Secant-Tangent and Tangent-Tangent Angles
|
|
- Ashlynn Wells
- 6 years ago
- Views:
Transcription
1 -1- w2g07131s seutbau zeowfct1waerweb 1nrw.w b wa0lal rhigmhjt7s nroedsxeqrvzed.i pmadten fwithhk ITnTftiunbittge Ietormetjry.A orksheet by uta oftware uta oftware - Infinite eometry ame ecant-tangent and Tangent-Tangent Angles ate eriod ind the measure of the arc or angle indicated. Assume that lines which appear tangent are tangent. 1) 7 2) 0 T 3) ) 1 0 ) ) 130 7) 110 ) 1 J olve for. Assume that lines which appear tangent are tangent. ) 10 H ) + 10 T 110
2 -2- T 2A0w11Z kutjao o7fttwwiaarae3 s1zz.p w ZAlAlu r1i2gkhtsj triesvetr2vje2dc.y I yaediep wbiqth InfYiBni3tceq 0jeovmeAtbrvy. orksheet by uta oftware 11) ) ) ) 1 + B 23 A ind the measure of the arc or angle indicated. Assume that lines which appear tangent are tangent. 1) ind mb 1) ind m B ) m = 30 + ind m 1) ind m
3 -1- g2011r euwtak koftwoaorae ufr.f o OAmllH rqicghtyse 7rfehsteYrvze7dj.n t vwabde Bwtihthp hinpfinithe AneeoJmentr ny.q orksheet by uta oftware uta oftware - Infinite eometry ame ecant-tangent and Tangent-Tangent Angles ate eriod ind the measure of the arc or angle indicated. Assume that lines which appear tangent are tangent. 1) 7 2) 0 T 3) 20 ) ) 73 ) ) 110 ) J 3 olve for. Assume that lines which appear tangent are tangent. ) 10 H ) + 10 T 110
4 -2- o2s01h1 pfuytyag 7ooBfqtwAaArIe vwxt. 2 YAlsl cribghtcss YresXeZrtvke2dl.3 J axdzee Yw2iItAhT kin7ffienbiktge7 eecodmeetriy. orksheet by uta oftware 11) ) ) ) B 23 A ind the measure of the arc or angle indicated. Assume that lines which appear tangent are tangent. 1) ind mb 1) ind m B ) m = 30 + ind m ) ind m reate your own worksheets like this one with Infinite eometry. ree trial available at utaoftware.com
5 -1-1 Z2z0d1B1z 3utaJ noafbtywalrez 3up.X o 0Alvl3 riiyghhtws 0rnesnergvZeZdO.X r vade7 Owbirt2hv sicnfinwiwtxe belowme7tzr 0y. orksheet by uta oftware uta oftware - Infinite eometry ame egment engths in ircles olve for. Assume that lines which appear tangent are tangent. ate eriod 1) 1 2) 3 3) 3 ) ) ) + 2 7) ) 7
6 -2- c 201A1 fluatda 7hoqfTtwwaYrceO ees. z Alnld rdi1ghitbsh reysaerlveydh.d d qadueo wijtha uingfiinxitzeg eiomxetryb.l orksheet by uta oftware ind the measure of the line segment indicated. Assume that lines which appear tangent are tangent. ) ind 10) ind T ) ind ) ind ) ind 1) ind A A B 1) ind H 1) ind + H 1
7 -1- h o2a0a11v dlutpaz soafmtywfar e 3Y. Ally tryifghhgt3sk hresse1r vehd.y a adle3 uwniataha I0nIfiendithe eoxmentpryo.x orksheet by uta oftware uta oftware - Infinite eometry ame egment engths in ircles olve for. Assume that lines which appear tangent are tangent. ate eriod 1) 1 2) ) 3 ) ) ) ) ) 7 1
8 -2- w e2p0a11o eutdaz oufzt1wbaorep J. p YAlpl rbignhitfse erews1ewrvyeyd. i0acd1e OwihtOha minofainnitek eovmezthr yb. orksheet by uta oftware ind the measure of the line segment indicated. Assume that lines which appear tangent are tangent. ) ind 10) ind T ) ind ) ind ) ind 1 1) ind A A B 1) ind H 32 1) ind 1 + H 1 reate your own worksheets like this one with Infinite eometry. ree trial available at utaoftware.com
9 ua oft van: - Inlillill l' 1111dr\' ecajlt-tall~ellt anj Tall!!ent-Tanl-!.enl i\11!.!.le_ l... '- ~,. I );II~ l'er10t! Hncl 1I1l' ll1('a~liii' or tbl: an' (If' 'lil~ll illdkalcd. "\lliil Ih ' Jim's "hich apprar llingt'nl arl. langrnl. 7~': ±~f I \,. r 7' :' ~ )<. IZ ~)(. "O-Il =l0,n2:! (l~' t) fy'. =- 73 o»tl3 l +13= 1. ( -I./) 3tt3= ~(ql) ))( t 13:. ~, 3~~ 33 ~~ t\ r,i rt\ =~1jb-ll0) (h =- ~ (f20) =--'O ~~o= i lx-') 0 : -fo~, 1 t"3 :.. :: 1(,1-,I) '" ~ t () '1- =- '3~ \)
10 II!! ' \I' /' ('- - I 1.\ / /' ~,~ l I'I{ I 't! sx-s -=- t&o -(,3-7~ "'1--~ =. t (,O -/3)(... 7) -/0 = (flo -13~ r 7 Z3y...:: zo 7, J- \' _"or ;...' 'f.:=. q (!~ /' \, II ~~17 ~ ~ (37-r -(l3-)) ~ti7:; i l37~t)-z3.-+) IOtJ'f:: IJ~ +/0 l :: ~"(. c,=. 2'1.+'" = i (, +Jlf) -) ~ +l ~ ~ 0 t/yj.-r ~o =- /0)(. ~ =: 'f... 7'1- tb =- ~ (Zf~t3-0)(+ 3)) lf,,+-i~= l'~ +0 Ii ::. &:~ Z.
