++0++ +Gm  @O(    0,$  0 ;Consideriano la funzione y=x calcoliamone il differenziale:< 2< 0,  0`  ,$  0 dx = 1 Dx L 2&   0@p',$  0 La definizione precedente d f = f(x) Dx pu essere modificata in:fD 2&33A  0jJ@,$D  0 d f = f(x) dx ` 2&   0Pp,$ 0 :f(x) 2   0,$  0 3d 2   0P p,$   0 } df=f(x) dx* 2$$2  <fԔ`P,$D  0B  0Dffo,$D 02  CUENHQfԔ `T]TU`T]TU`T]TU`T  ,$D  0B  0Dfo@` ,$D  0  c $A ??`8 $D  0  0A &??E|8 &$D  0  s *ԝPv,$D  0 T Esempi di integrazione immediata! 2! 0 0A  ?? & 8  $D  0 B c $A ?? }Z8 $D  0  C 0 pp ,$  0 wex+k V 2  D 0p `W ,$  0 ?-cosx+k 2 E 0V P ,$  0 fsenx+k* 2 F 0p 0,$  0 etgx+k* 2 G 0l,$  0 a1/2x2+k> 2 H c $A "??P p8 "$D  0 I 0DP )7 ,$  0 1/3x3 +k> 2 J 0@ + ,$  0  x4 +k > 2 K 0x 0 ` ,$  0 h1/(n+1)xn+1+k > 2 L 0 `g,$  0 Zarctgx+k 2  M 0` ,$  0 [ arcsenx+k 2   O 6P,$D  0 4+kH  0޽h ?/  ̙33^RVR___PPT106R+&DM' = @B DM' = @BA?%,( < +O%,( < +D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(DR' =A@BBB%B0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-6B%barn(outVertical)*<3<*DQ ' =%(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-s6Bwipe(left)*<3<*D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<* %(D' =-s6Bwipe(left)*<3<* D' =%(D' =%(D9' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-u6Bwipe(right)*<3<*D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =%(D' =%(DE' =4@BBB%B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-6B%barn(outVertical)*<3<*D' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*O%(D' =-s6Bwipe(left)*<3<*OD' =%(D' =%(D>' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*%(D' =-m6Bbox(in)*<3<*D' =%(D7' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*0%(D' =-s6Bwipe(left)*<3<*0D' =%(D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*B%(D' =-o6Bwipe(up)*<3<*BD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*C%(D' =-s6Bwipe(left)*<3<*CD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*D%(D' =-s6Bwipe(left)*<3<*DD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*E%(D' =-s6Bwipe(left)*<3<*ED' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*F%(D' =-s6Bwipe(left)*<3<*FD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*G%(D' =-s6Bwipe(left)*<3<*GD' =%(D' =%(D3' =4@BBBB%(D' =1:Bvisible*o3>+B#style.visibility<*H%(D' =-o6Bwipe(up)*<3<*HD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*I%(D' =-s6Bwipe(left)*<3<*ID' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*J%(D' =-s6Bwipe(left)*<3<*JD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*K%(D' =-s6Bwipe(left)*<3<*KD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*L%(D' =-s6Bwipe(left)*<3<*LD' =%(D' =%(DD' =A@BBBB0B%(D' =1:Bvisible*o3>+B#style.visibility<*M%(D' =-s6Bwipe(left)*<3<*M+(+0+ ++0+ ++0+ ++0+ ++0+ ++0+  ++0+  ++0+ ++0+C ++0+D ++0+E ++0+F ++0+G ++0+I ++0+J ++0+K ++0+L ++0+M ++0+O +   \Tp(     0X0P,$D  0 TAlcune propriet dell integrale indefinito+ 2+  c $A 3??08 3$D  0H  0޽h ? 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