!"#$%&' "# () *+,-.'/ :5678 ; ' 678FG HIJKLMNO A B > )PQR ST > U#VWXY' % % % Z[\]^_`ab % c > P)PQR'_ +')P ' ' *' 1 &' T *
Size: px
Start display at page:

Download "!"#$%&' "# () *+,-.'/ :5678 ; ' 678FG HIJKLMNO A B > )PQR ST > U#VWXY' % % % Z[\]^_`ab % c > P)PQR'_ +')P ' ' *' 1 &' T *"

Transcription

1 !""#$%& '() * +,-. /!" !" 6'2789:;!! 2 79:;! <"=; >?@ABC!"DE >?@A * F:!"DG!H IJ+KIL *M@A!"DENO G!" +K! DGPQ<"!DE UVIL WXY A <"=' 4! Z [R\!]"^!4_`abc!"=;NO G F: * I!4^ #!

2 !"#$%&' "# () *+,-.'/ :5678 ; ' 678FG HIJKLMNO A B > )PQR ST > U#VWXY' % % % Z[\]^_`ab % c > P)PQR'_ +')P ' ' *' 1 &' T * J J > J Q( J *+, HKLB FG II 0 [\ * )P + ) ( + PC ( + *

3 !"#$ %&' ' ( )*+!",-./01!234567/! 89 :; * ( < AB %CD E C!"FGHI. JK LMNO CPQ/ RS T UVWXY CD Z[\8! ]^_`acd 6/b #$c, E CD A =! (4!. C DM!. CD L L M CD 5 CD E3!! [!.I! -.!" I UJK -. T $!. NO $ L M = /b C C C LMC 7 <! b!!", - K!!" ' K -. CC C BA! %C BA `ac E)*!!!" C! )*! ( *!!!",. 5 T XY! C E AB!!!"!!"#$C %') &'#$C! $C! C ' () )*+,C -PC C. / 0 1! C )&.$-P$C 2! :; 34C C : 6789 ;! C!"#$!%&' C ET $ <= >?@! ABC. % C D! E $C! C D () D C! C )&FGG H IJ KL MN O #$ C 5 "D! C C )&D!"!c, P QD < R!"D S 5 C! D TU DV FW D G!"!!",. X Y D P D )*D ^ Z T! C B [\] C! ^_`ac b_1 c ( A b_ WK! P C5! )* 'E )!",.

4 !"#$%&' ()*+,-./01 1 2/ :;! 6789 <.=>?@ AB C D E 11.F ;GHIJK LM.NO PQ R;STU1 VWX1Y 6 HHIZ [\ T]^._` a 61 bc61..1 ) A M NO J T 1 T C/ 1 TU 5 / 7..!"#$%&' 1. TI -. = 5 5 (. C ^ C.! " #.1 $ C% & C ']^. 1 T C/ C. ()(*+,1 1-./01 H 51 [ C / 1 TU : ; YY. A B< < B= (BZ 5H C CN DC.E< C FDG.K1HI FJK. L N <MNO P < QR STUVDWXY 0 #

5 !" #$% &' ( )*+!(,-./ 01 ( **78!9:!"# $%& ' ; 5 < <! =>?@ ABCDAB! 2E! ) F G-HI BJKLG-M CD NO 01 - PEQRS MTONUVRS!WX Y % 5) Z[ \] [ ^ _`a)bc5 \ c 5 RS V 6 3 " P RSM)* JNO + B BF 5 c J J 1 ()$%& * +,-./01 ( ; 5 WX RS OM$%!J J O 5! - B 5 U O 5 5 ORS +! OB )B Z)* 5 B 5 OM!" # $% 1& ' % ) O $' ( Z 5 Z)Z* Z +,* Z -.* /01 5 ( ( 3U 2 34($$ 5 B 5O6 78! 9 A:; B 5 O ( 0 <=>? B@! 5 ABC2! 23 4 $% ;!DQ 7E 7+! * F GH *! I JI!* K+L!M4 NO< P3 QR PST U!VW UX M? 5 +BY!$EBYG Y.! 2E! KZ. [\ ]^_ `a?7fbc I %)*!

6 !"!"#$%&' ( )*+, -./ :0 ; <=>?@ ABC DE 0 :0 FG HIJK HILMNO :0 H :02PQRSTUV WXY; UX Y;NO HZ[\]^DE Z[\ _`ab c:0 E IJK N:0 9 < :0 9 2 b N:0 ; 2 3 "# 2 U :0! :0 9 9 ( 9 2 c 9 3 :0 ILM 9 "# N 2 2 U - # N9 :0c 2 9 :0 9 :0, " # H 9 :0 - _ ( _"!9 2 "#$ :0 2"#% :0 2PPH&' E ] ( :0 2 )# * E:0 9 :0 QRST +,-. 9 (/ c +,-. 9 (/ 01_` c 2 -)# 1 2 ) 2

7 !"#$%&' ()*+, -./ : ; D 456E 6F GHI6 6FJKLE MNO(F (F 456 6E 6: 6PQRSTUVW7( XBPY P S VW71 Z[ GHI\]^ _(`456 ; aa bm NO \];c ;! F0 ; 456 PQ0 c ;456 (FP \ ( _ ` 1456E69: " #PQ (; S 0 PQ, 8 PQ 4563 ; [ ( + 6 MNO 456 #PQ PQP S [_ c "# ]! P P"#$%P&' PPQ NS - 0 ;` # () 1 P PQ *+, - PQ./ ' 0 W1` 9:` [ `97 8 9@ P Q :; ; ;< = _ A ; B [456PQ "# C,:; D 6E PQ"# Y W1` 456PQRRF c6( ; N ( 2 ; ; ( P Z1 F c( 3456 PQ E ; # G (3456 HaA ; N IJ (KL 6EMN O B H ; aa( ; N )^ P@Q P< * RO X J ST(URV I ( WX 6-# Y ; PQ ()* +,

8 !"#$%&' ()*+,-. /0 1,-. 2 3, :;, - <=>?@ABCD,-.E &' +; F GGH IJ KLM N>;O / PQR S T1,- U"VW XY Z[\ ]^_>`_VWab_ VW ];c MN>,- Z ;,*+,-!"VW CD/0 XY PQR,- U"VW CD/0 c % % VW,- S T,- U "VW CD/0 23@67 ; /0 V 2 VW, - U"VW ^1 U"VW#$ #$ 6 " Z[ U" 23% ( " > VW T \ J \ N 6 ]]H ; C + <,-. H, H &! "Z[# $% U" &(\' "() Z[*@+, XY %&( VW -. 6 /

9 !" #!"#$%&'!" ()*+, -./ +,01)* " ( 2 3 ( :; (01, < = " ()*+, >?@ A B#CDE " ()*+, FGHI JK " L MNO G P Q R ST )U V W X?%1Y E B# Z[I \] P Q[^_` abc )U c O # I c A X \ P Q _` PQ G #$L Z Z[I R ST R )U _`H R S VW % % VW P V _` R c VW ce VW cl4 >?@ _`c S c H S c 1S Y` " )*% O ` 0 R ST S Z[ VW X?%1Y 2 3!=+"#$%&C ' A %1Y >?@! ( VW )?P*!)*+,`+L,- A

10 !"# $% &' ()*+,- (./0 ( 1,-! /789 :9 ; 7 / <!= >?@A (;! ( 1,- BC.!DE "# 56 2 ( ( 1,- FG & ()*+,-HIJ<$% KLMNO / J ( J%,- PQRST J< U / VW "#XYV ( 1,- ( 1,- * "* (),- (Z)[ \ F]^ V_ `abc `a `a 2 ( I & D S FJ< P R / * ()S P D )!: &R 2Q ] &)! = (R /,-(Z,-) F 2S I# R <O A ' ) ) L V_ `a G ()[\ 2 ) ) "7 9 :9;,- 7 V ' ") &! (> V$ %, JG /G (1IVJ< )O `a ) P ()!- 2V" )I#

11 !"#$ %&' ()*%+,-.%/0 1 #$ %/ #$ %7& 3' 89 (: ; ' <'= ( >?@A7? BCDE FGH3' IJ3 ' K LGM NO7 3' 7 3' 7 K P QR S T U 7NO VW XY &B7 Z [\]^ _`adbc Qb X& 73' # 7 B %7 #$ U 7 P H 7&' M; S 6@7 ` 7 : '( > &' ( X& ; S F U 73'GQ 73' K QFF F F8 F F : 6H3' G F![ '!"! # $! PG [ % / [D [ [ %1!X" #$% &'!"! # $! [ () * Z + F7?, -.!"! # $! /04: 1 7; D [ 7 D % D :2; 7 2!"! # $! 7G ; 7 <=>? A BC7; 91+D GE? B7

12 !" #$!"# $$%&' () *+,!" $%-./0 1 /! 2"345$67-8 9: ;" $% " $6<=>?@$% AB $$%&' CDEAB $%" $$% ' EAB FG"HI "J HK"$%LM$%NIO"K$% $/ AB <=> P ;Q R STUV (W-XY $%V ;" $%-./0 V $% -Z [\]^$%_`O2a b,c P ] V,, Q V F,<=>$6 " $$% "K $ = " V, V + V2 I? 4 OA /, V $%&' VI '2 4 ;" $%-./0 V 'J > O"K$% Z $%P "K$%V $%P KJ/0J ]^ $% O D! $%"K$%O 2a +VV <=>V Q,!. "#$% & -. $%V P '! $$%?@$% V ( ")!" $%-./0 * $% +,-.-/0-. 1!" $%-./ 0 1 V / 1 <=>$6!" " 23Y45 6 #7!89" "K$%$/ V$!V/ 0J,! " #$% &'#" ' '"% &#" ' " V:; 5,JV < =>?@ A!" $ %-./0 B,C%?@

13 !"!"#$% &' ()*+,-./ %7 8 &' %9:; ( <=>?@ AB CDE 3 $ 3 F G?HI%JK JL?HM# NO & ; PQ R STUVW.X Y % &'% Z[%$% \]^_ ]3 2 JK`abc$ Z ; -; -;, 56&'$ 7 34* 8! M. ( X<=>.X 34 % (3478 I% JK % M# 7W 78 F I%JK H C N W I% H NO??@ 78 7JK ; NO D NO? ]? % R %( I%JK ) JK ; NO D I%JK! 78 " #$ % &' 4 &' % Q ' () %*+,- Q &. / 01 % "#Z 2,3M ; 45 / A6 7Z Q89 :;

14 !"#$%&'! "#$%&' ()*+,-./01! :;!. A BC DE!; FG HI J. KLMNOH!. 4 PQ RS T UVWXY! A BC!. Z [\]^_E`ab c & 8! >> 34 P N> >! 8. A B C Y >! - > E! & 8 c! " ( )*+,-./!. c A A BC b 9 DE H > E. 2 >!"#2 $ 9!. 23 4%678:; <Y FG9 & '8 <= 9 I J. C. 2 () * 9 :; +,-./ ! % 4' 2 56& 7 " 8. ]^ 9:;. 2!