11 ula ll't-.,v'lr',... I 11 (",, - 1Il1lt' (, 'illlldry a1ti-: egm H1 el1gth~ in ircles [);Il~ I'eri ld_ ol\'(.' t) for, r,~ ~llml' lhat lil1t.'~ \\ bil-ii. <li'(,1i.... tangellt art lallgl'li ql~q) == I 2 q'ltt= zzr 1 - =- 1~ ~-=-J' -) ~('tt/)= ego) ~'t. t"::: 2'1 f)<. ~ "i 'f.:=- )<-3 )( -b ' Y(~-3 +):: )(X-b +~-) ~(>, +1) ~ ){)\. -I) ~'1.. ty :: " ~ -~ ::: (Xf'l) =~ Z ~~ 1-1' =b ~y.. -=- Zu y.:=- ~ _ 1 A~
12 ~ X-+J ~,1 ~ Z +~.:: 3" '" +$")( - 3':: 0 (y. t q '{'k -t1 ):: 0 II) ind.\'.<h I zt3 '1--3( ~~3.}/b) ::~+ )"( ~ s( ~ + 13) :::. "'-Z. ~'X +q '( )(.. _ s1 ::: y t'. +'f J = X,,-=..tZ I.) iilli J-J(; f It -l, -. -\.. )(t~ (f1 _ Ie,'/ IZ.l7.:: ~+ g)l 3 2'1 =- ~ t }J' ~ tj If ~ '( +Jb~ -l~o::. 0 ('><+"l.j(li:-lo).:0 )( ~7(, cr 1-.. =- J ()
2) Find CS if CI = 6x 2 and IS = x + 3 A) 45 B) 15 C) 22.5 D) ) Find TR if TR = 2x + 17 and JR = 2x + 5 A) 16 B) 8 C) 12 D) 24
eometry Assignment : 1 Name ate eriod ach figure shows a triangle with one or more of its medians. 1) ind if = 7x 1 and = 4x + 2) ind if = 6x 2 and = x + 3 A) 13 ) 19. ) 8.67 ) 26 A A) 4 ) 1 ) 22. ) 7.
More informationr(j) -::::.- --X U.;,..;...-h_D_Vl_5_ :;;2.. Name: ~s'~o--=-i Class; Date: ID: A
Name: ~s'~o--=-i Class; Date: U.;,..;...-h_D_Vl_5 _ MAC 2233 Chapter 4 Review for the test Multiple Choice Identify the choice that best completes the statement or answers the question. 1. Find the derivative
More informationFinal Worksheet --- no answers
Geometry (ession 1) d o20y1u6m QOuhta fofxtywpacrzep ye.o a _l[lp rsijghhvtgs irejsperyv]eqds. inal Worksheet --- no answers Name I: 1 ketch an eample of the type of triangle described. ark the triangle
More information4) translation: (x, y) (x 1, y 2) 6) translation: 6 units right y -1-
-1-2g001a5m hzubtva8 0ofktwoaarze 2LgLCt.8 LlblX r6igkhttrsu nrkesecrlvewdp.t G caldmeq lwtiatpht 3n0fv inihtue LGTefoUmemtr1.w orksheet b uta oftware LLC ath 8 Q1 eek 4 Homework (C) c20c15k kwu Ht Qa
More information264m. Raggengill Gilkerscleuch. Abington. 250m. Cottage. Iss. Mast. 246m. TER R AC E 240m OO KE TE H U N TE COLEBROOKE. Over Abington STATION.
I 4 4 I I L KY t lttio F 9 ott v bito 4 4 F L ii 3 lui 1 p F L F I I 9 F L I LK i i tip i 9 6 v bito U l K L 6 ott bito i 5 1 5 9 i oo 8 4 6 otl it o ov b i o 116-3 ott 6 i i ollt u o v bito 4 lo i 6 v
More informationA L A BA M A L A W R E V IE W
A L A BA M A L A W R E V IE W Volume 52 Fall 2000 Number 1 B E F O R E D I S A B I L I T Y C I V I L R I G HT S : C I V I L W A R P E N S I O N S A N D TH E P O L I T I C S O F D I S A B I L I T Y I N
More informationAPPH 4200 Physics of Fluids
APPH 42 Physics of Fluids Problem Solving and Vorticity (Ch. 5) 1.!! Quick Review 2.! Vorticity 3.! Kelvin s Theorem 4.! Examples 1 How to solve fluid problems? (Like those in textbook) Ç"Tt=l I $T1P#(
More informationEMPORIUM H O W I T W O R K S F I R S T T H I N G S F I R S T, Y O U N E E D T O R E G I S T E R.
H O W I T W O R K S F I R S T T H I N G S F I R S T, Y O U N E E D T O R E G I S T E R I n o r d e r t o b u y a n y i t e m s, y o u w i l l n e e d t o r e g i s t e r o n t h e s i t e. T h i s i s
More informationFuture Self-Guides. E,.?, :0-..-.,0 Q., 5...q ',D5', 4,] 1-}., d-'.4.., _. ZoltAn Dbrnyei Introduction. u u rt 5,4) ,-,4, a. a aci,, u 4.
te SelfGi ZltAn Dbnyei Intdtin ; ) Q) 4 t? ) t _ 4 73 y S _ E _ p p 4 t t 4) 1_ ::_ J 1 `i () L VI O I4 " " 1 D 4 L e Q) 1 k) QJ 7 j ZS _Le t 1 ej!2 i1 L 77 7 G (4) 4 6 t (1 ;7 bb F) t f; n (i M Q) 7S
More informationExhibit 2-9/30/15 Invoice Filing Page 1841 of Page 3660 Docket No
xhibit 2-9/3/15 Invie Filing Pge 1841 f Pge 366 Dket. 44498 F u v 7? u ' 1 L ffi s xs L. s 91 S'.e q ; t w W yn S. s t = p '1 F? 5! 4 ` p V -', {} f6 3 j v > ; gl. li -. " F LL tfi = g us J 3 y 4 @" V)
More information176 5 t h Fl oo r. 337 P o ly me r Ma te ri al s
A g la di ou s F. L. 462 E l ec tr on ic D ev el op me nt A i ng er A.W.S. 371 C. A. M. A l ex an de r 236 A d mi ni st ra ti on R. H. (M rs ) A n dr ew s P. V. 326 O p ti ca l Tr an sm is si on A p ps
More informationI-1. rei. o & A ;l{ o v(l) o t. e 6rf, \o. afl. 6rt {'il l'i. S o S S. l"l. \o a S lrh S \ S s l'l {a ra \o r' tn $ ra S \ S SG{ $ao. \ S l"l. \ (?
