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MKS 8yStem of Uni (ti) Tnfexagtinnal System of voit UST pod US Ctr Sy Stem of unit ox (taussian System of Uaid)= length ce Mass — Yvan “lime — Setond Enevay —> 8x9. dit a li) FPS Sy stern pf und = l engdh > +oot Cee eC Cee ECC E EEE EE Es Mast - > Puund Time > Second. -_ Oe |i) Mes Syed J uel’ = y M VS-temn _D Ore 2 7 —_lengdh > me-lLye, aa * Mass Kilogram _ oa Time > Secon of oe + ae —_— — _ bw) ietexnedanal syslem of Unit a - li gl vort) ; “ | ¢ j —leegth = > omer}ye. _ = > Kilogvam oe e 7 | = Second. o Conversion of unite is - { 5 Ky = OOD qram = — a a J. - ; | “Ar Uy no Ue 7 a | __Cooveyt 5 Ky toto gvam. _ 5Kg =p 3 ; _ tos nu ba my, UI = Sky = no.xg = Sa =) No! | => 5X O00F = py. $$ A = —_ = Sxlood = na ee “ no = S5ov0 oe ", BKy = . 5000 9 -fing — a) . al | Note ~ ee a a — KH W Kr/h x 5S = mie of A : - __f li) m/s IQ = =o i) mys X : Kro/h gg ot os a L984 Convewt DLb«n/g ia-fo Kro/h 7 = “Tyick. [ Genexal metHod [5 20x19 [=> eom/e = 02 kmh 5S [=s 96x = on xk 4X18 poo g h 2 Km/h [> OX M yh = 98 , 7 | S km [3 oxo y 86 ¢d9 = 00 SS todg =\ 3h = Oe ma ° 10 _ =) qo = an omg = ah -flog oben e ) e elena | | | CCCECCEECEEES é — ) Date _ x () ~~) Pega. ( | “ - fy— UY = = —— = | it p. Convext + kgen/s’ info cyem/s® | | —_ kg Xm = 2 Qaam x orn. I ‘ Q? s" 44 SIX Ky AM x s* = 8% “ 3° ram xem aa 24 1000 gram x1ovem = 2% Gvam % em Tf a > LOO0OH = 9% ok = 10% 2 5 ; 1 Kos = 105g vam) -flas} Note = : reeerrrss — IN = 10° dlyne. B-| Convext LN into d>y ne 7 - ai Kgm]e? 2 == guimer|s™ oo SIN = 10S dynes x re Ci) i + mos <4 2) 64 x to! x! x (.t0°3) . lot > bb xto x ry * x 10% = 90, =) OCF X1OT STFS = 09 COeCeCeCoEEeeS =) GbE MIO S 7 _ ew ty =- ~ Cbt x 1078 | dyne “om me g- — ~~ GO X07 ppm Keg“ -flos e ~ goppase Ibe have QQ new “Suchen of batts ia Which Unrt df tenath is sRem aod unr DL mass ong Le. Bem = ul and oq Tum, then Comvetvt 3 aan Jom’ TTT Sys-e wn of “Unit. _ | Criven: Bom = tut 909 = LUM ca =) 89 foo” = 92 um — ut = 8 GQamy ub =» cm? Um TEP TET lg | — ee —+ oe _ => 9 vam ul = o8 - bes a | a ren a e I 4, - ¢ os 8 X Qaim x fut] oi. ae — 4 Jey om | a — SS 8x gram yx Pur] =o a. _ | UM [ ok cay & - . - = [3 8x gun x [Suk] 0 _ Q9 gag | ser | _t. - | os > gxit vis =a. e eas: te | =) 95 = O29 S > 8 Gam = 50 UR 7 Las Om? us ~ Sth} hn. SS 1gorpicant ts en. * Noles So ——? _ _ Duxiag Conversion , 9} thogelt — « ‘ [a 2 O4O1 at — —Fiquies - QJoIco-—- 4 ! ot es Loding Zexos. Lith deermal ave —__, __Sigaificant. _ | epereae ff | 430. 