15 !"#!"#$%&' ()*+, -./ :!"; 2 ' <=>?@ABCDE $ FGHI12JK2% LM NO G % K N E 2 PQR STUV2GWW N 2XY Z[AB\] ^_`a bc`a < A 2 ABN H $ % 2 M 2F 2 N UV AB 2 JKI 2 2 %&' C. Q 2!4 > 21!"#$ 2 8!"#$C 2 8 & 2 G 2%& ' 2 N N F QR 2JK CD *3 2%&' 2% M CD9: $ ( 2% LM GH!QRY"^#2GHH JK ^$!" 2 M 8 %& ' CD 2 M 2 ()* $ G+,-.*3 /0%&' 1 12#$$ 2) ^ CD!"#$ ' G23 ;!"4 5 6 #$2!"N 7 18^$92:; N C \ 2< 2=C >? 2 C DES #$

16 %&'( ) *+,-./0!"1 ' C6 % D. J 4 <? R O H 6!"!"!" & C EO!"#$%%&!" ' >O(BC )* +, -../0.1 [ _78 &9 (: ; * '.<=>BC? c@ab3cde : 4 B F G H %I & JKL C 78M N%O < E E EE&P 3 EE QR <ST 6. OU VB3 OBW KX Y$ D 6 E Z O[\]^ ' _`6 < a bc > <!"#$!"#$%&' ' ()*+,-./ #$% 9:#$%; 0. < =>?0@ABCDE $ % <=>&'?F GH IJ6KL MNO ' O PQ GR ST 0. 6U VWXY WX 3 Z [\]^ _ ` a _ bc 6 c O O Gc N? #$ %0. 0?@ABC6 0H 6JD 0 1J 6Q %1 J M 1 0.!"OBC. H? K > &#$ ( _0.O@A 6 J '.G? & >

17 #$%&'()*+",-!,$,*Z[,\]^_ `L `LIab\]c 6b*ZE # I S I S,$,*Z[,\ ^ _,\ ^_ 8 #; %; $* $*Z IJ4 A [,; ] E $* [, 0 [, >?S `L J )X.,\ ^_ ; ^_ S 6b ab \ I > EJ) I>?,\ ^_ ab\ I> 6I ab\ )!"#ab\ ;$ %; &'@A ( ) ^ * X ab\ \ +,-I./01!"!"#$%&' ()$*+,-./ :$*;, <=>?@ABCDE 8 ()$*, - 8 $ ; FGHIJ3,K L I 9:$*;, 8#M JJ3 IG ()$ *, -NO8 E PJKQR E - STUVWIXY

18 !"#$%&' ()* +,, +, -. /0 1!"!" :; 6 5%<=2> ABD 1 AB DF GH7IJKLM NO 1 5E 2 N $1PQ5R92 STU V WUXY 9 Z [\ NO]^L6!"#$ %&'!"#$%&' _`abc. # $ % K>.. 2.V 0 1, 1 45 K> %# 1 [a 2 #. 1. JKLM 1 4 # # X / 1 2 1, %!"#$ %&.. $ 1'2 () *+,- 6 7D.Z[ [0/015L6 `a. c E. 2 2.V : ; 92 [ $ 5 1! Z[ 1 < = >0?@ #A. 1B C5LD; E 12 A 1L F #-Gc 1D3HIJK# LMD>`a 21 0A N O! " #$%

19 "#$%&'(). / 01 # / 0B a6 c / 6< [ < * 6 `Z *!"# $ ^% * &'! * / *^% P ( ) **+, : - 6 *. /0 XY * 1 1c * Y6 8 2O O38 J * 9[: ;** I* <' *= > 4 #?@ A BC DE* 7 c!!"#$%&' ()*+,-./ :; + <=>?@ 2 3AB<CDE / < <*FGH56I J K $6LM <*NO D <C P Q6RS+ *TUVW D<CXY Z [ \] ^_+`, ab!c * O `ZN *+ `8 9 =>/ < LM! < *FG 1 5 L M L " # ] *+ +`,5 1!c *

20 !"#$%&'! Y 20 (* -/ H 4 2!" (#$ %(& ' O / ( Z W G H )* K+, -./ 0 `1 &' 2I = ; ` = 2Q %(=89Y :; = `` 2 3 = =_ < == >?M\O@=AB! UVC =DE = Y= F /G'= F? =HI CJK LLMN O? 2 = 8W 3 = 2Q PQ R\S>?T +U V 9WTU X Y J (./ I Zc [& \] # ^_=` a b c] J > = 8 ( #= K \ 0! "! #$% &' ()* +,-./ 0 #/ 1! : ; ' < = 2>0?@ #<AB=C DE! C 9 FG H=I78J =KL 2 # MNO = PQR'= ST!U VW XYW9: =KL 2Z[ # \=] ^_9V`a/bc \= < = V` &, =U 9 ; J = 2 I = \= N = ' UL! = 2 # = ' `4&'MI`4 # = I`4! #C = ` * Z! <=&' #&

21 !"#$%&' () $%!& & I 9 (L!0!" (# $%& $%&P' ()* &P+, -. / 01 2(0 3( $ KL : ;C W < = ( > & 3?@ AB CD3 EB 3 ( I F=QGWHI IJKL!0M NO(! LP & QRK $( S=A & CD3 ()TC UV( WX! Y$ (?@! ;!/C\ ] ^ & _`ab = & _` c (!&( +Q U $(! "#$!"#$%!&' & ()*+,-./0 1 * ( & 7 & 8-9: ;! 1 3 ( -! <=(>?@ABCDE 0( F GHIJKLMNOI / ( P=QRST UV WXY (=Q3 E L! +Z./0[!\](^_`ab 0c2 (./0( " P@ (' B I3! ( I! F I3 L! 0= L! 0 ( "#$%!&&P 6&!&!&= Q+!` TW=Q+ 3 (! =QRS J (./0 G ( ( F ( ( -./0 \ ( ' E 0(=Q 0(

22 !"#$%&'!"#$%& ). + I R 4 4 R@ ' 3 = 3!" IG#$ " %& ' %!" I () *+,8-8./ [ 4056 & : ; I9.68. / < BC D,8 E + M ; F GH I0 8JK LM NO 4!!"#$%&'() *+,-./ )56789*: ; )* <=>?@AB : CDE 1 FGH: IJ K LM NO K PQRS TUVWXY D KN ZH[ KQ\] ^ _ `a b c

23 #$% &'!"&' ; ) 5; 1 "#$% &' ) 9-56 Y `Z[R c a[! "#$%&;' Z )$5 () *+ ;,-. / ; 0=1 ); 1 O ` 2! ;345 _ 6789: ; 6 ; 6 <= < >= >? =? ;@A B C CDE ; W `X F G IF JK +LMG N O B R UP)QRC S TU!"#!"!"#$%&'() *+,-./ :; ; <=>?@ABCDE => ; < FGHI;JKGH%LMN O< PQ;RNS <TU;VWXY " < Z[GH;\ 9 ]^_RN`Cab c ; I 5 I; -!#R_ P ; \ \ ; JK \!; Y#R ; ; ] \ `b 5 ; - ;

24 !"!#!$ & # % # 13 ( (D + () 8 45 () ()!"!#- ; ] O$ %&' # # ()*+ % -,%-. # /0-1 G % #-# O % / #-0O:; Z!# _ 3- _ <!"#$%&'()* +,-./01 () () :; (+ <+ =>?;@ AB C 21313D(E # FGHI ()- JK LMNNO 13D ;O PQROHI ()ST-U VW XNNO Y- Z[S\] (D ^_-`ab c 13 Y "# P- =>/?@A 6B) <= `CD$-E ` ] - ` D$- # # - W % -0 OFG HIJ # -K$ # /0- F # D3 - D L % $% -&M % NO F -# /0 F# # _ *$% # - 0- P # () - Q RS!" ] 3 X I"#X() "# <"2 < - () 213 () X O ) X D *Z - () $ H -

25 !"#$%&' ()*+,-. $ 1/!. 2 $ H $ (,-. " / 25 " =(,-.2 " ( $2 H $ = :; ` $ (,- <(.02 2! "# $% 2,& 2 (' J G (, -2, (- )*+,H -_./<(= 0<(@A1 $ H,&=!P ( (, (, :; `5 $ <( 2 H < ( H = >? A_ $ B!.2 IC DE2 DE!S 01 $ F GHI JKLM NOH3 (, - 2 (,- 1 (,-P QRSKC 2 IC TUV! P W B 2 XF 2 YZDE( 2! "#$%&!"#$%&'() *+,-!./ 01 $&'!"# :; * +,-!. <(=>?<(@AB C DE 7, = DE 8 F :G<(!&'5H3 IJ!"#KLM NO L!PQR ST'UVW X 5YI!P! U Z[\ ] ^_ `5 <( a bci 0 a,!!p U 5! 67, 'U O ^ `!5>?<( 4 =!P! KL!P 5 :GB (!!. <( : 5 01& ) a25