>. 1! = * l >'r : ^, : - fr). ;1,!/!i ;(?= f: r*. fl J :!= J; J- >. Vf i - ) CJ ) ṯ,- ( r k : ( l i ( l 9 ) ( ;l fr i) rf,? l i =r, [l CB i.l.!.) -i l.l l.!. * (.1 (..i -.1.! r ).!,l l.r l ( i b i i '9,
More informationFederal Project No.: To be assigned
TTE ID FO O TNOTTION.Jl D INII EIINY DETEINTION EQET F, ti, illif tfl f f : -- Fl jt N.: T b i t: T i (T) t t : F: Jff i (xitl. il t f T ) T: Xl (xitl. il t f T ) T : F: xitl. il t f t T: T (xitl. il t
More information~,. :'lr. H ~ j. l' ", ...,~l. 0 '" ~ bl '!; 1'1. :<! f'~.., I,," r: t,... r':l G. t r,. 1'1 [<, ."" f'" 1n. t.1 ~- n I'>' 1:1 , I. <1 ~'..
,, 'l t (.) :;,/.I I n ri' ' r l ' rt ( n :' (I : d! n t, :?rj I),.. fl.),. f!..,,., til, ID f-i... j I. 't' r' t II!:t () (l r El,, (fl lj J4 ([) f., () :. -,,.,.I :i l:'!, :I J.A.. t,.. p, - ' I I I
More informationPINE STREET. DURBAN. Issued by It Action Committe of African National Congress & Nattl Indian Congress
M A Y IB U Y E - A F R IK A! UFIKE EMHLANGANWENI OMKHULU! RED SQUARE PINE STREET. DURBAN. NGO SONTO 31st AUGUST NGO 2. 30 Ntabama Issued by It Action Committe of African National Congress & Nattl Indian
More informationT h e C S E T I P r o j e c t
T h e P r o j e c t T H E P R O J E C T T A B L E O F C O N T E N T S A r t i c l e P a g e C o m p r e h e n s i v e A s s es s m e n t o f t h e U F O / E T I P h e n o m e n o n M a y 1 9 9 1 1 E T
More informationFOR TESTING THill POWER PLANT STANLEY STEAM AUTOMOBILE SOME TESTS MADE WITH IT. A Thesis surmitted to the
..' -...,-.....,.; \'
More information9.9 L1N1F_JL 19bo. G)&) art9lej11 b&bo 51JY1511JEJ11141N0fM1NW15tIr1
thunyitmn tn1 zni f1117n.nllfmztri Lrs v wu 4 t t701 f 171/ ti 141 o&oiv,3 if 042 9.9 L1N1F_JL 19bo vitioluutul fly11.1.g)onoo b5 et Nn`15fiwnwiymri1 nrikl5fini1nvi Ltol : Aeniln,flvnu 6m,wiutrmntn15Y
More informationSTEEL PIPE NIPPLE BLACK AND GALVANIZED
Price Sheet Effective August 09, 2018 Supersedes CWN-218 A Member of The Phoenix Forge Group CapProducts LTD. Phone: 519-482-5000 Fax: 519-482-7728 Toll Free: 800-265-5586 www.capproducts.com www.capitolcamco.com
More informationshhgs@wgqqh.com chinapub 2002 7 Bruc Eckl 1000 7 Bruc Eckl 1000 Th gnsis of th computr rvolution was in a machin. Th gnsis of our programming languags thus tnds to look lik that Bruc machin. 10 7 www.wgqqh.com/shhgs/tij.html
More information18.02 Multivariable Calculus Fall 2007
MIT OpenCourseWare http://ocw.mit.edu 18.02 Multivariable Calculus Fall 2007 For information about citing these materials or our Terms of Use, visit: http://ocw.mit.edu/terms. V11. Line Integrals in Space
More informationGrilled it ems are prepared over real mesquit e wood CREATE A COMBO STEAKS. Onion Brewski Sirloin * Our signature USDA Choice 12 oz. Sirloin.
TT & L Gl v l q T l q TK v i f i ' i i T K L G ' T G!? Ti 10 (Pik 3) -F- L P ki - ik T ffl i zzll ik Fi Pikl x i f l $3 (li 2) i f i i i - i f i jlñ i 84 6 - f ki i Fi 6 T i ffl i 10 -i i fi & i i ffl
More informationCaIPERS website, the primary users of the detailed and complex reports are both Finance and Human Resources staff.
RST FR I ATI ITY I MTIG DAT: RK F I S Y: MARH 5, 219 TIT: RIV AD FI RPRT F MPY PSI PAS - AS F J 3, 217 STRATGI PA. 4, 1} APPRVD As Reended ] Aended rrdinne n 15' Reding rdinne n 2nd Reding Ipleenting Resltin
More information~.cft.l!:.&r".m.~~i~~ CfiT.afI4~R.q)
.cft.l!:.&r".m.i CfT.afI4R.q) r_ -' f'l.... '1 Wr. (. ':?\9\9o) 3lT{-t." 'ts, 3lT{... 4Idl4I,, - oo ot.t.". t"l{2. '31'.M. r::..,, 'If.. \9() 11c:.ljl \1rrRlT +I(1Ch SCXlI1.;...,...fA,.." r:.t'tllirto\""i\..
