Math exercise with solution, Thesis of Mathematical Methods

Math exercise, solution and everything is better bad gets on

Typology: Thesis

2024/2025

Available from 09/24/2025

rayen-rayen-4
rayen-rayen-4 🇹🇳

3 documents

1 / 12

Toggle sidebar

This page cannot be seen from the preview

Don't miss anything!

bg1
pf3
pf4
pf5
pf8
pf9
pfa

Partial preview of the text

Download Math exercise with solution and more Thesis Mathematical Methods in PDF only on Docsity!

Correckron Serve de rev L Bae Math Malk Xpat Froce | to jai ae = 24 clone to) =4 Yo) A=# Zo * Gr = Ee A uv 7 ALeaz v re _ A i Aa =e B ist Ai Ax x 1-7 z& fiom Zo ; = aX A * D a & Vee a ren f est de of vw) 18 bazture Complere assodée & ar 2'sazsb oi a= At ab «og. a 7 |al--E 44 donc b cbasent eh. de L- divec rm mpl we et de conitte be por + LL dc ofpixe 2 a= rr wrens 2 At A -i A et < A gh ahs agen ee a ym 4A db dee Ast fh _jal* =A = 4 # he Dor 2n- —— Concliston | B est ume stn lik. cf fl belaue if (ih if at ane Stal de Goatte et Bra) = 8» does Lhaze © def est La devike qui Pocte je bresechi?ce ler? eur de TA elt A sont colrnees ces de meme S0ns » de meme Pow FE ob iB; done ATB - N'30. Ona th. (eth: & fh -4 +10 =! aes rofl et 2socele ml dene de deo le fe t, A). bescechice Utete de Lesle BVA’ est la med ro’ CD: Lexe deff ot be med [oll] F - eoedte de Gnke I ebde mpprt de cele 7 L 3 mp. a Lt ~ dececte Pe-gle gdomcteique Ate / (0) = ( box) 0 ) =A (5(2)) or fou 4, 2 MM, = Oa(o) = - OA = \2) = My -M GUM, a)= Me ne @ Mh, Mh, a(M,) = Mea Dloes - "5 d, b/ Por nel" e HeJoif ; SCH) = a 1 oS.CH) ob deer syoble su Ram eh ok ojo sansa Zn ~ ksh = EAE tte tLe zbyAct ib ke. ‘i)- a in ; “ogc ies Sitr) -( -tat _ (ne) L(A Aya (-b* (a-t)* att artis e 12 At)” - +. Brno Liab (Hye Ce A do e xb }* x A aal po doone Zk. AR abet me 9) (i -H* ” Sm (3 “> jo a exp (nln(E)) ole erp (-ahf) nine a nine A EN Ses | «le In “) é = a] « Na+ iW ~ x e _350 eye -oO yor? In peste? d/ k= we Ona 2 S hye Sule) +! Lee CA =sl— 4 Pee 2 dagtt ij gow t= -&a not? |~ i kaye 2 yesh Noe prt A-ae Fed _ , Vv # AU x 3 fi : a io A 2 de F438 6 ee i 6 is! ; ie Viv)2 4% yt 04 294663 v(d)-b2 4 = wo Ful,2% cl Pe Concuctom appre >= les bees 2) us Pa-dea conte 190m Ror «ancien Conplitenet el-Coome de dratcies devel a vot hive & Nystad st felis ale deduce de preenese alors da veiuve - Bouter Isbdade. E xncce % * 1/d/a m4 - HS Noa an 2 e" soul Iocvebl sell N—- Pia Jertveble ¢ >O sufi N-> e” el sur AR oo ft) d jac 1-H# 2NVe eo V'(x) AV) - (1-4) {e* she e a> Vex) + AVL) -fe* donc vest ee soletrm seE) Wail g ane hel dippeie ot d glk. al sol de(E) &> ¥xeft ona: x)ad () Ve ) ( Or VQ), Va) = Ve™ = ¥xell, i) hates V(x => 9x) Va) 44 2 7 AF au)-Vid [=o V xe basin Naa, sia Law" | (-% ). Le) ~ (g- uv) et - mee Soke! been de (E") * EY me ay hye geek) ge -a/ La: eabes ghd fi dle €) ce est dahine po Gix)s bo othel 4 est sol al 8 e=> (4-V uv) etve solbin L(€’) es ¥uet, (x) - Vi) \ hx) 2 Vue ; 7 atx (x) = fcc) «VGx) = vel; gcx) = ye eB, le acg(o)=0 => k=O el ia scbevzelR goren® L/\) bcd) Jaxer: Py ¥x>o on pew boniee fo OE. (= doc ete Gr *(ig}e? % it we Aapnphte Hor? a0 b/l— fp clea (= — ae i BO (E «(Bene -oo ex o Ad. 14 yro alo D/ie/ Lea fale i al el ad Ee -fe)ae eA fi dts + ‘. as ‘|. ‘ sea We -% i 2 [Plz i b/ ne ona Tne eons “(o> de or | wt! (GR dy fw el et onl ae any (ne\)2" ON ane + oO Ack de® dy -L a x > —s wtr)=-Le 7 ed ' 6 n rr | of ot dx 2] -29"%e \, + u(n+\)/ nfs noe attel) Ss Vor T. -— (- QL + 2(ns\) nl 2") oe a ve . 2 (natjal 2 ‘Tn é> J bay. * (0+) git® (n+!) | gee a>), i ota * (n+l 7" Tn + + (nel) 2°"! (n+1)| 2" (n+l LZ 4 Seen et c) Por n=! Ona A -4 eb je(e-% 2 i alo 3m y 3G Roe n> Ona [ule Aw -[ x \ ale a dy -[ fe.) dx ¢nd2 eb ¥ x fo, Ona OC bed ¢ deba'30 Vone OG 1" “bc«) Lun Eo plus les fonck Ens QL an" “fce) e ata -2 x” ooh Coal: hes sx [5,1] dene ¢ | a AG) dx