26 !"#$%&' ()*+,-./ 01 %&! %'b 7%& 7!"#! C 4' 7 V! CT' F"#"#!C 4' %&' b () 4'%F 6 7 Y % 4' Y 7 K _ Y B% () 4' F Y 7 N 4'F / 7 %' b! 4' FW!K! * "#7 NH $% '&' 64 ' (4' % () )*+&,4' FGH-# AB./04'1 + 4'KLM H F 23 4B%&! 4' F 7 7 &5 4'6 78 9$7:; N < =4'> F &5 "!?"#@A6ABCDAE "# FF^ 7GHIJ$K%!!"#!"#$%&' ()*+,-./0 1 "# ' 234'56 789:; %&' ( 4 '5 7<=>?@AB!CDEFGH D 4'$H IJ KLM NO P7Q RSTUV $ #WXY X FO 7 N7 Z [5\]^_`ab)c 7 ' 1!"# F 7 [ ' ST ' C7 B C 7 ST 7 0 /F 7 U F 7

27 !"#$%&!"#$%&'( ) *+, -./01 23./ *89 +,:; ; <='><?@ABC DE * 5 FGHI0J K LMN+O F $N PQRS#TUOVW * X+,Y =67 Z[\ ]^Z_`O a bc M 0J M0 M.!". bc. $NR E +M. P Y KLM. 23NR KLM? T KLM 6JRV VW R +, W*T 3!" : A 5 VW!!G O )5!" /I ' 3 ; 5!" O 3 /W O 5T O!"!U"#$ a * %& /I ' * M I ()' * +, 3 -/./01 R R MW: G A :; Z \< = CO *B *@T 5./ T CT DE T FG U R CH5 W > *B IJ : K L M@ NOR NOR * a'@ R : 67 'GDP /I 2:2Q R X M R S O #T U Y

28 !"#$%&'!"#$%!&' ()*+,-.'/0 1!"#$/ !"#$9 : ; < CDE D 9 FG H%IJK; JL9 ; MNO P /QR STU VW XY P / I / Z [\ ]7^I `a 1 bc 9 W I / / WXY P / % _% AB I#$ / - T ]/1 - / J! I 1 / $ F N!"!"#$/ 1 1 /J - # JL ;,J IQ /Q/ % I / )/ I ()*+,-. /),01 ) 6 7^I 4 D H% / Q!"#$_% % % % % & %' (#)*+ /,U -.I/0/ 1 / I/ 2V3%45/ 6 / D a" 7"89/ #b :I / ; / ""9/ %H<= />? A]/ - - ] B V CD E./0 / % <6ID / C F <6IG H F I 4J KLM ND / O E J P( QRFS TD!U/V ( W.XY /0/ /Z [/G\ D (Z]^_ `a/ b@ O c - //

29 !"#$%&'( )#*+,-./ 01 /, - 23# : ; 0 9<=>?@ ABCDE 9 F GH 9 IJ*KLM 9NO & PQ >R> STUVWX Y :; X ZY [\Q 945] ^ _`abc BCDE 9 DE ' DE 4 DE DE > 5 DE ] X 7 8 DE / 5 _ 945 DE : 8 :! F GH 9 Q 8 /:; S Q ' ] ^ ^ $ ] X45 '?< - Q ; ] ^ 45A!"#$%& '$ 8 23:; Y '!"# ( )/ * +,-./ / 8 X01 Q 2 X* S 34, Q :, ; 2, X< 2 AB7CDE/ 5 2& &V F GHIJ K 2E/ FLMN P O PQRS T&UVW XY? 2E/ N PQ G 5, 2 7Z[ 2 \7 O] X6 ^_ YQ ` 2 a Y 2E/ b[ c?@ 3 2 W 2E/ :;!"

30 !"!"# $%&' () *+,-./ )348-. / 9:34; 8 <= >?@ABCDE$ $ FG HIJ KLMNOPQRST U $VWX 83YZ[ \]^ _`Vab8c V $O V ] & $G V32G S T G S V G + O V ; a ]& 3 $V NN I 8C+ G V G V E$ 1 $G > E L!V" #$ N% &' G O C V NB $ G ( ) * +,-.G /$00C 1 V ] CD!"# E$V " V 2 34 V :; E V 8# CD <= B?> BVCD E =E$3YV? >=;?V7 F V GHI8JKV L]^ A 0@V CD <( 34B V 3M8NO # > P QR V 8S? TVILU:E VW X Y( > B VZ8 LV B ] E [ C!"# E$\=B ] V^K_ ` E$Vab > c "# T!"# >V 878V E V 8 S

31 !"#$%&!"#$!%!&' ()*(+,-. /' :; DE :; (& F 24GHIJKLMN(O < :; > PQRSTU?@AB )VW )VW1XY FO :; > 4 Z[\]^_ :;O `ab&c ab <:; >O C)& O <:; > C)?@?@A B?@ \:; & >O <:;=> b C).'0 ' ' O:;= > O <:;=> K 9*( ) ' ()*' & F 1 & F!"#&$%&' R1 () * + F, 4-. F/ Cb& 89: ; * < ABCD & E; 8 & ; & F&GHI[ JJKL MN O O B () ;P QORST U V &-.!W CX YY & 5 < A Z[\] &^! _ `& aqb D c & <c C () /4 ` 0^ \ & F C4, U 7 < ab

32 !"#$% &' $!"# ()*+,-.!" #!"# /01 )* %23" :; (1( <=!" / 6!"# F G H IJ K*LMFH N H O O?P 3QRS 6TU' VWX YH 1 H XYH Z[\ XY ]^_` ' abh c G Z1 3Q Y K C F FG XY9:Z1. E F. < E F )* E F F $!"#$%&'()* C W W * K? Yb Y K & \.< C Y ; ) K Y ; )!"# $ %&'6 K ()* +,H-./0'1 F K K 567 D F K8 9:;N 9 K $%' "# &#<=F>YY K D EJ ; S ABC F ' GH IXJ KL MN ) K O $ Y ; 3 : K bx PQ R PQS TU VWX Y U 9,Y ; YZ[\] ^_` ] 2aX bc > ^J?^J ^K J NK ^9 X!"#$%&'

33 !" #$%&'( )* +,-./ , , +,589:; F G 4:H IJ KLMN#O 8 +,? PQRS F TUVWX +,Y +, Z[+, - 01 \ +,5]^_` a bc 2, 4 2 +, P ,58 X, O +,5 <=+, - _ 01 O 4,, > 1 1 4, 01!"#"$%&!"# $W%& K W 4 5 X M U 4 V M `W V# # N# V W 1 W 4!!" R #$ 8%X & 'H `OV VW * () *+,- M!". I /3 0 1 N#4!" O 23 - S 456 S;7 8 N#O49 6 : ; <= > *+? A B CD E T P O' 6 OFGHIJK 2L MN J!"#

34 !"!"#$ %&' ( %)*+,-./0" : ; 8 <= >!"? 8@ABCD1 1!"567E!"././: ;./FG./H I./JK./LMN O!"./ <=PQR!"ST UV 3 : EWXFG Y,-./8./SZ[ S\]^_./S`, ab O V 0!"./c WX!"./SO OK 1 [ : 3. F O V D_ Xa 1!" F A S./A #$%& ' ()*+, > P 0!": S >! 0./S " V 23.B : ; 8 2OW!" 7, >!"? & Bc > 89 U " ;S "!"+./!"./+HI!" + &?!"./! > 8" >! 3FO!!! "#$ > V \c %& ' D_! 1 % %&! +HI ( ) *++," -./.?? 0 1.?? 3.? & 2 >! +0,./V 3 '4V!"./+OW 5 56, + >! 0 789:;, > + < + ;FG 8 6=, >! +0, >8;? 7+@A+ B C D,-! HI E +?, 9 +,-./, >: + >! D (F=G H I! 0 J K J + LVHI ( J + +! " #$

35 !"# $%&' ( )*+,-. (/ * (78 139:6 1(; 6 < =!" >?&'@A<BCD E-. 6 >? 78 FGH 78=IJKLMNO = PPQRSTUVWF&'XY!"&' 6*Z 6 [ \] ^_`abc ^ =( = L ^=a!"pp < M#=6 = 6= ^a ^ J > PYJ M#78 6== (I '!"# 6 = _!J J =( = = c ^ = ^ L Q Q Z =Q 39:6 W=c M 6= Z =( =( = "( Y J D =( Q 36! " #$%K &'+ \D_` ^c( ) ^= * < =+,- P P." = /0 < 1= =( Y 8 M2 6 =34 5=( 678J= 9 87' :;]M Y 36 _M b, <==NO > =,-? =@A(!= B C = MDE = M ^ = PPM ) ; 8,F1QGH$ ^ == M I M#78=JK =NO6 L7JMNO!" " = P D 6L [Q

36 !"# $% &' % GM`6 % U % % M!G"#$ %& ' () _*+ +,-G. 2 /01 ]^ 2G 2() :; M9 8 2 <= 8 CD E_2 ^ () 89 G A 5 FGHIJ K2 L E ()M NEL O M8 [ P 2 Q,RS ) TU VP 24W89X.Y 2 52AE +_ 2 L() L GE_ 34ZIJ 2P [\ *4 + [ = ] =ZIG *4^_ 2 `9=!"#$%& ' '( )*+,' -./ :; < =>?@ABCDE & FG HIJ;K LM 9NO8 2 PQ RS T2 UV WXYFG,@ABCDE & G*4 8 Z[2\ ]^ _`68' =ab>? c 8 %& 2,]^ _ 9 8' 2+ 4L # 9 9' & 2 J _ V 8 & >? [ 2 ( ^ J 2 *4 Z^ _ ' 8