More informationThe maximal 2-local subgroups of the Monster and Baby Monster, II
The maximal 2-local subgroups of the Monster and Baby Monster, II U. Meierfrankenfeld April 17, 2003 Abstract In this paper the maximal 2-local subgroups in the Monster and Baby Monster simple groups which
More information(A -A )/(M IL -T )
Kulka M ilitary C las s (A -A -5 9 12 5 )/(M IL -T -5 5 16 4 ) M ilitary C las s : C lo s e d B ac k T h e s e m ilita ry b lo c k s fe a tu re m o ld e d -in te rm in a ls in a n im p ro v e d K u lk
More informationUsing the Rational Root Theorem to Find Real and Imaginary Roots Real roots can be one of two types: ra...-\; 0 or - l (- - ONLl --
Using the Rational Root Theorem to Find Real and Imaginary Roots Real roots can be one of two types: ra...-\; 0 or - l (- - ONLl -- Consider the function h(x) =IJ\ 4-8x 3-12x 2 + 24x {?\whose graph is
More informationPledged_----=-+ ---'l\...--m~\r----
, ~.rjf) )('\.. 1,,0-- Math III Pledged_----=-+ ---'l\...--m~\r---- 1. A square piece ofcardboard with each side 24 inches long has a square cut out at each corner. The sides are then turned up to form
More informationARC 202L. Not e s : I n s t r u c t o r s : D e J a r n e t t, L i n, O r t e n b e r g, P a n g, P r i t c h a r d - S c h m i t z b e r g e r
ARC 202L C A L I F O R N I A S T A T E P O L Y T E C H N I C U N I V E R S I T Y D E P A R T M E N T O F A R C H I T E C T U R E A R C 2 0 2 L - A R C H I T E C T U R A L S T U D I O W I N T E R Q U A
More informationfur \ \,,^N/ D7,,)d.s) 7. The champion and Runner up of the previous year shall be allowed to play directly in final Zone.
OUL O GR SODRY DUTO, ODS,RT,SMTUR,USWR.l ntuctin f cnuct f Kbi ( y/gil)tunent f 2L-Lg t. 2.. 4.. 6. Mtche hll be lye e K ule f ene f tie t tie Dutin f ech tch hll be - +0 (Rece)+ = M The ticint f ech Te
More informationPolynomial expansions in the Borel region
Polynomial expansions in the Borel region By J. T. HURT and L. R. FORD, Rice Institute, Houston, Texas. (Received 22nd August, 1936. Read 6th November, 1936.) This paper deals with certain expansions of
More information15) Find UG if FG = 8. 17) Find QE if QU = 30
-4-14) ind if N = 3.7 15) ind if = 8 N 16) ind if = 27 17) ind if = 30 18) ind if = 4.5 19) ind if = 2.5 20) ind A if A = 6 A 21) ind if P = 6.4 P 22) ind if = 5 A -5- 27) ind if = 15 N 28) ind if = 6.3
More informationq-..1 c.. 6' .-t i.] ]J rl trn (dl q-..1 Orr --l o(n ._t lr< +J(n tj o CB OQ ._t --l (-) lre "_1 otr o Ctq c,) ..1 .lj '--1 .IJ C] O.u tr_..
l_-- 5. r.{ q-{.r{ ul 1 rl l P -r ' v -r1-1.r ( q-r ( @- ql N -.r.p.p 0.) (^5] @ Z l l i Z r,l -; ^ CJ (\, -l ọ..,] q r 1] ( -. r._1 p q-r ) (\. _l (._1 \C ' q-l.. q) i.] r - 0r) >.4.-.rr J p r q-r r 0
More informationi"hvsleai! SCIENCES LIBRARY THESIS
lt.c ihvsleai! SCIENCES LIBRARY THESIS on d, or on in ij l::n 1 1 1:1 ) er d no ' z co no 116 ( 1 ot i t t v 1 c cr c t'> /, e.) t t ( 1 c or c e j it 1 tj O-Il 1 1'1 t t 4) f:} c::- l v t o- t :Lt lo
More informationrhtre PAID U.S. POSTAGE Can't attend? Pass this on to a friend. Cleveland, Ohio Permit No. 799 First Class
rhtr irt Cl.S. POSTAG PAD Cllnd, Ohi Prmit. 799 Cn't ttnd? P thi n t frind. \ ; n l *di: >.8 >,5 G *' >(n n c. if9$9$.jj V G. r.t 0 H: u ) ' r x * H > x > i M
More informationAssignment. Riding a Ferris Wheel Introduction to Circles. 1. For each term, name all of the components of circle Y that are examples of the term.
ssignment ssignment for Lesson.1 Name Date Riding a Ferris Wheel Introduction to Circles 1. For each term, name all of the components of circle Y that are examples of the term. G R Y O T M a. Chord b.
