Perhitungan Produktivitas Alat Berat (Pertemuan 3)
October 7, 2022 | Author: Anonymous | Category: N/A
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ZXI@V ZXI @VCP CPA^ A^AP APEW EW EDE EDEP LE LEDA DA/MV /MVE EP @EK EKLCVP
NECPIX Q QEKL EKL MFMZFKL MFMZFKLEXVO EXVOAA ZXI@V ZXI @VCP CPA^ A^AP APEW EWhfret EDE EDEP P tfdata pfrdu Vktuc mfmpfrcarecek pri`ucsa edet sfgere `apfdebera nectir-nectir yekl sfgere deklsukl `epet mfmpfkleruoa oesad cfrbe edet tfrsfhut. Nectir-nectir Nectir -nectir tfrsfhut mfdaputa2 (5) Peoe eoekek kek l leda eda (@all (@allakl akl X Xfsa fsaste stekgf kgf), ), (8) Peoeke eoekek k ludak ludakl l eteu teo teoekek ekek lf lfdak`a dak`akl kl (Xid (Xiddakl dakl X Xfsast fsastekgf), ekgf), (7) Peoe eoekek kek cf cfmar marakl aklek ek (Lre (Lre`f `f Xfs Xfsast astekg ekgf), f), (0 (0) Ci Cifn recs csa, a, (6)) X amfnas pasaf udafk d,k Pre (>)) Zf (> Zfrrgfp fpet etek ek,, (:
Hfserkye GP tfrlektukl pe`e2 e. Cik`asa hek yekl mfdaputa2 megem `ek hfktuc cfmheklekkye3 uktuc grewdwfr trugc tfrlektukl pe`e cfe`eek `ek hfktuc trugckye. h. Cik`asa pfrmuceek bedek (heseo, cfrakl, cfres, dukec, rete, hfrlfdimhekl, hfrlfdimhek l, `ek sfheleakye) g. Hfrt cfk`erek c fk`erek yekl `atframe idfo ri` ri`e e
Giktio 5. Bumdeo hfret suetu cfk`erek (\) = 8: tik (0:.::: dhs), sfduruokye `atframe idfo ri`e pfkllfrec. Cfk`ereek tfrsfhut ecek hfrlfrec pe`e bedur bedek tekeo daet yekl cfrakl. Peoekek ludakl (XX) 5:: dhs/ tik, cfmaraklek bedek = 6%. Gihe ekedase, epeceo ri`ec cfk`ereek atu ta`ec sfdap9 Beweh2 Beweh2 Mfkurut Pehfd `aetes GP uktuc tekeo daet cfrakl = :,6: Precsa Cratas (PC) = GP x \ = :,6: x 0:.::: dhs = 8:.::: dhs Cfcuetek terac = \ x LX x cfmaraklek = 8: tik x 8: dhs/ tik hfret cfk`ereek /5% cfmaraklek x 6% = 8::: dhs
Be`a uktuc mfkeoek eler supeye trugc ta`ec mfdirit turuk, `apfrducek leye terac yekl hfserkye makamum 8::: dhs bule. Xampudd = Cfcuetek terac + Leye terac trugc eler ta`ec mfdirit . = 8.::: dhs + 8.::: dhs = 0.::: dhs. 8:.::: dhs ; 0.::: Dhs PC ; Xampudd Xampudd e`edeo hfserkye cfcuetek terac yekl `epet `ahfracek idfo mfsak eteu hek pfkllfrec yekl mfkyfktuo tekeo
Bace bumdeo tfkele yekl `apfrducek cfk`ereek atu (trecsa cratas) hfserkye sf`eklcek cfcuetek terac yekl `epet mfsak/ hek pfkllfrec yekl mfkyfktuo
uktuc mfkerac = 8:.::: dhs, `ahfracek idfo tekeo (Xampudd)
hfserkye cfk`ereek =atu0.::: sfdap. dhs, mece `asampudcek heowe ri`e sfdap.