37 !"#$ %&' 23, 4 56,789:;, < =& % >? E +,I +, T $+ = FGH c IJK+ LMN RO P, Q )*3RSTU LM V U S W X = $+, ( S I LZ [ X C\]^Y >_S Y` a b `Q c ; O X W ` )*8 W T 3 ; 8S W )*" (" DU!"#$%!"# $%& ' % ()*+, -./01 23)* $ : 2; <= >?@ABCD $E: $@ FGHIJ KL%MN O L PQ R%:S TUV WXY : 5 $Z[ \ (] ^_ ` abc% ( ( 3 \]^_ GH+, &! ( $GH c c c c c : ci c! $ T abc $: ($+ $ % GH %!"# $ ' [ "E#$ %& S? ' 7 )*+, ( $ ) $ *!+)*, - (./0 &1 " (, R

38 ! "#$%&'! ()*+ * G * 4 *, *O 2'2( F '2 O %& K_ O * 2 OU( AL!0 O (E " #$%&_ ' U (,)*+, -. /0 _ '!1X ( (23 4A!5!"#$%&' ()**+,-./ :; *+ - <=>? ()* 5 4@AB*CD?E #7 #7FGHI JKLMNO +P QROST UV2 WUV2 JKLXY: XY U Z X[ \]^ _`abc `a' b : : /- #7FG 8L-? 89!"#$%&'

39 !"#$!"#$%&' ()*+,-./ :; $% <=' *E FGH$% IJ KLMNO 56!"# % = PO QR>6$% STUVWQXY$%% % Y >6$% Z[2 XY \] ^_`ab c F GH \ XY % (Y L O = O c 5 \ a *E ' ( >6' 89:; E N ;!" L ' >6' R \ $% )8; `[ \ ` X \ % W/O Qab ) \ 9: <c % c : _ XO ; G!" # 9$ %&';!"#$%&' 1 / (L ( 1 )* +, -. A /01 )W/\ # )/01 ) 2) 3 4[5 6 7 a8 9:GH; X 'O 2 # 9 < F= >?@ABCX D <F# E FG H I 4J KL MNO )9: 56 # # DL _X N # P <F Q( R< H ( <FSTF UV( 1 WX[Y E2 _' Z [\ ]

40 !"#$%&' ( )*+,-./01 ) :;+ 34& '! < =>?@ A4 BC7D1E FGCHIJKLMNO &' 34 NO?4 PI34Q3RS. T 3RU.TVKWX%3 Y ( ()%34%3 Y Z[ \] ) ) 234^_`a 3 Yb c Z % < J 3 34% c 5 B 5B3 c 3 0 az`a c az`a 3 3 c `a 34 c c2 3% % 34 &'!D E 34 C0, c 34F3! % J 3 c 3,34 % 3!"# I FC R. D %`a=>89 + ctno51 ) 5QL + %.B5 IJ % + NO NO S R!"#$% & <+ ' QL % (.B5))* +, I./ 0 QL 1 % >% % %2_%.B M7 8%B5,I9: J c ; %34 J _ <=>?$>%>@ K L > NO ABC DE + % C0H F G. %H II3 J]NO KL MNIL O N I `a I!"

41 !"#$%&'( )*+,-./ :; 4< => BCDE?/??FGH 5 IGH IG HJKFALMN?O O PQRSMN,ALJ T =UV Q?RW 4 XY W Z[\ ] W ^ ' _` W a?_ bc8q ^ J,?4</ 4, W? 6,GHR,G 66? 5?Z GH 5Y_C PY_C,O (,? 4<? WY 7? 5,:; A,, =,RW 5W,:;F W,, W RW4< /?, RW,,23W 6 /Y W /UWRW >, RW, _,@ (,8YYI 4<, W!"#$%&' ()* # W UW W!-%& Y "NC #, $ %, &' U, Z () *, $% > +,,-. /0 =1 W I WH C"N 23U%4 56 =RW ]7 _ W89 :; = <=>?@ A,BC D, E -, 7 c, F G >, H IJ W >KLM= NOG >, " 2, PQ / R! S, T UV/+WXU Y $% W Z[ \]!!"#

42 !"#$%&' ()*+,-./ :; < =>?@ABC DE 6 C@A FGHI J K 6 LMNOG K!" PQ RSTUJ V WFXY # Z [\]H^J_` akb csj V 6 $ %! M F! M 6? C F J J 6

43 !"#$%&' ()*+,-./ )829 :; $" 2 & 7 <=>? 2@0A BCDE "# 2 9 F )GHIJ )KLMNO "3 2 )01 PQPR S-TUVWE 2@0XY ' Z [\ ]^ _ ` abs-c" )@02[ a )*2K1 " K Q#) E b # 2 Q K # C ) 29 9 ) SO )* 01 # )* # )8 F # 8 0 # c _ / b 2 2) S-) )W a 2 _ )W F 28 S-) 2#) Q3 E ]^! ` JK )8 3 : ` O 01T 2 F3!2"# 3 F $% &' ) c 2()* +,", 4-./ 01 %2 Q ) 8 b9:; + *2T< Q)= 2>?@ + +` AB b)8c DEQ& )*@0 9: 8 FG H IJKL)*M5NO B )* #@0 2! AP Q RS 0b TE 2@0XU_VW H= K#E B X)* YE 7:# )82 /E E 7Z: [\ ]KL ^ _*D :3E B C E`KL GH ab'ce 2NO B G )8B9: 1 /#) D ) 8 DC D ` ")P' ; ` 2 bq)\ # N Q) $ +2 3 E)P 7 H8 7

44 !"#$%&' ()* +,-./ ( :; <=>?@ABC6DE E F GHI J(KL E, ME NO ; PQRS D, "TUV ME WX@EY 4 O Z[(ME \]^_ ME `a G H E,bc ME, C $ # (JRS< c C _ T GH ME,. X`(ME *# GH ' M E: M: \E E,- ( %(4 6 R EY Y(= EY E ' 2 E a # NOZ[ 56 Z[ $ (J6 NOZ[ 3 2 NO 8 # #P 3! V M " # % E$%&EYY' 2 ()* +@ Y' RS =Y'Y' 6/, -. / 0 1 Y'" K # !RS 8 P E 9 : %DEEE " ;( DE +R EY1 E Z[ 9 " ;( E O 0 E $ %&' RS<E<J (= E " => Z[ c RS? J =! +B (C, 8 ] 2 FG HI L Y S % MX N `O (M X0 EY 2 ( PQEY0 RHY PSEY0 HY

Similar documents

!"#$%&' & ()*+,-./ :; - 8 =E - F < GHIBCJKL MN- O01 &+ 01 -PQ R01 STUVWX-Y01 ; Z [\\]^_` H abc J `01 ( - ` =E01 J 01B ; R B

!#$%&' & ()*+,-./ :; - 8 =E - F < GHIBCJKL MN- O01 &+ 01 -PQ R01 STUVWX-Y01 ; Z [\\]^_` H abc J `01 ( - ` =E01 J 01B ; R B !" #!"#$%&' ()*(!"#$+,-./01 (!"#$ 23"#45678 9:; / (!"#$% ' %/< =>?@A)BC?DBCE

More information

' ( #$%&' ()*+,-./ 01 ) *+ ,-.

' ( #$%&' ()*+,-./ 01 ) *+ ,-. !"#$%&()*)+,-!" #./01)234526789:;$?+@AB +?$C, -+DE$:

More information

+ 2 S!"#$ %&' ()*+,-./ %581 9:; 2 < :; 5 B7 CCCD>E * = FG H I2JK <LMBN 23O567 +.P QR>SA TUVW)XY > * N Z<LMB23O567[\9]:^9:; H_`a9bc *

+ 2 S!#$ %&' ()*+,-./ %581 9:; 2 < :; 5 B7 CCCD>E * = FG H I2JK <LMBN 23O567 +.P QR>SA TUVW)XY > * N Z<LMB23O567[\9]:^9:; H_`a9bc * )! "##$%& "##%&) ' & # (!"#$ %&' '' * +, -. / 0 1 * % ' 2345678 % ' 9:; %% $# % # ) 6 %'(%)*+,+'-.$,,,,! "#/# ?@ADE G ?HIJKL M )N/ O DE '#

More information

FG H9IJKLM.9NOMPQRSRTU#VWMXRQYPM Z#[\]^_`aZbcMMZ!"#$%&'!#( )*+! 01 +!,-./,-./ 2"34$%&' 56789:;4:578#&' 8#< 89=9 $%&'

FG H9IJKLM.9NOMPQRSRTU#VWMXRQYPM Z#[\]^_`aZbcMMZ!#$%&'!#( )*+! 01 +!,-./,-./ 234$%&' 56789:;4:578#&' 8#< 89=9 $%&' !"#$%&!"' (#)*+,-./01% 2'34567 8$9.3):;. 3.?3@ABCD>E-4"$,>56 $4FGHIFG)56J.K3L.M3.3L.N3.O3L.3.3L.3 FG H9IJKLM.9NOMPQRSRTU#VWMXRQYPM Z#[\]^_`aZbcMMZ!"#$%&'!#( )*+! 01 +!,-./,-./ 2"34$%&' 56789:;4:578#&'

More information

Experimental location Land type Soil type ph. K (meq/100) Jute Agriculture Experimental Station (JAES), Manikgonj, BJRI

Experimental location Land type Soil type ph. K (meq/100) Jute Agriculture Experimental Station (JAES), Manikgonj, BJRI Soil characteristics Nutrient status Experimental location AEZ Land type Soil type ph % OM % N P (ppm) K (meq/100) Jute Agriculture Experimental Station (JAES), Manikgonj, BJRI Active Brahmaputra and Jamuna

More information

! " # $ %!"#$%&' ()*+,-. /01! ABCDE";! FGHI!JKLM2NO PQRSTUV W!X Y!Z[\!]^_`abc BCE! E 43!H!.;!! BC 23,

! # $ %!#$%&' ()*+,-. /01! ABCDE;! FGHI!JKLM2NO PQRSTUV W!X Y!Z[\!]^_`abc BCE! E 43!H!.;!! BC 23, !!"##$ #%&#&&" &"'$ %'# %'#"'"% "#&# "#$%&' BCH7 CDE B BC>Q$ OC>R$ BC^O>^ >>,*+X BC>>1'D%&C >) PI C>H PI+)>,*

More information

Pre-Test. Use the following figure to answer Questions 1 through 6. B C. 1. What is the center of the circle? The center of the circle is point G.