More informationFilfidatiPm 51mazi6umn1I40171mhz4nnin15miTtiuvintfr, b 1,1411.1
'h ldflu D w ) l blv JLfffTU f8fltflud dbw uuu vultj @@ @ DJ b bub LD ftujf:ttvtt t:9u zfty f/d:thlvtuuzytvvu (Ttulu) lfdt zuhzttuvtf b uvj:ulludlutluwul'ut'jj/fll ltttvtulvlztvfvt tt tluu bb b(ttd ulfu
More informationTh n nt T p n n th V ll f x Th r h l l r r h nd xpl r t n rr d nt ff t b Pr f r ll N v n d r n th r 8 l t p t, n z n l n n th n rth t rn p rt n f th v
Th n nt T p n n th V ll f x Th r h l l r r h nd xpl r t n rr d nt ff t b Pr f r ll N v n d r n th r 8 l t p t, n z n l n n th n rth t rn p rt n f th v ll f x, h v nd d pr v n t fr tf l t th f nt r n r
More informationMathematics Extension 1
BAULKHAM HILLS HIGH SCHOOL TRIAL 04 YEAR TASK 4 Mathematics Etension General Instructions Reading time 5 minutes Working time 0 minutes Write using black or blue pen Board-approved calculators may be used
More informationColby College Catalogue
Colby College Digital Commons @ Colby Colby Catalogues College Archives: Colbiana Collection 1866 Colby College Catalogue 1866-1867 Colby College Follow this and additional works at: http://digitalcommons.colby.edu/catalogs
More informationConcepts. Materials. Objective
. Activity 10 From a Distance... You Can See It! Teacher Notes Concepts Midpoint between two points Distance between two points Pythagorean Theorem Calculator Skills Entering fractions: N Setting decimal
More informationz E z *" I»! HI UJ LU Q t i G < Q UJ > UJ >- C/J o> o C/) X X UJ 5 UJ 0) te : < C/) < 2 H CD O O) </> UJ Ü QC < 4* P? K ll I I <% "fei 'Q f
I % 4*? ll I - ü z /) I J (5 /) 2 - / J z Q. J X X J 5 G Q J s J J /J z *" J - LL L Q t-i ' '," ; i-'i S": t : i ) Q "fi 'Q f I»! t i TIS NT IS BST QALITY AVAILABL. T Y FRNIS T TI NTAIN A SIGNIFIANT NBR
More informationRESEARCH STUDY ON ADOPTION OF SOCIAL MEDIA MARKETING IN THE ENTERPRISE (MALAYSIA CONTEXT) KEE YONG HONG LEOW XIN YI TANG XIN YI WONG SIONG MUNG
RESEARCH STUDY ON ADOPTION OF SOCIAL MEDIA MARKETING IN THE ENTERPRISE (MALAYSIA CONTEXT) KEE YONG HONG LEOW XIN YI TANG XIN YI WONG SIONG MUNG BACHELOR OF MARKETING (HONS) UNIVERSITI TUNKU ABDUL RAHMAN
More informationUsing Properties of Segments that Intersect Circles
ig Idea 1 H UY I I Using roperties of egments that Intersect ircles or Your otebook You learned several relationships between tangents, secants, and chords. ome of these relationships can help you determine
More informationOil'll. 't Or) [xdl^i^, CtJiMr^ ~t x. tbu to#*a) rf. 3*^^1IlSr>' r e u <i^-^j O. , y r v u \ r t o < x * ^ v t a ^ c? ] % & y^lcji-*'**'* (» &>~r~
Oil'll A l r x a t i i i r a B r a l l t f ( E m m t t t t t w. / P.O. Box 2, B e r g v l e i. D i s t r i c t J o h a n n e s b u r g. Ph o n e 4 5-2 4 6 9. R e f. N o. A I ( * J - i i ^ c J,,, JOHANNESBURG.
More informationn r t d n :4 T P bl D n, l d t z d th tr t. r pd l
n r t d n 20 20 :4 T P bl D n, l d t z d http:.h th tr t. r pd l 2 0 x pt n f t v t, f f d, b th n nd th P r n h h, th r h v n t b n p d f r nt r. Th t v v d pr n, h v r, p n th pl v t r, d b p t r b R
More informationIII Illl i 111 III illlllill 111 Illlll
t - - - - - QUQMOLY"lJl) 7 M ft Fi t FQRMRT* ;ty- - / OC../^. l_.^... FIGURE: 4 III Illl i 111 III 111 111 illlllill 111 Illlll Areal \\Jct (p~~7 v~v t 42C81NW0009 eel COWIE 200 " - t ipa- - cs-a x s\-8.xjw
More informationo V fc rt* rh '.L i.p -Z :. -* & , -. \, _ * / r s* / / ' J / X - -
-. ' ' " / ' * * ' w, ~ n I: ».r< A < ' : l? S p f - f ( r ^ < - i r r. : '. M.s H m **.' * U -i\ i 3 -. y$. S 3. -r^ o V fc rt* rh '.L i.p -Z :. -* & --------- c it a- ; '.(Jy 1/ } / ^ I f! _ * ----*>C\
More informationilpi4ka3 MuHucrepcrBo o6pasobahufl Huxeropollcnofi o Onacrrl rocyaapctnennofi rrorosofi s2015 ro4y fl? /CI.?G
MuucpcB 6psBul uxpllci cl ilpk l? /C.?G ' uxui P' 06 YP [pcjb CCTB qb cypci KMqui KMcc uxpqcci 6cu 015 Y' B cstctb yktm 1 lpxk plbl' 'cypcsuii u "c1 6p:JbbM ppmmll Cp 6[ Sp: ybpx pkm MuucpcTB 6p:ux 1 yk
More informationV o. 'f o. 'NJ. 'Ni c.. l ~ u u. YI \lv\ ~ ~ f fov c.tr '+- Cu w11.t r M o'n ~\'1
la~t ~'fr\l. 1.. i~: ~ =-M:X tb Cirili. lx-~~t ly-~)\ fi. Tu~ll~: ~ Hli'JJ'"~ \WWI 1 we' II 'vj YH'\~ i\i\ M1t. t 0 V o. 'f o. 'NJ. 'Ni c.. l ~ u u. YI \lv\ ~ ~ f fov c.tr '+- Cu w11.t r M o'n ~\'1 ~I
More informationChapter-wise questions
hapter-wise questions ircles 1. In the given figure, is circumscribing a circle. ind the length of. 3 15cm 5 2. In the given figure, is the center and. ind the radius of the circle if = 18 cm and = 3cm
More informationPage 1 Central Angles & Arc Measures
Geometry/Trig Unit 8 ll bout ircles! Name: ate: Page 1 entral ngles & rc Measures Example 1: JK is a diameter of ircle. Name two examples for each: K Minor rc:, Major rc:, M Semicircle:, Name Pair of djacent
More information. ~ ~~::::~m Review Sheet #1
. ~ ~~::::~m Review Sheet #1 Math lla 1. 2. Which ofthe following represents a function(s)? (1) Y... v \ J 1\ -.. - -\ V i e5 3. The solution set for 2-7 + 12 = 0 is :---:---:- --:...:-._",,, :- --;- --:---;-..!,..;-,...