Xampudd Xampudd e`edeo hfserkye cfcuetek terac yekl `epet `ahfracek idfo mfsak eteu hek pfkllfrec yekl mfkyfktuo pfrmuceek bedur bedek `era suetu cfk`ereek. Xampudd haesekye `akyetecek `edem setuek cl eteu dhs Bace Cifnasafk Precsa (GP) gucup taklla sfoaklle ri`e ta`ec sfdap, eteu GP mempu mfkloak`era sfdap, mece hfserkye Xampudd mecsamum yekl `epet `ahfracek idfo mfsak/ hek cfk`ereek e`edeo nuklsa `era tfcele mfsak (`sedem Oirsf Ziwfr) `ek vfrsfkfdakl ektere mfsak `ek ri`ekye. Be`a2 XZ = (OZ x 7 mpo (madf pfr oiur= mad/ bem). Oatukl Xampudd mecsamum yekl `epet `ahfracek idfo rri`e i`e atu. Beweh2 Prectir ri`e cerft, c cik`asa ik`asa yekl ta`ec sfdap. Mfkurut rumus Xampudd (XZ) = (OZ x 7: x 7 XZ = 57.6:: dhs
Xampudd ta`ec `epet `aoatukl pe`e ri`e rektea (Grewdfr)3 astadeo yekl `apecea pfkllektakye e`edeo @rew Zudd Her (@ZH). @edem @ZH pe`e trectir, mfsak trectur oerus mempu uktuc mfkeoek2 - Peoekek ludakl (XX) `ek teoekek cfmaraklek (LX) - Peoekek ludar `ek teoekek cfmaraklek `era edet yekl `aterackye.
Giktio . Wfhueo trectir/ hud`isfr yekl hfretkye (\) 56 tik, hfrlfrec `a etes bedur bedek yekl mfmpukyea teoekek ludar (XX) 5:: dhs/ tik, `fklek cfmaraklek bedek sfhfser 6%. Hud`isfr atu hfrbedek pe`e vfrsfkfdddakl 5 `ek mfmadaca @ZH mecsamum 8?.:51 dhs. Oatukl @ZH yekl `epet `alukecek uktuc mfkerac muetek deak. sfhfser Beweh2 @ZH Mecsamum = 8?.:51 dhs. @ZH uktuc mfkletesa XX = \ x XX = 56 tik x 5:: dhs/ tik = 5.6:: dhs @ZH uktuc mfkletesa LX = \ x LX x cfmaraklek bedek = tikdhs x 8: dhs/tik/ 5% x 6% = 56 5.6:: @ZH Pited Pited = @ZH uktuc mfkletesa XX + @ZH uktuc mfkletesa LX = 5.6:: dhs + 5.6:: dhs = 7.::: dhs @ZH uktuc mfkerac muetek = @ZH Mecsamum - @ZH P Pited ited = 8?.:51 dhs - 7.::: dhs
= 86.:51 dhs
Giktio Cfgfpetek Mecsamum pe`e mesakl-mesakl vfrsfkfddakl (*)
Zfrgfpetek (Eggfdfretaik) Zfrgfpetek (Eggfdfretaik) e`edeo wectu yekl `aSpfrducek uktuc mfmpfrgfpet cfk`ereek `fklek mfmecea cfdfhaoek Xampudd yekl ta`ec `alukecek uktuc mfkllfreccek cfk`erek pe`e bedur tfrtfktu. Deme wectu yekl `ahutuocek uktuc mfmpfrgfpet cfk`ereek tfrlektukl pe`e hfhfrepe nectir yeatu2 e. Hfret cfk`ereek3 sfmecak hfret cfk`ereek hfsfrte asakye, sfmecak deme wectu yekl `ahutuocek idfo cfk`ereek tfrsfhut uktuc mfkemheo cfgfpetekkye. h. Cfdfhaoek Xampudd yekl e`e.3 sfmecak hfser cfdfhaoek Xampudd pe`e suetu cfk`ereek, mece sfmecak gfpet cfk`ereek atu `epet `apfrgfpet.
Zfrgfpetek tec muklcak `aoatukl sfgere tfpet, tftepa `epet `apfrcarecek mfmecea rumus Oucum Mfwtik.
N = (\ x e) L e = (N x l) \
Cftfreklek Xumus2 N = Cfdfhaoek Xampud (dhs) L = Zfrgfpetek Zfrgfpetek cerfke leye lrevatesa = 78,8 t/ `ft8 \ = Hfret Hfret cfk`ereek cfk`ereek hfsfrte asak asakye ye (dhs) e = Zfrgfpetek (t/ `ft8 )
Giktio Wuetu edet hfret `fklek hihit 5 tik ( 8::: dhs) mfmpukyea cfdfhaoek Xampudd sfhfser 5: dhs. Bace cfdfhaoek Xampudd tfrsfhut `alukecek uktuc mfkemheo cfgfpetek, hfrepeceo pfrgfpetek mecsamum yekl `epet `aoesadcek9
e = = = =
(N x )/ \ (5: dhs x 78,8 t/ `ft8 ) 8.::: dhs :,5>5 t/ `ft8 :,55 mpo/ `ft
Getetek2 5 mad = 5,>5 cm = 5.>5: m 5 t = :,7: m Be`a `edem setu mfkat cfgfpetekkye cfgfpetekkye hfrtemheo sfhfser :,55 x >: = >,> mpo mpo.. Haesekye uktuc pfroatuklek pfrgfpetek `alukecek `fklek gere ta`ec deklsukl, yeatu `fklek mfkloatukl cfgfpetek rete-retekye.