Pre-Test. Use the following figure to answer Questions 1 through 6. B C. 1. What is the center of the circle? The center of the circle is point G. Pre-Test Name Date Use the following figure to answer Questions 1 through 6. A B C F G E D 1. What is the center of the circle? The center of the circle is point G. 2. Name a radius of the circle. A radius

More information

Parts Manual. EPIC II Critical Care Bed REF 2031

Parts Manual. EPIC II Critical Care Bed REF 2031 EPIC II Critical Care Bed REF 2031 Parts Manual For parts or technical assistance call: USA: 1-800-327-0770 2013/05 B.0 2031-109-006 REV B www.stryker.com Table of Contents English Product Labels... 4

More information

P a g e 5 1 of R e p o r t P B 4 / 0 9

P a g e 5 1 of R e p o r t P B 4 / 0 9 P a g e 5 1 of R e p o r t P B 4 / 0 9 J A R T a l s o c o n c l u d e d t h a t a l t h o u g h t h e i n t e n t o f N e l s o n s r e h a b i l i t a t i o n p l a n i s t o e n h a n c e c o n n e

More information

); 5 units 5. x = 3 6. r = 5 7. n = 2 8. t =

); 5 units 5. x = 3 6. r = 5 7. n = 2 8. t = . Sample answer: dilation with center at the origin and a scale factor of 1 followed b a translation units right and 1 unit down 5. Sample answer: reflection in the -axis followed b a dilation with center

More information

Preface. Enhanced Learning

Preface. Enhanced Learning Preface This book is just what you are looking for Secondary 2 Mathematics made easy and comprehensible so you need not struggle to make sense of all the new and unfamiliar concepts. Specially written

More information

Skills Practice Skills Practice for Lesson 9.1

Skills Practice Skills Practice for Lesson 9.1 Skills Practice Skills Practice for Lesson.1 Name Date Meeting Friends The Distance Formula Vocabular Define the term in our own words. 1. Distance Formula Problem Set Archaeologists map the location of

More information

( ) = ( ) ( ) = ( ) = + = = = ( ) Therefore: , where t. Note: If we start with the condition BM = tab, we will have BM = ( x + 2, y + 3, z 5)

( ) = ( ) ( ) = ( ) = + = = = ( ) Therefore: , where t. Note: If we start with the condition BM = tab, we will have BM = ( x + 2, y + 3, z 5) Chapter Exercise a) AB OB OA ( xb xa, yb ya, zb za),,, 0, b) AB OB OA ( xb xa, yb ya, zb za) ( ), ( ),, 0, c) AB OB OA x x, y y, z z (, ( ), ) (,, ) ( ) B A B A B A ( ) d) AB OB OA ( xb xa, yb ya, zb za)

More information

'NA}.1E.'\;,'\ID ARTICLE IT. within

'NA}.1E.'\;,'\ID ARTICLE IT. within !"# $ 'NA}.1E.'\;,'\ID referred %& '()./0123. 45 principal *+, 67 89 -./0123 45!"#$ 67 89: %&'( )*+,- ;< =>?@ :;< =>?@ ABCDEF GHI JKLM NOPQRS TUV WX YZ[\] ^_ be `!" # $% &'()*+,-. */01 23456789: ; ?

More information

Made-to-measure malaria vector control strategies: rational design based on insecticide properties and coverage of blood resources for mosquitoes

Made-to-measure malaria vector control strategies: rational design based on insecticide properties and coverage of blood resources for mosquitoes J v DF. Fy f DF f x (HL) v w b vb. -- v g: g b vg f b f q J 2014, 13:146 :10.1186/1475-2875-13-146 Gy F K (gk@..z) k y (k@y.) J Gg (zg@.gv) Jf C v (jy.v@.g) C J Dky (.ky@..k) k C (k.@b.) 1475-2875 y vw

More information

Chapter y. 8. n cd (x y) 14. (2a b) 15. (a) 3(x 2y) = 3x 3(2y) = 3x 6y. 16. (a)

Chapter y. 8. n cd (x y) 14. (2a b) 15. (a) 3(x 2y) = 3x 3(2y) = 3x 6y. 16. (a) Chapter 6 Chapter 6 opener A. B. C. D. 6 E. 5 F. 8 G. H. I. J.. 7. 8 5. 6 6. 7. y 8. n 9. w z. 5cd.. xy z 5r s t. (x y). (a b) 5. (a) (x y) = x (y) = x 6y x 6y = x (y) = (x y) 6. (a) a (5 a+ b) = a (5

More information

Tornado, Squalls Strike Kinston Area

Tornado, Squalls Strike Kinston Area q k K A V N 28 #/K N /WANE CO A AON-CHEY ON A N F W N H W D M D H U x 30 M k k M D 945 E M A A k - A k k k A C M D C 030 D H C C 0645 000 200 W j A D M D k F E- HAUNNG CALL - A A x U M D M j A A 9000 k

More information

T h e C S E T I P r o j e c t

T 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 information

Worksheet A VECTORS 1 G H I D E F A B C

Worksheet A VECTORS 1 G H I D E F A B C Worksheet A G H I D E F A B C The diagram shows three sets of equally-spaced parallel lines. Given that AC = p that AD = q, express the following vectors in terms of p q. a CA b AG c AB d DF e HE f AF

More information

TUCBOR. is feaiherinp hit nest. The day before Thanks, as to reflect great discredit upon that paper. Clocks and Jewelry repaired and warranted.

TUCBOR. is feaiherinp hit nest. The day before Thanks, as to reflect great discredit upon that paper. Clocks and Jewelry repaired and warranted. W B J G Bk 85 X W G WY B 7 B 4 & B k F G? * Bk P j?) G j B k k 4 P & B J B PB Y B * k W Y) WY G G B B Wk J W P W k k J J P -B- W J W J W J k G j F W Wk P j W 8 B Bk B J B P k F BP - W F j $ W & B P & P

More information

Which statement is true about parallelogram FGHJ and parallelogram F ''G''H''J ''?

Which statement is true about parallelogram FGHJ and parallelogram F ''G''H''J ''? Unit 2 Review 1. Parallelogram FGHJ was translated 3 units down to form parallelogram F 'G'H'J '. Parallelogram F 'G'H'J ' was then rotated 90 counterclockwise about point G' to obtain parallelogram F

More information

OH BOY! Story. N a r r a t iv e a n d o bj e c t s th ea t e r Fo r a l l a g e s, fr o m th e a ge of 9

OH BOY! Story. N a r r a t iv e a n d o bj e c t s th ea t e r Fo r a l l a g e s, fr o m th e a ge of 9 OH BOY! O h Boy!, was or igin a lly cr eat ed in F r en ch an d was a m a jor s u cc ess on t h e Fr en ch st a ge f or young au di enc es. It h a s b een s een by ap pr ox i ma t ely 175,000 sp ect at

More information

Trade Patterns, Production networks, and Trade and employment in the Asia-US region

Trade Patterns, Production networks, and Trade and employment in the Asia-US region Trade Patterns, Production networks, and Trade and employment in the Asia-U region atoshi Inomata Institute of Developing Economies ETRO Development of cross-national production linkages, 1985-2005 1985

More information

. ) =-, *+ 7 4* 8 ) 0 *+ 7 (c. 0 A #B (d

. ) =-, *+ 7 4* 8 ) 0 *+ 7 (c. 0 A #B (d (97!" #$) IT "0 / +,-.* 4 7,0,5 6.A 0 A+;,.89 ; ?$.0, 7 -.! %&!"# (a. R *+ 0 K K,-./ R ) *+ K ( K (b (97 - )./! 4 5 6, Connection String (c, *+ 7 8 *+ 7 0 *9 7 R ) (d. 4* c a ( b a ( c b (4 b d (

More information

Y'* C 0!),.1 / ; ')/ Y 0!)& 1 0R NK& A Y'. 1 ^. ]'Q 1 I1 )H ;". D* 1 = Z)& ^. H N[Qt C =

Y'* C 0!),.1 / ; ')/ Y 0!)& 1 0R NK& A Y'. 1 ^. ]'Q 1 I1 )H ;. D* 1 = Z)& ^. H N[Qt C = (-) 393 F!/ $5 $% T K&L =>-? J (&A )/>2 I B!" GH 393/05/07 :K 393/07/23 :7b +B 0 )NO M / Y'* C a23 N/ * = = Z)& ^. ;$ 0'* Y'2 8 OI 53 = ;" ~" O* Y.b ;" ; ')/ Y'* C 0!),. / ; ')/ Y 0!)& 0R NK& A Y'. ^.

More information

Day 6: Triangle Congruence, Correspondence and Styles of Proof

Day 6: Triangle Congruence, Correspondence and Styles of Proof Name: Day 6: Triangle Congruence, Correspondence and Styles of Proof Date: Geometry CC (M1D) Opening Exercise Given: CE bisects BD Statements 1. bisects 1.Given CE BD Reasons 2. 2. Define congruence in

More information

95 Holt McDougal Geometry

95 Holt McDougal Geometry 1. It is given that KN is the perpendicular bisector of J and N is the perpendicular bisector of K. B the Perpendicular Bisector Theorem, JK = K and K =. Thus JK = b the Trans. Prop. of =. B the definition

More information

0116ge. Geometry Regents Exam RT and SU intersect at O.