More informationLecture10: Plasma Physics 1. APPH E6101x Columbia University
Lecture10: Plasma Physics 1 APPH E6101x Columbia University Last Lecture - Conservation principles in magnetized plasma frozen-in and conservation of particles/flux tubes) - Alfvén waves without plasma
More information,\ I. . <- c}. " C:-)' ) I- p od--- -;::: 'J.--- d, cl cr -- I. ( I) Cl c,\. c. 1\'0\ ~ '~O'-_. e ~.\~\S
Math 3306 - Test 1 Name: An d {"0v\ ( _ roj ~ ed Date: l'( ~0 { 1\ Fall 2011 1. (to Pts) Let S == {I, 2, 3,4, 5,6,7,8,9, 10}. of each of the following types of mappings, provide justification for why the
More information1-1 z. ]z]< 1 invariant and Do be its fundamental domain, containing z=o. Proof. We consider Do as a Riemann manifold F of constant
104 [Vol. 21, 19. ome Metrical Theorems on Fuchsian Groups. By Masatsugu TsuJI. Mathematical Institute, Tokyo Imperial University. (Comm. by S. KAKEYA, M.I.A., Feb. 12, 1945.) 1. Let E be a measurable
More information,y. ~ (Lo )-Y2 ') '---~ F( '...J ( '1, 4. \fer-\{:k. ('X -5)'1.-+ :tl\ ~\:,) ~::; fi(~ S:;')'"'--t L. X-lOX t ~5 = IJ~-~+~5.
Name. Date 18. Write the equation of this conic: No,y. ~ '---~ F( '...J ( '1, 4 2A. Write the equation of this conic: \fer-\{:k. (lo) -3~2 ') (Lo )-Y2 ') 28. Write the equation of this conic: - - - -...
More informationbounty Herald Times THURSDAY,- SEPTEMBER!7, 1925
420 J 925 UU L 875 L 0 U «OJJ U U J OUU U ««J =» V ULU»» L U 4; J O O ] ; F < L < L V VV J 29 840 3 9 2 5 85 5 V U U»2 U U L L O OU F O OV O; X F O U «] ; U (JOVV q O ; < (» 4 V 50 26 U 7 925 UU OQ ; F
More information, (1). -, [9], [1]. 1.. T =[ a] R: _(t)=f((t)) _ L(t) () = x f, L(t) T., L(t), L() = L(a ; ) = L(a). (2) - : L n (t) =(L n )(t) = 1=n R supp [ 1], 1R
25 3(514) 517.988..,..,.. -.,.., -, -. : _x(t) =f(t x(t)) _ L(t) (1) L(t) _.. - -, f(t x(t)) L(t). _ ([1],. 1, x 8,. 41),. [2]{[4],., [2]{[4],, [1]. - x(t) =x f( x())dl() t {, {.. [5]{[7]. L(t),. [8] (1),
More informationUNIT OBJECTIVES. unit 9 CIRCLES 259
UNIT 9 ircles Look around whatever room you are in and notice all the circular shapes. Perhaps you see a clock with a circular face, the rim of a cup or glass, or the top of a fishbowl. ircles have perfect
More informationGeometry Chapter 8: Area Review PA Anchors: A3; B2; Cl. .1.t+~4 -~-J. ""T... Sl. J":..2.l.. -+-Jw. A =- A(~)'" ~ A :..!w-l-~
Geometry Chapter 8: Area Review PA Anchors: A3; B2; Cl 1. Find the missing value given BCDA is a rectangle. Perimeter = 62 cm Area =? V:. d.t-\" ~vj B.--- ---,c 17 em ~ J. ':. ~). -:: - '0..., rj ~ -;:,
More informationTopic 5.1: Line Element and Scalar Line Integrals
Math 275 Notes Topic 5.1: Line Element and Scalar Line Integrals Textbook Section: 16.2 More Details on Line Elements (vector dr, and scalar ds): http://www.math.oregonstate.edu/bridgebook/book/math/drvec
More informationATTACHMENT 1. MOUNTAIN PARK LAND Page 2 of 5
ATTACHMENT 53 YOBA LINDA Gyp Yb gl 9 Gt Fthly gl t 247 Mt Utct cl Mt Gyp 248 248X A0 A0 Hghy G:\jct\K00074232_p_Iv_Cp_L_Dt_204\MXD\p_Iv_Cp_L_Dt_(K00074232)_0-29-204.x C ( l t b t f y p b lc ly ) Ch Hll
More informationTV Breakaway Fail-Safe Lanyard Release Plug Military (D38999/29 & D38999/30)
y il- y l l iliy (/9 & /0) O O O -..... 6.. O ix i l ll iz y o l yi oiio / 9. O / i --, i, i- oo. i lol il l li, oi ili i 6@0 z iiio i., o l y, 00 i ooio i oli i l li, 00 o x l y, 0@0 z iiio i.,. &. ll
More informationCHAPTER 4 DIFFERENTIAL VECTOR CALCULUS
CHAPTER 4 DIFFERENTIAL VECTOR CALCULUS 4.1 Vector Functions 4.2 Calculus of Vector Functions 4.3 Tangents REVIEW: Vectors Scalar a quantity only with its magnitude Example: temperature, speed, mass, volume
More informationcos 5x dx e dt dx 20. CALCULUS AB WORKSHEET ON SECOND FUNDAMENTAL THEOREM AND REVIEW Work the following on notebook paper. No calculator.
WORKSHEET ON SECOND FUNDAMENTAL THEOREM AND REVIEW Work the following on notebook paper. No calculator. Find the derivative. Do not leave negative eponents or comple fractions in our answers. 4. 8 4 f
More informatione. Find any points of inflection. Justify your answers.
