DERET TAK HINGGA. Deret Geometri Suatu deret yang berbentuk: Dengan a 0 dinamakan deret geometri. Kekonvergenan: divergen jika r 1 Bukti:

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1 DERET TAK HINGGA Cooh dere k higg : = k= k u k. Bris jumlh prsil S, deg S = = k= k Defiisi Dere k higg, k= k, koverge d mempuyi jumlh S, pbil bris jumlh-jumlh prsil S koverge meuju S. Apbil S diverge, mk dere diverge. Suu dere yg diverge idk memiliki jumlh. Dere Geomeri Suu dere yg berbeuk: k= r k Deg 0 dimk dere geomeri. = + r + r + r 3 + Kekoverge: r k koverge ke, jik r < r k= diverge jik r Buki: Misl S = + r + r + + r Jik r = mk S = diverge kre jik bermbh p erbs, jdi S diverge jikr. S rs = + r + r + + r r + r + + r r S = r S = r r r Jik r <, mk lim r = 0 S = lim S = r Jik r > u r =, bris r diverge, sehigg S jug diverge. Cooh: b. 0,5555 = Jwb:. S = r = 4 3 b. S = = = = = 5 =

2 Teorem (Uji kediverge deg suku ke-). Apbil = koverge, mk lim = 0. berdsrk pery ii dp dikk pbil lim 0 (u pbil lim idk d) mk dere diverge Dere Hrmoik Pdhl = = lim = lim = 0 S = = > = Deg membu cukup besr, ki dp megmbil sebyk ki kehedki pd persm yg erkhir. Jik S diverge sehigg dere hrmoik dlh diverge. Sif-sif dere koverge Teorem B (Kelier). Jik k= k d k= b k keduy koverge d c sebuh kos, mk k= c k d k= k + b k jug koverge, seli iu. k= c k = c k= k. k= k + b k = k= k + k= b k Cooh: Teuk jumlh dere beriku: k k Jwb: k= Uji Kekoverge Dere Suku-suku posiif. Peguji deg Iegrl k Wjr Teorem (uji Iegrl) Adik f suu fugsi yg koiu, posiif d idk ik pd selg,. Adik k = f k uuk semu k posiif bul. Mk dere k higg k= Koverge, jik d hy jik iegrl k wjr k

3 Koverge. f x dx Cooh: Periks pkh dere k= koverge u diverge. k l k Jwb: Hipoesis dlm Uji iegrl dipeuhi uuk f x = pd [, ). Mk Jdi k l k x l x k= diverge. Cooh: (uji dere-p). Dere dx = lim x l x k p k= x l x dx = lim l x = + p + 3 p + 4 p + Deg p sebuh kos dimk dere-p. Bukik. Dere-p koverge uuk p > b. Dere-p diverge uuk p Jwb: Apbil p 0, fugsi f x = x d(l x) = lim l x = p koiu, posiif d idk ik pd selg [, ), sedgk f k = k p, mk meuru uji iegrl, koverge jik d hy jik lim k p x p d (sebgi bilg erhigg) Jik p Apbil p = x p dx = x p p x = p p dx = l x = l Oleh kre lim p = 0 pbil p > d lim p = pbil p < d oleh kre lim l =, ki dp merik kesimpul bhw dere-p koverge pbil p > d diverge pbil 0 p. Membdigk suu dere deg dere li Teorem (uji bdig) Adik uuk N berlku 0 b. = b koverge, mk = jug koverge dx

4 . = diverge, mk = b jug diverge Cooh Selidiki kekoverge dere: () =, (b) + = l. Ki bdigk dere ) = deg dere geomeri + = yg koverge. Kre + >, mk 0 < < uuk N, deg + = dere koverge. Berdsrk uji bdig deg dere li, diperoleh bhw dere = jug + koverge. b. Ki bdigk dere = deg dere hrmoik = yg diverge. Uuk ii l diperluk keksm l < uuk seip N, deg uji bdig deg dere li, diperoleh bhw dere l = diverge. Berdsrk = jug diverge. Teorem (uji bdig limi) Mislk = d = b dlh dere deg suku-suku posiif. Jik lim = c, c > 0, mk kedu dere bersm-sm koverge u diverge. b. Jik lim = 0 d b b = koverge, mk dere = jug koverge. 3. Jik lim = d b b = diverge, mk dere = jug diverge. Cooh: Selidiki kekoverge dere: = + Jwb: Uuk meyelidiki kekoverge dere = + yg koverge. Kre uuk = d b + = berlku lim = lim b D dere = koverge, mk dere, bdigk deg dere geomeri + = > 0 = jug koverge. + = Membdigk suu dere deg diriy Teorem (Uji Hsilbgi) Adik sebuh dere yg sukuy posiif d dik + lim = ρ (i) Jik ρ < dere koverge (ii) Jik ρ > dere diverge (iii) Jik ρ =, peguji ii idk memberik kepsi.

5 Cooh Apkh dere Koverge u diverge? Jwb: + =! + ρ = lim = lim = lim +! Meuru Uji hsilbgi dere iu koverge.!.! = lim +.! + = 0 Rigks Uuk meguji pkh dere deg suku-suku posiif iu koverge u diverge, perhik deg seksm.. Jik lim 0, meuru Uji Hsilbgi suku ke- dere diverge. Jik megdug!, r u coblh Uji Hsilbgi 3. Jik megdug hy pgk yg kos guk Uji Bdig Limi. Khususy, pbil dlh beuk rsiol dlm, guk peguji ii deg b sebgi hsilbgi suku-suku pgk eriggi dlm pembilg d peyebu. 4. Sebgi ush erkhir, coblh Uji Bdig Bis, Uji Iergrl 5. Beberp dere mesyrk mipulsi bijk u rik heb uuk meeuk kekoverge d kediverge. TUGAS Perikslh pkh dere iu koverge u diverge. Jik koverge euk jumlhy. (Tulislh beberp suku yg permul uuk mempermudh pekerj d). 3 k k k= k=3 k k Tulislh bilg desiml iu sebgi sebuh dere khigg. Kemudi euk jumlh dere ersebu. Akhiry guk hsil yg diperoleh uuk meyk bilg desiml iu sebgi hsil bgi du bilg bul. 3. 0, ,36777 Guk Uji Iegrl uuk meeuk pkh dere beriku koverge u diverge k= k+ k k= e k k= 7. k e k 3

6 Guk Uji Bdig Limi uuk meeuk kekoverge u kediverge = 3 4 Guk Uji Hsilbgi uuk meeuk kekoverge u kediverge dere 9. 5 = 5 Teuk kekoverge u kediverge dere d sebulh peguji yg d guk =!