0116ge. Geometry Regents Exam RT and SU intersect at O. Geometry Regents Exam 06 06ge What is the equation of a circle with its center at (5, ) and a radius of 3? ) (x 5) + (y + ) = 3 ) (x 5) + (y + ) = 9 3) (x + 5) + (y ) = 3 4) (x + 5) + (y ) = 9 In the diagram

More information

CHAPTER 5 : THE STRAIGHT LINE

CHAPTER 5 : THE STRAIGHT LINE EXERCISE 1 CHAPTER 5 : THE STRAIGHT LINE 1. In the diagram, PQ is a straight line. P 4 2 4 3 2 1 0 1 2 2 2. Find (a) the -intercept, (b) the gradient, of the straight line. Q (5,18) Q Answer :a).. b) 3

More information

Geometry - Review for Final Chapters 5 and 6

Geometry - Review for Final Chapters 5 and 6 Class: Date: Geometry - Review for Final Chapters 5 and 6 1. Classify PQR by its sides. Then determine whether it is a right triangle. a. scalene ; right c. scalene ; not right b. isoceles ; not right

More information

to Highbury via Massey University, Constellation Station, Smales Farm Station, Akoranga Station and Northcote

to Highbury via Massey University, Constellation Station, Smales Farm Station, Akoranga Station and Northcote b v Nc, g, F, C Uv Hgb p (p 4030) F g (p 4063) F (p 3353) L D (p 3848) 6.00 6.0 6.2 6.20 6.30 6.45 6.50 6.30 6.40 6.42 6.50 7.00 7.5 7.20 7.00 7.0 7.2 7.20 7.30 7.45 7.50 7.30 7.40 7.42 7.50 8.00 8.5 8.20

More information

Lesson 1 Reteach. Example. Exercises. Determine if the two figures are congruent by using transformations.

Lesson 1 Reteach. Example. Exercises. Determine if the two figures are congruent by using transformations. Lesson 1 eteach Congruence and Transformations Translation eflection otation length is the same length is the same length is the same orientation is the sarne onentation is different onentation is different

More information

Algebraic Expressions

Algebraic Expressions Algebraic Expressions 1. Expressions are formed from variables and constants. 2. Terms are added to form expressions. Terms themselves are formed as product of factors. 3. Expressions that contain exactly

More information

!"# $ % & '( INRA-RP-RE /71-0-Tir.1395

!# $ % & '( INRA-RP-RE /71-0-Tir.1395 !"# $ ) ) 1395 /-. ٠ 4 21645 ) 89 ;$ 4 ) < 1...>? 1... 1...A 3... D, /9C 3...D 6E 5... 7... )KH6/J /9CHA!HG? 13...)K M & H?# 14...O 16...& 16... 17... 54 18...& NH -1-2 -3-4 -5-6 -7-8 -9-10 54Q/ -11 R#

More information

Investing in Brownfields: The Economic Benefits of the Clean Ohio Revitalization Fund

Investing in Brownfields: The Economic Benefits of the Clean Ohio Revitalization Fund v Bwf: T E Bf f C O Rvz G O P C 2013 E v 21 S Pj 1!! 3 2 4! 5! 6 7! 8!! 9 10!! 11! 12 17! 18! 19 14 15! 16 13 20! 21! 1. N C Pk 2. Rvf 3. Tw 4. G Lk Tw 5. C C C/ H 6. Bk -U Rv Pj 7. S R S C 8. C Rv C 9.

More information

Proofs. by Bill Hanlon

Proofs. by Bill Hanlon Proofs by Bill Hanlon Future Reference To prove congruence, it is important that you remember not only your congruence theorems, but know your parallel line theorems, and theorems concerning triangles.

More information

2 ()+b 29 % &A,37 V4%, 4% 4%E,37E,' ( :3 4%(),,-4%% ;FG=,$ ;34%(),)U() -; =('.T), / 0$ % FG H(IJ, $ 1 H A,'RSTU VWX T U U `az[\a],-4%., :34%();A

2 ()+b 29 % &A,37 V4%, 4% 4%E,37E,' ( :3 4%(),,-4%% ;FG=,$ ;34%(),)U() -; =('.T), / 0$ % FG H(IJ, $ 1 H A,'RSTU VWX T U U `az[\a],-4%., :34%();A 29 11 2010 11 MATERIALSCHINA Vol 29 No 11 Nov 2010!"# $%&' "# () ( ()*+,-. /01, 100083) * +: 234%5()6789 2 :; : : () ;34%(),?@AB=,CAD AE ; ; :,-4%% FG H(IJ;34%() 7KLMNO ;%K9,1 2A P%Q RSTU VWXY BFe10

More information

J JUL - 25-JUL 2016 HOUSEHOLD FINANCES RESEARCH

J JUL - 25-JUL 2016 HOUSEHOLD FINANCES RESEARCH J00 JUL JUL 0 Table XF0 In terms of your finances, how often if at all, do you and your household find yourselves without enough money to buy enough food? BASE: ALL ADULTS AGED + IN GREAT BRITAIN Page

More information

". :'=: "t',.4 :; :::-':7'- --,r. "c:"" --; : I :. \ 1 :;,'I ~,:-._._'.:.:1... ~~ \..,i ... ~.. ~--~ ( L ;...3L-. ' f.':... I. -.1;':'.

. :'=: t',.4 :; :::-':7'- --,r. c: --; : I :. \ 1 :;,'I ~,:-._._'.:.:1... ~~ \..,i ... ~.. ~--~ ( L ;...3L-. ' f.':... I. -.1;':'. = 47 \ \ L 3L f \ / \ L \ \ j \ \ 6! \ j \ / w j / \ \ 4 / N L5 Dm94 O6zq 9 qmn j!!! j 3DLLE N f 3LLE Of ADL!N RALROAD ORAL OR AL AOAON N 5 5 D D 9 94 4 E ROL 2LL RLLAY RL AY 3 ER OLLL 832 876 8 76 L A

More information

Triangle Congruence and Similarity Review. Show all work for full credit. 5. In the drawing, what is the measure of angle y?

Triangle Congruence and Similarity Review. Show all work for full credit. 5. In the drawing, what is the measure of angle y? Triangle Congruence and Similarity Review Score Name: Date: Show all work for full credit. 1. In a plane, lines that never meet are called. 5. In the drawing, what is the measure of angle y? A. parallel

More information

Class IX Chapter 8 Quadrilaterals Maths

Class IX Chapter 8 Quadrilaterals Maths Class IX Chapter 8 Quadrilaterals Maths Exercise 8.1 Question 1: The angles of quadrilateral are in the ratio 3: 5: 9: 13. Find all the angles of the quadrilateral. Answer: Let the common ratio between

More information

Class IX Chapter 8 Quadrilaterals Maths

Class IX Chapter 8 Quadrilaterals Maths 1 Class IX Chapter 8 Quadrilaterals Maths Exercise 8.1 Question 1: The angles of quadrilateral are in the ratio 3: 5: 9: 13. Find all the angles of the quadrilateral. Let the common ratio between the angles

More information

A 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 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 information

126 Holt McDougal Geometry

126 Holt McDougal Geometry test prep 51. m Q = m S 3x + 5 = 5x - 5 30 = x x = 15 5. J 53. 6.4 P = + + + = + + + = (5 + 8.) = 6.4 challenge and extend 54. Let given pts. be (0, 5), (4, 0), (8, 5), and possible 4th pts. be X, Y, Z.

More information

The Evolution of Outsourcing

The Evolution of Outsourcing Uvy f R I DCmm@URI S H Pj H Pm Uvy f R I 2009 T Ev f O M L. V Uvy f R I, V99@m.m Fw wk : ://mm../ P f B Cmm Rmm C V, M L., "T Ev f O" (2009). S H Pj. P 144. ://mm..//144://mm..//144 T A b y f f by H Pm

More information

5. Using a compass and straightedge, construct a bisector of the angle shown below. [Leave all construction marks.]

5. Using a compass and straightedge, construct a bisector of the angle shown below. [Leave all construction marks.] Name: Regents Review Session Two Date: Common Core Geometry 1. The diagram below shows AB and DE. Which transformation will move AB onto DE such that point D is the image of point A and point E is the

More information

123 Holt McDougal Geometry

123 Holt McDougal Geometry 44. - 0 - -4 y x heck students estimates; possible answer: pentagon is not equiangular; m = 100 ; m = 113 ; m = 113 ; m = 101 ; m = 113 ; yes, pentagon is not equiangular. 45a. heptagon b. (7 - )180 =

More information

,,,,..,,., {. (, ),, {,.,.,..,,.,.,,....... {.. : N {, Z {, Q {, Q p { p{ {. 3, R {, C {. : ord p {. 8, (k) {.42,!() { {. 24, () { {. 24, () { {. 25,., () { {. 26,. 9, () { {. 27,. 23, '() { ( ) {. 28,

More information

Downloaded from pdmag.info at 18: on Friday March 22nd 2019

Downloaded from pdmag.info at 18: on Friday March 22nd 2019 2 (- ( ( )*+, )%.!"# $% &" :( ( 2 * -% 345 678-397.) /0 &" &2. ) ( B(

More information

Test Review: Geometry I Period 3,5,7. ASSESSMENT DATE: Wednesday 3/25 (FOR ALL CLASSES) Things it would be a good idea to know:

Test Review: Geometry I Period 3,5,7. ASSESSMENT DATE: Wednesday 3/25 (FOR ALL CLASSES) Things it would be a good idea to know: Test Review: Geometry I Period 3,5,7 ASSESSMENT DATE: Wednesday 3/25 (FOR ALL CLASSES) Things it would be a good idea to know: 1) How to create proportions from a. a word problem b. a pair of similar triangles

More information

B E E R W I N E M E N U

B E E R W I N E M E N U EER INE ENU LE O ONEN y. y. b I 9 I I I R, K Lb Lw O L w, b Q bb R 1 wz R I 1 E Ry I 1 E 1 wzb 1 1,1 1 1 Hfwz 1 H 1,1 I R w 1 I I,9 1 I 9 1 LENE R. 1 EER HO. 1 LOYLY ROR. 1 INE. 1 OLE + N ER LE O z V

More information

SHW6-R1 1M+1A 1M+1A 1M+1A. 11. (a) 14. (a) With the notations in the figure, With the notations in the figure, AG BH 800 m Consider ACG.