Section 5.3 FTC Free Response Questions. (Stewart no calculator) Let g ( x) = x f ( t) dt, where f is the function whose graph is shown to the right. a. Evaluate g (0), g (), g (2), g (3), and g (6). 0
More informationAssignment. Riding a Ferris Wheel Introduction to Circles. 1. For each term, name all of the components of circle Y that are examples of the term.
ssignment ssignment for Lesson.1 Name Date Riding a Ferris Wheel Introduction to ircles 1. For each term, name all of the components of circle Y that are examples of the term. G R Y O T M a. hord GM, R,
More information1'U'VI (9) 'rlq'l;.rnfillj 1!:ld::'b(9) L~iH ljl~~fl1~ll~~n~ n"ll'f)~fl1~"il'u'u~i'ul'rlel~~l~~ljfil11lj)uj'~j."h,'untu1"'1iel51615j1"
, E 13 j CQ\),.I 'i, " "'. "... -. ' ";'i ;,,../ di.. 1:fn;f1'6'I"in1n'iltf1 U(i :Yil1J.1n'117,U D71 m1 m7;(,ji"u 171 ;47\), 'l\j'n'llfl1 nlj'uvlii'jnil'ull'u'vi'l6 L'VI''j Oc GIl-«f(9)d::'b«fb'l! 'f)
More informationGeometry: A Complete Course
eometry: omplete ourse with rigonometry) odule - tudent Worket Written by: homas. lark Larry. ollins 4/2010 or ercises 20 22, use the diagram below. 20. ssume is a rectangle. a) f is 6, find. b) f is,
More informationd ; xe q56e :I L -E EdFE 8E f; 5 EE? s c,' tl o 9!x xzo o:e-' na ^o3 HIiF NAH \ae}.5 TJaE ^Fl wtdq wvx ztd =!a y '>j< Ytrr(D J-N(l ^[\ /'t E=Ft
: l hl O ff'l n1 m ) j /'; 1 Yt(D N(l w +i ^lal z :sl q6 : L l\1 8 f; i i fi \/ \Y.\z 'f '9': fn i ^. T1 (.,,] wwl * /1 g,^(,l t la i{,
More informationGrain Reserves, Volatility and the WTO
Grain Reserves, Volatility and the WTO Sophia Murphy Institute for Agriculture and Trade Policy www.iatp.org Is v o la tility a b a d th in g? De pe n d s o n w h e re yo u s it (pro d uc e r, tra d e
More informationReview Quadratic Formula, Cornpletinq.Square and Quadratic Applications
Name_g_jf ' period _ Review Quadratic Formula, Cornpletinq.Square and Quadratic Applications,! 1. The John Deere company has found that the revenue, in dollars, from sales of heavyduty tractors is a function
More informationFind the equation of a plane perpendicular to the line x = 2t + 1, y = 3t + 4, z = t 1 and passing through the point (2, 1, 3).
CME 100 Midterm Solutions - Fall 004 1 CME 100 - Midterm Solutions - Fall 004 Problem 1 Find the equation of a lane erendicular to the line x = t + 1, y = 3t + 4, z = t 1 and assing through the oint (,
More informationand the ANAVETS Unit Portage Ave, Winnipeg, Manitoba, Canada May 23 to May E L IBSF
t NVET Uit 283 IR FO RE VET ER N N N I MY NVY & R 3584 Pt, Wii, Mitb, IN O RPORTE E IL L I GU VET IF N ENG R H LI E My 23 t My 28-2015 R LE YOUR ONE TOP HOP FOR QULITY POOL UE & ILLIR EORIE GMEROOM 204-783-2666
More informationR e p u b lic o f th e P h ilip p in e s. R e g io n V II, C e n tra l V isa y a s. C ity o f T a g b ila ran
R e p u b l f th e P h lp p e D e p rt e t f E d u t R e V, e tr l V y D V N F B H L ty f T b l r Ju ly, D V N M E M R A N D U M N. 0,. L T F E N R H G H H L F F E R N G F R 6 M P L E M E N T A T N T :,
More informationRED NO. BAG (KG) 2.9. l41 3) ~ ~6 ":K. .s~.2. \ S:2.. I) -:} 14~V'2. \22, 01 1'2.\ \6 ~, ~CJ. ~:=\ t ~5'.as' 1'-'<6 3 S- 1'23'\2.
GUJARAT CANCER & RESEARCH NSTTUTE, BOMEDCAL 1 2-3 ::tz S( l5':1-,c)'1. b \ 1.".-'2.. -\.s.2. \ \tl 102 f 36 5'2 92- ) -:} "Z 14V'2. \22, 01 9;"0 Y (;0 '1-tg.s-S: C;? - l G::t 101-0 :=\ t 5'.as' 1'-'
More informationby Fdruary,2015 It may. kindly be eosured that a copy of deposit slip is supflied to this for All the Principals/HMs,
.DBS(B) (10)/2014 3, /l 2' Oi.e he Depy Direr Hiher din Bilpr Diri Bilpr (). Tele phne /x 01978 2228 emil ddhebilpredinil.m '. Ded Bilpr 174001,rr he,. ' i i, lj by drry,201 All he rinipl/hm, Di Bilp"i)
More information88 N L Lö. r : n, d p t. B, DBB 644 6, RD., D z. 0, DBB 4 8 z h. D z : b n, v tt, b t b n r, p d, t n t. B, BB z. 0, DBB 4 8 z D. t n F hl r ff, nn R,
L x l h z ll n. V n n l Lö.. nn.. L RD h t t 40 für n r ( n r. B r 22, bb b 8 h r t llt. D nd t n rd d r h L länz nd b tät t: r b r ht t, d L x x n ht n r h nd hr ftl h b z t, nd rn h d r h ündl h h ltr
More informationH STO RY OF TH E SA NT
O RY OF E N G L R R VER ritten for the entennial of th e Foundin g of t lair oun t y on ay 8 82 Y EEL N E JEN K RP O N! R ENJ F ] jun E 3 1 92! Ph in t ed b y h e t l a i r R ep u b l i c a n O 4 1922
More informationHonors Geometry Circle Investigation - Instructions
Honors Geometry ircle Investigation - Instructions 1. On the first circle a. onnect points and O with a line segment. b. onnect points O and also. c. Measure O. d. Estimate the degree measure of by using
More informationСборник 2 fhxn "HeHo, Dolty!" HAL LEONARD D/X/ELAND COMBO PAK 2 Music and Lyric by JERRY HERMÁN Arranged by PAUL SEVERSON CLARNET jy f t / / 6f /* t ü.. r 3 p i
More informationBy J. B. MOORE Department of Electrical Engineering, University of Newcastle, Newcastle, h~ewsouth Wales, Australia. [Received October 10, 196 7]
INT. J. CONTROL,1!)67, VOL. 6, No. -i, 373-379 Stability of Linear Dynamical Systems Non-linearities~ with Memoryless By J. B. MOORE Department of Electrical Engineering, University of Newcastle, Newcastle,
More informationReteaching , or 37.5% 360. Geometric Probability. Name Date Class
Name ate lass Reteaching Geometric Probability INV 6 You have calculated probabilities of events that occur when coins are tossed and number cubes are rolled. Now you will learn about geometric probability.