0d 98 | J20000-00>8 | B-D6206—> 3 ob “li) Ox dey vf magnitude iS ot L Significant. = 5% xX 1p*—> 2 > _O.0p2b0 X 195 Mii) Puve no. have infinite Sia nifeant num bey. . Fyeq o-f cube B.. ; wii) 0-026030 X1p3 > 5 HL | | Find Significant Figures. hi) -LQ3ol— 5 iy 4a55 — > 4 i) D.0093G91— jtis} t.po28— § Iv) Co80— & bv) 20.Qbo5— > 6 _| yO | Rules Pox Rovn ding off Round up-to tury Sigoi-fioant Hager. ral li) 43 3 Ot If “oext cligit ig less . than S then Pxevi pus igitt toil Remain Sam’ TUT Ge li) & 463 6.5 ecere he —_ineyeased by "J if meg aligit iS mye than S then Pye winus digit toil | S LL : re () : - fox ~ fpirlhonetic | Rules DPexa-fions _ With Significant —figuyes. ae d ed _ | In Case vf mse addition » ~~ | Subtvachoa:_ mvublliplicehon aod — aivision — oh —meqsueq Values of me ~ w Me ; Phy gicql quantities —the 12s Lanct — LNalue Can Oot he move oe | aecu sa-fe me Fs xe mend : a ti) Addi-ton ox _ Sub-vaction ~- | a Case of ‘addi fiom and. ° | Qubtraelinn the _ xesul- ce values, a) _raust he Younded _Up -to —the Same Aumbeyv ot deaima | Places 49 Pesent 109 -tha measured value wrlh — leagt deoimal _ places. a Taz (0) G48 -+ 0-9, = G62 -> 67 oy od FOS = B49 Bf fad ag ff to = Alot > 4b (COs 5% | Ui) Multipliea-ton px Divisions | Tn Case == -toulfiplicat: 00, | oO = : ——— aNd diwis SiON -| he xesuld aot o-f measured values MUSh be ; Mounge q oft UP -lo ~the Same nO. of Sigorfi cant Tig uxe 93 ime gen}. 1A the meas ured Nalue With _leaet significant Piguet. — Be (a) 2:3% I: 5C—> aga 3G i an hwo” Sigeefioant- fig ure - { least “Fuso Signi-lrean|: “Hquxe. _& — @ 1996 +1L424h1 = 38 & ©) 1-993% [40X00 = 34 * @y—Fotg— 1-3 41-92 8.9S9> BE os ee a 83644 = B.5Apo5 > 55 _ 1.G 7 ___ Dimension Dimensions axe the Powexs to Which =the —Fuada men-ta| Barts ‘Ave YOiSed 19 Dvclex -to expsess -the _evived of q Phy sical qua nti Ls Node. ee 4 - Base Quand % ™ _ 1 (eg) — ee a ieee § A ® Aecelevafina= Ghange iA, ‘Velo ery bs N —{ me, e | f | = Neloerty te { / iene 7 * a es, ae = [s} _* ee oe s BD -Foxce = mass X accelesaton | _ : ee i —_ Ly-> my] x | _g | => Pmer?] 7, ~ 6) char Je, = Corcot X Heme, € =r} 6 yor ~ bs i= Bb a * to -& Bn ixt @ tte ev ik > _ _ = od Dimension of « __, ames Bo si‘ S + = 426 x — _ _ en, ‘ CCCCECEE ESSE en EC iL ; = .- ty 818» fo YQ i] \ 68. Sey = Lx TE F x? (Qo = Charge x charge Seo = [at] y Tar] — —_fmer} pry tt | | + —=Foxce x length CO (3S = is oT j | [m® 2) = al Ne TTA | fos \ = -Fovee x displacement x cosh [amt perf fey E M 1° Toh oC eeeeeesce 0D : Faequency =! L a | | Fn pexing Tk equeney el T eeedd Frequency =[T" J a6