SHW6-R1 1M+1A 1M+1A 1M+1A. 11. (a) 14. (a) With the notations in the figure, With the notations in the figure, AG BH 800 m Consider ACG. SHW6-R 8@. (a) 4. (a) With the notations in the figure, With the notations in the figure, AG BH Consider G. ΑG tan G tan 50 tan 50 Consider CHG. GH tan H GH tan 70 tan 50 tan 70 GH tan 50 The speed of

More information

Udaan School Of Mathematics Class X Chapter 10 Circles Maths

Udaan School Of Mathematics Class X Chapter 10 Circles Maths Exercise 10.1 1. Fill in the blanks (i) The common point of tangent and the circle is called point of contact. (ii) A circle may have two parallel tangents. (iii) A tangent to a circle intersects it in

More information

" OM Z~ _ [6 i 9 0 O ~ 996] Z~ _ ~ M u Ok Owi < Q } " K i x H Q } " H O> Z ~ K ioz Z~ _ H K O^. OM " H H J< H ~ OQ K Ok O^ H k x } H x K. Q } Ja z JQ O ~ O_ OK H

More information

wi& be demonstrated. Ilexbert Arkro,

wi& be demonstrated. Ilexbert Arkro, 8( P C B E L B A k> D A 10 O N O k jk \ CH 12 B R Z G kxj7~53> P C C 20 A A P O P 3 x G H kv 7 B5! &$ L N M k APO HM M B / Bk K j R 3(330 C BH& B k C j 2jB A D C & Dk M L 12 H R > APO k L E k M k APO M

More information

SOLVED PROBLEMS. 1. The angle between two lines whose direction cosines are given by the equation l + m + n = 0, l 2 + m 2 + n 2 = 0 is

SOLVED PROBLEMS. 1. The angle between two lines whose direction cosines are given by the equation l + m + n = 0, l 2 + m 2 + n 2 = 0 is SOLVED PROBLEMS OBJECTIVE 1. The angle between two lines whose direction cosines are given by the equation l + m + n = 0, l 2 + m 2 + n 2 = 0 is (A) π/3 (B) 2π/3 (C) π/4 (D) None of these hb : Eliminating

More information

Chapter 30 Design and Analysis of

Chapter 30 Design and Analysis of Chapter 30 Design and Analysis of 2 k DOEs Introduction This chapter describes design alternatives and analysis techniques for conducting a DOE. Tables M1 to M5 in Appendix E can be used to create test

More information

176 5 t h Fl oo r. 337 P o ly me r Ma te ri al s

176 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 information

5-1 Practice Form K. Midsegments of Triangles. Identify three pairs of parallel segments in the diagram.

5-1 Practice Form K. Midsegments of Triangles. Identify three pairs of parallel segments in the diagram. 5-1 Practice Form K Midsegments of Triangles Identify three pairs of parallel segments in the diagram. 1. 2. 3. Name the segment that is parallel to the given segment. 4. MN 5. ON 6. AB 7. CB 8. OM 9.

More information

L O W Z L L, M Z C B., W S D I T X S D J L T, JT7ITZ 2 6, O n # D o l l a r a T m t. L Cuiiveuiluu. BASEBALL.

L O W Z L L, M Z C B., W S D I T X S D J L T, JT7ITZ 2 6, O n # D o l l a r a T m t. L Cuiiveuiluu. BASEBALL. # Z Z B X 7Z 6 8 9 0 # F Y BB F x B- B B BV 5 G - V 84 B F x - G 6 x - F - 500000 Bx > -- z : V Y B / «- Q - 4«7 6 890 6 578 0 00 8: B! 0 677 F 574 BB 4 - V 0 B 8 5 5 0 5 Z G F Q 4 50 G B - 5 5-7 B z 7

More information

Geometry L2 Test Review Packet Similarity Test Date Friday March 18 Review Date Thursday March 17. Things it would be a good idea to know

Geometry L2 Test Review Packet Similarity Test Date Friday March 18 Review Date Thursday March 17. Things it would be a good idea to know Geometry L2 Test Review Packet Similarity Test Date Friday March 18 Review Date Thursday March 17 Things it would be a good idea to know 1. How to create a proportion from a. a word problem b. a pair of

More information

"Full Coverage": Vectors

Full Coverage: Vectors "Full Coverage": Vectors This worksheet is designed to cover one question of each type seen in past papers, for each GCSE Higher Tier topic. This worksheet was automatically generated by the DrFrostMaths

More information

spite of etro- School lege Economics instructorsin t h e lege, Butgers University a n d poiitan area."' nkfcrop^tan^

spite of etro- School lege Economics instructorsin t h e lege, Butgers University a n d poiitan area.' nkfcrop^tan^ L $100000 43 B U M 1 ~NB E & B $C M K M /! 3

More information

12 Write a two-column proof.

12 Write a two-column proof. Name: Period: Date: ID: A Chapter 4 Review -- GH 1 Find each measure. m 1, m 2, m 3 9 Triangles ABC and AFD are vertical congruent equilateral triangles. Find x and y. 2 Determine whether PQR STU given

More information

CANADIAN RAILROAD HISTORICAL ASSOCIATION

CANADIAN RAILROAD HISTORICAL ASSOCIATION NDN RROD HSOR SSOON NOEOED NOEORD MONRE ND MONREND E ::fs S R:: ROH :; OH NO NO 63 - -- --- - ---------- ---- -- -- - 956 G ::6 ; - R HY NO E OF N N :S!;G NG : MGg R M g R H w b H m 92 py - B : p j Dg

More information

CSSTP. Given CSSTP. Statements Reasons. Given CSSTP. Mult. Prop. = Div. Prop. = Sym. Prop. = or 1 Mult. Prop. = Div. Prop. =

CSSTP. Given CSSTP. Statements Reasons. Given CSSTP. Mult. Prop. = Div. Prop. = Sym. Prop. = or 1 Mult. Prop. = Div. Prop. = : If the triangles are similar (~), then all of the sides must be congruent proportional (create equal scale fractions). Example: A~ F Before you start your proof, it is important to plan! Setup the three

More information

b UVW is a right-angled triangle, therefore VW is the diameter of the circle. Centre of circle = Midpoint of VW = (8 2) + ( 2 6) = 100

b UVW is a right-angled triangle, therefore VW is the diameter of the circle. Centre of circle = Midpoint of VW = (8 2) + ( 2 6) = 100 Circles 6F a U(, 8), V(7, 7) and W(, ) UV = ( x x ) ( y y ) = (7 ) (7 8) = 8 VW = ( 7) ( 7) = 64 UW = ( ) ( 8) = 8 Use Pythagoras' theorem to show UV UW = VW 8 8 = 64 = VW Therefore, UVW is a right-angled

More information

IB MYP Unit 6 Review

IB MYP Unit 6 Review Name: Date: 1. Two triangles are congruent if 1. A. corresponding angles are congruent B. corresponding sides and corresponding angles are congruent C. the angles in each triangle have a sum of 180 D.

More information

Relationships of Side Lengths and Angle Measures. Theorem: Practice: State the longest side of the triangle. Justify your answer.

Relationships of Side Lengths and Angle Measures. Theorem: Practice: State the longest side of the triangle. Justify your answer. 10R Unit 8 Similarity CW 8.1 Relationships of Side Lengths and Angle Measures HW: Worksheet #8.1 (following these notes) Theorem: Practice: 1. State the longest side of the triangle. Justify your answer..

More information

Vectors 1C. 6 k) = =0 = =17

Vectors 1C. 6 k) = =0 = =17 Vectors C For each problem, calculate the vector product in the bracet first and then perform the scalar product on the answer. a b c= 3 0 4 =4i j 3 a.(b c=(5i+j.(4i j 3 =0 +3= b c a = 3 0 4 5 = 8i+3j+6

More information

UNIT 3 BOOLEAN ALGEBRA (CONT D)

UNIT 3 BOOLEAN ALGEBRA (CONT D) UNIT 3 BOOLEAN ALGEBRA (CONT D) Spring 2011 Boolean Algebra (cont d) 2 Contents Multiplying out and factoring expressions Exclusive-OR and Exclusive-NOR operations The consensus theorem Summary of algebraic

More information

Chapter 6. Worked-Out Solutions AB 3.61 AC 5.10 BC = 5

Chapter 6. Worked-Out Solutions AB 3.61 AC 5.10 BC = 5 27. onstruct a line ( DF ) with midpoint P parallel to and twice the length of QR. onstruct a line ( EF ) with midpoint R parallel to and twice the length of QP. onstruct a line ( DE ) with midpoint Q

More information

G.CO.6-9 ONLY COMMON CORE QUESTIONS

G.CO.6-9 ONLY COMMON CORE QUESTIONS Class: Date: G.CO.6-9 ONLY COMMON CORE QUESTIONS Multiple Choice Identify the choice that best completes the statement or answers the question. 1 The image of ABC after a rotation of 90º clockwise about

More information

(Chapter 10) (Practical Geometry) (Class VII) Question 1: Exercise 10.1 Draw a line, say AB, take a point C outside it. Through C, draw a line parallel to AB using ruler and compasses only. Answer 1: To

More information

Creating New Objects

Creating New Objects Wk Obj 1 C bj 2 A vb bj 3 bj C M & I I B & M 4 Cv bj v - 5 M b bj 6 A vv Jv b C N Obj A Jv C bj: bj k H bj : R R Rk V Rk Jv k bj 1 I v bj 2 I bj b C Vb bj Jv vb v 1 A vb v v 2 A vb Obj bj I R bj bj H x

More information

Assignment. Name. Factor each completely. 1) a w a yk a k a yw 2) m z mnc m c mnz. 3) uv p u pv 4) w a w x k w a k w x

Assignment. Name. Factor each completely. 1) a w a yk a k a yw 2) m z mnc m c mnz. 3) uv p u pv 4) w a w x k w a k w x Assignment ID: 1 Name Date Period Factor each completely. 1) a w a yk a k a yw 2) m z mnc m c mnz 3) uv p u pv 4) w a w x k w a k w x 5) au xv av xu 6) xbz x c xbc x z 7) a w axk a k axw 8) mn xm m xn