More information-2x -4 = L - zx -- lo. 4r -- c r-_ L q. -'lx -- Z.L 9. 3)= ux,-8 =ZA. G - (tx f Z = z Y. 3x =1. ,1 'l
Algebra 1: Chapter 2 Test Review (2.1-2.5) Name: K. Target #l: Solve one step equations using addition, subtraction, multiplication, and division. x-3=9 +3 +3 2. y*4=2 -.1 -Y 3. 4m=28,1 'l t4 Target #22
More informationINNER DERIVATIONS OF NON-ASSOCIATIVE ALGEBRAS
INNER DERIVATIONS OF NON-ASSOCIATIVE ALGEBRAS R. D. SCHAFER In this note we propose a definition of inner derivation for nonassociative algebras. This definition coincides with the usual one for Lie algebras,
More informationi m z j 1 i -- '*v<ke- 1J ^ *. e ^ A e ^ ^ y/* ' Q ) i/~/e & ) * 50 to *** < I 3*. * *- - f i * 3 > ~ v < 5 >
^ t r A t~ t i* v. i m z j 1 i '* k~r +»U A. C9< «^ «. - u * / n a ^ U o G i d. A m.^ cj
More informationl l s n t f G A p p l i V d s I y r a U t n i a e v o t b c n a p e c o n s
G A 2 g R S 2 A R 2 S I g 3 C C 2 S S 5 C S G 6 S 4 C S 5 S y 1 D O A 1 S R d G 1 d 1 E T S & T 2 Vg y F P 4 2? M I 2 J H W 1 W B C L D 1 2 L W 4 M T 5 M S N 2 O I 4 P 7, P S 1 8 R I y y w Y f If f K f
More informationTHE MAXIMUM OF SUMS OF STABLE RANDOM VARIABLES
THE MAXIMUM OF SUMS OF STABLE RANDOM VARIABLES BY D. A. DARLING(') 1. Introduction. Let Xu X2, be identically distributed independent random variables and set Sn=Xi+ +X. In this paper we obtain the limiting
More informationCITY OF LOS ALAMITOS. Register of Major Expenditures. August 18, To Approve. To Ratify
TEM. 7 CTY F LS ALAMTS Register of Mjor Ependitures August 18, 214 Pges: To Approve 1-3 53, 431. 2 Mjor rrnts 8/ 18/ 214 Subtotl 53, 431. 2 To Rtify Pges: 4-5 146, 476. 74 Advnce rrnts 7/ 28/ 214 6 217,
More informationSection Vector Functions and Space Curves
Section 13.1 Section 13.1 Goals: Graph certain plane curves. Compute limits and verify the continuity of vector functions. Multivariable Calculus 1 / 32 Section 13.1 Equation of a Line The equation of
More informationSupplementary Information
If f - - x R f z (F ) w () () f F >, f E jj E, V G >, G >, E G,, f ff f FILY f jj ff LO_ N_ j:rer_ N_ Y_ fg LO_; LO_ N_; N_ j:rer_; j:rer_ N_ Y_ f LO_ N_ j:rer_; j:rer_; N_ j:rer_ Y_ fn LO_ N_ - N_ Y_
More informationtd,gwit91fl 11,1111f1151,U1,16'3 VIM.&d-f1F1.&d ,16
InvnilvivnnifnufrIlon,n41 GLVI1f1111.1.fit1,14V nttlu@fiod..1riglkolll-1515f1.1qt titiueilltn-rtirurtelijirrivueilli 1 ni5ruif1151111-rilens15tuljdiiillioufiguludttlnlniiiurnlonii'l;@fil Lirduill irwriluvriuviovii'vinnn.nlij5tilv1e,
More informationVector Calculus handout
Vector Calculus handout The Fundamental Theorem of Line Integrals Theorem 1 (The Fundamental Theorem of Line Integrals). Let C be a smooth curve given by a vector function r(t), where a t b, and let f
More informationHumanistic, and Particularly Classical, Studies as a Preparation for the Law
University of Michigan Law School University of Michigan Law School Scholarship Repository Articles Faculty Scholarship 1907 Humanistic, and Particularly Classical, Studies as a Preparation for the Law
More informationName Date Period. Notes - Tangents. 1. If a line is a tangent to a circle, then it is to the
Name ate Period Notes - Tangents efinition: tangent is a line in the plane of a circle that intersects the circle in eactly one point. There are 3 Theorems for Tangents. 1. If a line is a tangent to a
More informationc. What is the average rate of change of f on the interval [, ]? Answer: d. What is a local minimum value of f? Answer: 5 e. On what interval(s) is f
Essential Skills Chapter f ( x + h) f ( x ). Simplifying the difference quotient Section. h f ( x + h) f ( x ) Example: For f ( x) = 4x 4 x, find and simplify completely. h Answer: 4 8x 4 h. Finding the
More informationColby College Catalogue
Colby College Digital Commons @ Colby Colby Catalogues College Archives: Colbiana Collection 1870 Colby College Catalogue 1870-1871 Colby College Follow this and additional works at: http://digitalcommonscolbyedu/catalogs
More informationCATAVASII LA NAȘTEREA DOMNULUI DUMNEZEU ȘI MÂNTUITORULUI NOSTRU, IISUS HRISTOS. CÂNTAREA I-A. Ήχος Πα. to os se e e na aș te e e slă ă ă vi i i i i
CATAVASII LA NAȘTEREA DOMNULUI DUMNEZEU ȘI MÂNTUITORULUI NOSTRU, IISUS HRISTOS. CÂNTAREA I-A Ήχος α H ris to os s n ș t slă ă ă vi i i i i ți'l Hris to o os di in c ru u uri, în tâm pi i n ți i'l Hris
More information