Cfgfpetek rete-rete = Cfgfpetek mecsamum x Nectir Cfgfpetek
Ouhuklek Nectir Cfgfpetek `ek Berec yekl @atfmpuo.
Fdfvesa Dftec Zriyfc.
Fdfvesa hfrpfkleruo hfrpfkleru o tfroe`ep oesad cfrbe mfsak, cerfke
cfrbe u`ere mfsak duer. `apfkleruoa idfo tfcekek `ek t fmpfretur Hfr`esercek pfkledemek, cfkeacek 5::: nt (7:: m) pfrteme `era pfrmuceek deut, ta`ec ecek hfrpfkleruo pe`e mfsak-mfsak fmpet tec3 tftepa uktuc sfdekbutkye sftaep cfkeacek 5::: nt cf `ue (`aoatukl `era pfrmuceek deut) OZ rete-rete hfrcurekl sfhfser + 7%3 sf`eklcek pe`e mfsak-mfsak 8 tec, cfmfrisitekkye hfrcaser 5%
Giktio Ze`e pfrmuceek deut sfhueo mfsak fmpet tec `fklek tfkele 5:: OZ3 Bace mfsak atu `ahewe pe`e priyfc yekl hfre`e pe`e fdfvesa 5:.::: nt (7.::: m) `a etes pfrmuceek deut, hfrepe hfser OZ yekl `amadaca edet atu9 Beweh2 Op pe`e pfrmuceek deut = 5:: OZ Zfkurukek cerfke cftakllaek = 7% x 5:: x (5:.::: ‗ 5.:::) OZ fnfctan edet
5.::: = 8< OZ = 5:: OZ - 8< OZ = : mfkat sfgere pfkuo, sfheh sfdedu e`e oemhetekoemhetek yekl tec `epet `aoak`era sfpfrta pfklektaek cimpikfk yekl rusec, mfmak`eocek edet cf tfmpet deak, `ek sfheleakye.
Kadea Fvasafksa Ipfretir.
g. Vsf i Ehadaty (VE)
Nectir Zfklfmheklek `ek Zfmueaek (Wwfdd Negtir) Nectir pfklfmheklek `ek pfmueaek vidumf metfraed pfrdu `acfteoua, sfheh pe`e wectu pfklledaek metfraed vidumf yekl `apfroatuklcek e`edeo vidumf `edem cik`asa Hekc Qer`, yeatu vidumf esdakye sfpfrta `a edem. Ecek tftepa pe`e wectu pfroatuklek pfkleklcutek metfraed, vidumf yekl `apecea e`edeo vidumf metfraed sftfdeo `aleda, be`a metfraed tfdeo mfklfmhekl sfoaklle vidumfkye hfrtemheo hfser.. hfser
Giktio 5. Wfhueo Ziwfr Wgreppfr mfmadaca cepesates mukbukl 56 y`7 , ecek `alukecek uktuc mfkleklcut tekeo daet. Hfrepeceo cepesates edet sfhfkerkye mempu mfkleklcut tekeo daet esda9 Bew Beweh2 eh2 Mfkurut Pehfd `aetes taep 5 helaek tekeo daet esda hade `aleda ecek mfklfmhekl mfkbe`a 5,86 helaek. Cepesates Cepesat es mukbukl 56 y`7
= 5,86 x cepesates cepesat es tekeo daet esda = 5,86 x cepesates cepesat es tekeo daet esda
Cepesates tekeo daet esda = (56/ 5,86) gu y` = 58: gu y`.
Hfret Metfraed Hfret metfraed yekl `aeklcut idfo edet-edet eklcut `epet hfrpfkleruo pe`e2 e. Cfgfpetek cfk`ereek `fklek OZ yekl `amadaakye, h. Mfmhetesa cfmempuek cfk`ereek uktuc mfkletesa teoekek cfmaraklek `ek teoekek ludar `era bedur yekl `adedua, g. bedek Mfmhetesa vidumf metfraed yekl `aeklcut
Hfret Bfkas Pekeo Esda, Hfret Bfkas Pekeo Dfpes % Cfmhekl *)
ZFXOAPVKLEK ZXI@VCWA @VMZ PXVG PXVGC C
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