More information

Name: Class: Date: c. WZ XY and XW YZ. b. WZ ZY and XW YZ. d. WN NZ and YN NX

Name: Class: Date: c. WZ XY and XW YZ. b. WZ ZY and XW YZ. d. WN NZ and YN NX Class: Date: 2nd Semester Exam Review - Geometry CP 1. Complete this statement: A polygon with all sides the same length is said to be. a. regular b. equilateral c. equiangular d. convex 3. Which statement

More information

Topic 2 [312 marks] The rectangle ABCD is inscribed in a circle. Sides [AD] and [AB] have lengths

Topic 2 [312 marks] The rectangle ABCD is inscribed in a circle. Sides [AD] and [AB] have lengths Topic 2 [312 marks] 1 The rectangle ABCD is inscribed in a circle Sides [AD] and [AB] have lengths [12 marks] 3 cm and (\9\) cm respectively E is a point on side [AB] such that AE is 3 cm Side [DE] is

More information

CAREER POINT. PRMO EXAM-2017 (Paper & Solution) Sum of number should be 21

CAREER POINT. PRMO EXAM-2017 (Paper & Solution) Sum of number should be 21 PRMO EXAM-07 (Paper & Solution) Q. How many positive integers less than 000 have the property that the sum of the digits of each such number is divisible by 7 and the number itself is divisible by 3? Sum

More information

CAT. NO /irtl,417~ S- ~ I ';, A RIDER PUBLICATION BY H. A. MIDDLETON

CAT. NO /irtl,417~ S- ~ I ';, A RIDER PUBLICATION BY H. A. MIDDLETON CAT. NO. 139-3 THIRD SUPPLEMENT I /irtl,417~ S- ~ I ';,... 0 f? BY H. A. MIDDLETON.. A RIDER PUBLICATION B36 B65 B152 B309 B319 B329 B719 D63 D77 D152 DA90 DAC32 DAF96 DC70 DC80 DCC90 DD6 DD7 DF62 DF91

More information

TRIANGLES CHAPTER 7. (A) Main Concepts and Results. (B) Multiple Choice Questions

TRIANGLES CHAPTER 7. (A) Main Concepts and Results. (B) Multiple Choice Questions CHAPTER 7 TRIANGLES (A) Main Concepts and Results Triangles and their parts, Congruence of triangles, Congruence and correspondence of vertices, Criteria for Congruence of triangles: (i) SAS (ii) ASA (iii)

More information

A plane can be names using a capital cursive letter OR using three points, which are not collinear (not on a straight line)

A plane can be names using a capital cursive letter OR using three points, which are not collinear (not on a straight line) Geometry - Semester 1 Final Review Quadrilaterals (Including some corrections of typos in the original packet) 1. Consider the plane in the diagram. Which are proper names for the plane? Mark all that

More information

ELECTRIC SUN NEW JERSEY'S OLDEST WEEKLY NEWSPAPER EST :30-5:30 DAILY SAT. 10>00-5:30 OPEN TILL 9:00 P.M. THURS. "A Unisex Boutique*'

ELECTRIC SUN NEW JERSEY'S OLDEST WEEKLY NEWSPAPER EST :30-5:30 DAILY SAT. 10>00-5:30 OPEN TILL 9:00 P.M. THURS. A Unisex Boutique*' G Y Y 9 ] v- j $ G - v $ F v F v v - v G / $ v z - -! v - )v - v ( -! - - j---- - - - v v- - - - -! / j v - v G -

More information

l 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

l 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 information

5 : ; <= FG M K M K & P, QR*+ S T U *0,/ VW X,Y W =? [\] %!? M M AN^ L _ S X 1 M K

5 : ; <= FG M K M K & P, QR*+ S T U *0,/ VW X,Y W =? [\] %!? M M AN^ L _ S X 1 M K B 31C B 5 2014 9D E ARID ZONE RESEARCH Vol.31 No.5 Sept.2014 doi:10.13866/j.azr.2014.05.22!"#$%&' 1,,,, (, 450003) : 1950 2010!"#,$% Mann Kendal&' (M K ) Petit Mann Whitney Pet tit (MWP ) ()*+,-./*0 51,

More information

AS-SV ± 0.16 Ma Cumulative 39 Ar Released (%)

AS-SV ± 0.16 Ma Cumulative 39 Ar Released (%) Noble Gas Mass Spectrometry COAS Oregon State University, Corvallis, Oregon USA 12C2122.AGE >>> AS-SV-14 gm Steiner 2A18-12 >>> STEINER PROJECT Age 20 18 16 14 12 8 6 AS-SV-14 13.68 ± 0.16 Ma 53.1 SiO

More information

Wahkiakum School District, Pre-EOC Geometry 2012

Wahkiakum School District, Pre-EOC Geometry 2012 Pre-EOC Assesment Geometry #1 Wahkiakum School District GEOM Page 1 1. What is the converse of If there are clouds in the sky, then it is raining? 2-2 A If it is raining, then there are clouds in the sky.

More information

THE I Establiifrad June, 1893

THE I Establiifrad June, 1893 89 : 8 Y Y 2 96 6 - - : - 2 q - 26 6 - - q 2 2 2 4 6 4«4 ' V () 8 () 6 64-4 '2" () 6 ( ) * 'V ( 4 ) 94-4 q ( / ) K ( x- 6% j 9*V 2'%" 222 27 q - - K 79-29 - K x 2 2 j - -% K 4% 2% 6% ' K - 2 47 x - - j

More information

3 = 1, a c, a d, b c, and b d.

3 = 1, a c, a d, b c, and b d. hapter 7 Maintaining Mathematical Proficienc (p. 357) 1. (7 x) = 16 (7 x) = 16 7 x = 7 7 x = 3 x 1 = 3 1 x = 3. 7(1 x) + = 19 7(1 x) = 1 7(1 x) = 1 7 7 1 x = 3 1 1 x = x 1 = 1 x = 3. 3(x 5) + 8(x 5) =

More information

THE TRANSLATION PLANES OF ORDER 49 AND THEIR AUTOMORPHISM GROUPS

THE TRANSLATION PLANES OF ORDER 49 AND THEIR AUTOMORPHISM GROUPS MATHEMATICS OF COMPUTATION Volume 67, Number 223, July 1998, Pages 1207 1224 S 0025-5718(98)00961-2 THE TRANSLATION PLANES OF ORDER 49 AND THEIR AUTOMORPHISM GROUPS C. CHARNES AND U. DEMPWOLFF Abstract.

More information

Chapter 3 Summary 3.1. Determining the Perimeter and Area of Rectangles and Squares on the Coordinate Plane. Example

Chapter 3 Summary 3.1. Determining the Perimeter and Area of Rectangles and Squares on the Coordinate Plane. Example Chapter Summar Ke Terms bases of a trapezoid (.) legs of a trapezoid (.) composite figure (.5).1 Determining the Perimeter and Area of Rectangles and Squares on the Coordinate Plane The perimeter or area

More information

Honors Geometry Qtr 2 Practice from Chapters 5-8

Honors Geometry Qtr 2 Practice from Chapters 5-8 Block: Seat: Honors Geometry Qtr 2 Practice from Chapters 5-8 Short Answer 1. Use DEF, where J, K, and L are midpoints of the sides. If DE = 8x + 12 and KL = 10x 9, what is DE? 2. Use DEF, where J, K,

More information

Geometry Midterm REVIEW

Geometry Midterm REVIEW Name: Class: Date: ID: A Geometry Midterm REVIEW Multiple Choice Identify the choice that best completes the statement or answers the question. 1. Given LM = MP and L, M, and P are not collinear. Draw

More information

Created by T. Madas MIXED SURD QUESTIONS. Created by T. Madas

Created by T. Madas MIXED SURD QUESTIONS. Created by T. Madas MIXED SURD QUESTIONS Question 1 (**) Write each of the following expressions a single simplified surd a) 150 54 b) 21 7 C1A, 2 6, 3 7 Question 2 (**) Write each of the following surd expressions as simple

More information

MULTIPLE PRODUCTS OBJECTIVES. If a i j,b j k,c i k, = + = + = + then a. ( b c) ) 8 ) 6 3) 4 5). If a = 3i j+ k and b 3i j k = = +, then a. ( a b) = ) 0 ) 3) 3 4) not defined { } 3. The scalar a. ( b c)

More information

Geometry 3 SIMILARITY & CONGRUENCY Congruency: When two figures have same shape and size, then they are said to be congruent figure. The phenomena between these two figures is said to be congruency. CONDITIONS

More information

Chapter 7. Geometric Inequalities

Chapter 7. Geometric Inequalities 4. Let m S, then 3 2 m R. Since the angles are supplementary: 3 2580 4568 542 Therefore, m S 42 and m R 38. Part IV 5. Statements Reasons. ABC is not scalene.. Assumption. 2. ABC has at least 2. Definition

More information

CHAPTER 4. Chapter Opener PQ (3, 3) Lesson 4.1

CHAPTER 4. Chapter Opener PQ (3, 3) Lesson 4.1 CHAPTER 4 Chapter Opener Chapter Readiness Quiz (p. 17) 1. D. H; PQ **** is horizontal, so subtract the x-coordinates. PQ 7 5 5. B; M 0 6, 4 (, ) Lesson 4.1 4.1 Checkpoint (pp. 17 174) 1. Because this

More information

9. a. DEF UVW. c. UV a. MNO MPQ. b. MP. 11. a. (AC) (AC) (AC)

9. a. DEF UVW. c. UV a. MNO MPQ. b. MP. 11. a. (AC) (AC) (AC) C H A P T E R 1 3 SIMILAR TRIANGLES AND TRIGONOMETRY LESSON 13-1 pp. 738 743 1. The literal meaning of trigonometry is triangle measure.. a. No, because no unit was named. Students might use different

More information

Transforming to a New Level!

Transforming to a New Level! LESSON.1 Skills Practice Name Date Transforming to a New Level! Using Transformations to Determine Area Problem Set Translate each given rectangle or square such that one verte of the image is located

More information
2024 © sciencedocbox.com Privacy Policy | Terms of Service | Feedback