Îúíþ œž– ˜‡ __text__TEXTÃ\ žŠi €__data__DATAÃ\ã___cstring__TEXTà\)`__literal8__TEXT†@ ‰__common__DATA ‡__picsymbolstub2__TEXT@†`‰îB€__la_sym_ptr2__DATAS‡,sŠð  __nl_symbol_ptr__DATA€‡  Š__textcoal_nt__TEXTŒ‡ ¬Š @Ìð$|ò P hðU‰åSƒìèôÿÿÿ‹”‡“”‡‹‚ÈàÆ@;ƒ‚“”‡ƒÔ\‰‚Œƒ”‡fǀº ÿÿƒ”‡Æ€9 ‹”‡“”‡‹‚ÈàÆ@ƒ‚ƒ”‡Ç€ ƒ”‡fǀ^ ÿÿƒ”‡Æ€‹ ‹”‡“”‡‹‚ÈàÆ@Žƒ‚“”‡ƒô\‰‚ ƒ”‡fǀ` ƒ”‡Æ€Œ ‹”‡“”‡‹‚ÈàÆ@ƒ‚“”‡ƒ4]‰‚ ƒ”‡fǀb ÿÿƒ”‡Æ€ ‹”‡“”‡‹‚ÈàÆ@у‚“”‡ƒt]‰‚ ƒ”‡fǀæ ÿÿƒ”‡Æ€Ï ‹”‡“”‡‹‚ÈàÆ@҃‚“”‡ƒŽ]‰‚ ƒ”‡fǀè ÿÿƒ”‡Æ€Ð ‹”‡“”‡‹‚ÈàÆ@ƒƒ‚“”‡ƒô]‰‚Ü ƒ”‡fǀJ ÿÿƒ”‡Æ€ “”‡ƒ”‡‹€‰‚‹”‡“”‡‹‚ÈàÆ@<ƒ‚“”‡ƒ4^‰‚Àƒ”‡fǀŒ ÿÿƒ”‡Æ€: ‹”‡“”‡‹‚ÈàÆ@#ƒ‚“”‡ƒt^‰‚\ƒ”‡fǀŠ ÿÿƒ”‡Æ€! ‹”‡“”‡‹‚ÈàÆ@ƒ‚“”‡ƒ“^‰‚4ƒ”‡fǀv ÿÿƒ”‡Æ€ ‹”‡“”‡‹‚ÈàÆ@Qƒ‚“”‡ƒ±^‰‚ ƒ”‡fǀæ ÿÿƒ”‡Æ€O ‹”‡“”‡‹‚ÈàÆ@ ƒ‚“”‡ƒÔ^‰‚Pƒ”‡fǀ„ ÿÿƒ”‡Æ€ ‹”‡“”‡‹‚ÈàÆ@"ƒ‚“”‡ƒ_‰‚Xƒ”‡fǀˆ ÿÿƒ”‡Æ€ ‹”‡“”‡‹‚ÈàÆ@…ƒ‚“”‡ƒT_‰‚ä ƒ”‡fǀN ÿÿƒ”‡Æ€ƒ ‹”‡“”‡‹‚ÈàÆ@‡ƒ‚“”‡ƒ”_‰‚ì ƒ”‡fǀR ÿÿƒ”‡Æ€… ‹”‡“”‡‹‚ÈàÆ@ƒ‚“”‡ƒÔ_‰‚ƒ”‡fǀ` ÿÿƒ”‡Æ€ ‹”‡“”‡‹‚ÈàÆ@`ƒ‚“”‡ƒ`‰‚P ƒ”‡fǀ ÿÿƒ”‡Æ€^ ‹”‡“”‡‹‚ÈàÆ@†ƒ‚“”‡ƒT`‰‚è ƒ”‡fǀP ÿÿƒ”‡Æ€„ ƒÄ[]ÃU‰åSƒìèúÿÿ‹š“š‹‚ÈàÆ@:ƒ‚“šƒ‡Z‰‚žƒšfǀž ÿÿƒšÆ€8 ‹š“š‹‚ÈàÆ@փ‚“šƒ›Z‰‚( ƒšfǀð ÿÿƒšÆ€Ô ‹š“š‹‚ÈàÆ@–ƒ‚“šƒžZ‰‚( ƒšfǀp ÿÿƒšÆ€” ‹š“š‹‚ÈàÆ@‘ƒ‚“šƒèZ‰‚ ƒšfǀf ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@’ƒ‚“šƒ([‰‚ ƒšfǀh ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@šƒ‚“šƒU[‰‚8 ƒšfǀx ÿÿƒšÆ€˜ ‹š“š‹‚ÈàÆ@šƒ‚“šƒˆ[‰‚8 ƒšfǀx –ƒšÆ€˜ ‹š“š‹‚ÈàÆ@oƒ‚“šƒ«[‰‚Œ ƒšfǀ" ÿÿƒšÆ€m ‹š“š‹‚ÈàÆ@™ƒ‚“šƒÈ[‰‚4 ƒšfǀv –ƒšÆ€— ‹š“š‹‚ÈàÆ@lƒ‚“šƒî[‰‚€ ƒšfǀ ÿÿƒšÆ€j ‹š“š‹‚ÈàÆ@›ƒ‚“šƒ(\‰‚< ƒšfǀz –ƒšÆ€™ ‹š“š‹‚ÈàÆ@qƒ‚“šƒM\‰‚” ƒšfǀ& ÿÿƒšÆ€o ‹š“š‹‚ÈàÆ@ƒ‚“šƒh\‰‚D ƒšfǀ~ ֍ƒšÆ€› ‹š“š‹‚ÈàÆ@rƒ‚“šƒî[‰‚˜ ƒšfǀ( ÿÿƒšÆ€p ‹š“š‹‚ÈàÆ@$ƒ‚“šƒš\‰‚`ƒšfǀŒ ÿÿƒšÆ€" ‹š“š‹‚ÈàÆ@Ƀ‚“šƒÊ\‰‚ô ƒšfÇ€Ö ÿÿƒšÆ€Ç ‹š“š‹‚ÈàÆ@Áƒ‚“šƒæ\‰‚Ô ƒšfÇ€Æ ÿÿƒšÆ€¿ ‹š“š‹‚ÈàÆ@ȃ‚“šƒ]‰‚𠍃šfÇ€Ô ÿÿƒšÆ€Æ ‹š“š‹‚ÈàÆ@ªƒ‚“šƒ]‰‚x ƒšfǀ˜ ÿÿƒšÆ€š ‹š“š‹‚ÈàÆ@˜ƒ‚“šƒH]‰‚0 ƒšfǀt –ƒšÆ€– ‹š“š‹‚ÈàÆ@—ƒ‚“šƒˆ]‰‚, ƒšfǀr ÿÿƒšÆ€• ‹š“š‹‚ÈàÆ@ƒ‚ƒšÇ€ÜƒšfǀJ ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@ƒ‚“šƒÈ]‰‚àƒšfǀL ƒšÆ€ ‹š“š‹‚ÈàÆ@ƒ‚“šƒ^‰‚䍃šfǀN ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@ƒ‚“šƒH^‰‚荃šfǀP ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@ƒ‚“šƒ^‰‚ðƒšfǀT ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@ ƒ‚“šƒ–^‰‚ôƒšfǀV ÿÿƒšÆ€ ‹š“š‹‚ÈàÆ@ ƒ‚“šƒ«^‰‚øƒšfǀX ÿÿƒšÆ€ ƒÄ[]ÃU‰åSƒìèñÿÿ‹ x“ x‹‚ÈàÆ@Bƒ‚“ xƒžU‰‚؍ƒ xfÇ€È ÿÿƒ xƀ@ ‹ x“ x‹‚ÈàÆ@¬ƒ‚“ xƒÎU‰‚€ ƒ xfǀœ ÿÿƒ xƀª ‹ x“ x‹‚ÈàÆ@²ƒ‚“ xƒàU‰‚˜ ƒ xfǀš ÿÿƒ xƀ° ‹ x“ x‹‚ÈàÆ@³ƒ‚“ xƒV‰‚œ ƒ xfǀª ÿÿƒ xƀ± ‹ x“ x‹‚ÈàÆ@pƒ‚“ xƒV‰‚ ƒ xfǀ$ ÿÿƒ xƀn ‹ x“ x‹‚ÈàÆ@ʃ‚“ xƒ@V‰‚ø ƒ xfÇ€Ø ¬ƒ xÆ€È ‹ x“ x‹‚ÈàÆ@fƒ‚“ xƒ€V‰‚h ƒ xfǀ ¬ƒ xƀd ‹ x“ x‹‚ÈàÆ@׃‚“ xƒÀV‰‚, ƒ xfǀò ¬ƒ xÆ€Õ ‹ x“ x‹‚ÈàÆ@؃‚“ xƒäV‰‚0 ƒ xfǀô ÿÿƒ xÆ€Ö ‹ x“ x‹‚ÈàÆ@ك‚“ xƒW‰‚4 ƒ xfǀö ¬ƒ xÆ€× ‹ x“ x‹‚ÈàÆ@ڃ‚“ xƒäV‰‚8 ƒ xfǀø ÿÿƒ xÆ€Ø ‹ x“ x‹‚ÈàÆ@ă‚“ xƒ@W‰‚à ƒ xfÇ€Ì ¬ƒ xƀ ‹ x“ x‹‚ÈàÆ@‹ƒ‚“ xƒ€W‰‚ü ƒ xfǀZ ¬ƒ xƀ‰ ‹ x“ x‹‚ÈàÆ@Œƒ‚“ xƒÀW‰‚ ƒ xfǀ\ ÿÿƒ xƀŠ ‹ x“ x‹‚ÈàÆ@‰ƒ‚“ xƒçW‰‚ô ƒ xfǀV ¬ƒ xƀ‡ ‹ x“ x‹‚ÈàÆ@Šƒ‚“ xƒX‰‚ø ƒ xfǀX ÿÿƒ xƀˆ ‹ x“ x‹‚ÈàÆ@šƒ‚“ xƒX‰‚p ƒ xfǀ” §ƒ xƀŠ ‹ x“ x‹‚ÈàÆ@©ƒ‚“ xƒX‰‚t ƒ xfǀ– ÿÿƒ xƀ§ ‹ x“ x‹‚ÈàÆ@§ƒ‚“ xƒ0X‰‚l ƒ xfǀ’ ÿÿƒ xƀ¥ ‹ x“ x‹‚ÈàÆ@Àƒ‚“ xƒ`X‰‚Ð ƒ xfÇ€Ä ÿÿƒ xƀŸ ‹ x“ x‹‚ÈàÆ@1ƒ‚“ xƒ X‰‚”ƒ xfǀŠ ÿÿƒ xƀ/ ‹ x“ x‹‚ÈàÆ@ƒ‚“ xƒàX‰‚ ƒ xfǀd ÿÿƒ xƀŽ ‹ x“ x‹‚ÈàÆ@•ƒ‚“ xƒ Y‰‚$ ƒ xfǀn ÿÿƒ xƀ“ ‹ x“ x‹‚ÈàÆ@“ƒ‚“ xƒ`Y‰‚ ƒ xfǀj ÿÿƒ xƀ‘ ‹ x“ x‹‚ÈàÆ@”ƒ‚“ xƒ Y‰‚ ƒ xfǀl ÿÿƒ xƀ’ ‹ x“ x‹‚ÈàÆ@aƒ‚“ xƒÐY‰‚T ƒ xfǀ ÿÿƒ xƀ_ ‹ x“ x‹‚ÈàÆ@œƒ‚“ xƒZ‰‚@ ƒ xfǀ| ÿÿƒ xƀš ‹ x“ x‹‚ÈàÆ@8ƒ‚“ xƒ@Z‰‚°ƒ xfǀŽ ÿÿƒ xƀ6 ‹ x“ x‹‚ÈàÆ@“ xƒ€Z‰‚Ü ƒ xfÇ€Ê ÿÿƒ xƀÁ ‹ x“ x‹‚ÈàÆ@ƒ‚“ xƒÀZ‰‚ ƒ xfǀl ̓ xƀ ƒÄ[]АU‰åSƒìèPçÿÿ‹ðn“ðn‹‚ÈàÆ@=ƒ‚“ðnƒ0Q‰‚čƒðnfǀŸ ÿÿƒðnƀ; ‹ðn“ðn‹‚ÈàÆ@/ƒ‚“ðnƒhQ‰‚Œƒðnfǀ¢ ÿÿƒðnƀ- ‹ðn“ðn‹‚ÈàÆ@0ƒ‚“ðnƒQ‰‚ƒðnfǀ€ ÿÿƒðnƀ. ‹ðn“ðn‹‚ÈàÆ@Rƒ‚“ðnƒ»Q‰‚ ƒðnfǀè ÿÿƒðnƀP ‹ðn“ðn‹‚ÈàÆ@Tƒ‚“ðnƒÍQ‰‚ ƒðnfǀì RƒðnƀR ‹ðn“ðn‹‚ÈàÆ@Sƒ‚“ðnƒáQ‰‚ ƒðnfǀê ÿÿƒðnƀQ ‹ðn“ðn‹‚ÈàÆ@Uƒ‚“ðnƒõQ‰‚$ ƒðnfǀî RƒðnƀS ‹ðn“ðn‹‚ÈàÆ@[ƒ‚“ðnƒ R‰‚< ƒðnfǀú ÿÿƒðnƀY ‹ðn“ðn‹‚ÈàÆ@]ƒ‚“ðnƒÍQ‰‚D ƒðnfǀþ [ƒðnƀ[ ‹ðn“ðn‹‚ÈàÆ@\ƒ‚“ðnƒáQ‰‚@ ƒðnfǀü ÿÿƒðnƀZ ‹ðn“ðn‹‚ÈàÆ@^ƒ‚“ðnƒ R‰‚H ƒðnfǀ [ƒðnƀ\ ‹ðn“ðn‹‚ÈàÆ@_ƒ‚“ðnƒPR‰‚L ƒðnfǀ ÿÿƒðnƀ] ‹ðn“ðn‹‚ÈàÆ@Wƒ‚“ðnƒpR‰‚, ƒðnfǀò ÿÿƒðnƀU ‹ðn“ðn‹‚ÈàÆ@Yƒ‚“ðnƒÍQ‰‚4 ƒðnfǀö WƒðnƀW ‹ðn“ðn‹‚ÈàÆ@Xƒ‚“ðnƒáQ‰‚0 ƒðnfǀô ÿÿƒðnƀV ‹ðn“ðn‹‚ÈàÆ@Zƒ‚“ðnƒ R‰‚8 ƒðnfǀø WƒðnƀX ‹ðn“ðn‹‚ÈàÆ@¢ƒ‚“ðnƒR‰‚X ƒðnfǀˆ ÿÿƒðnƀ  ‹ðn“ðn‹‚ÈàÆ@Ÿƒ‚“ðnƒÐR‰‚L ƒðnfǀ‚ ÿÿƒðnƀ ‹ðn“ðn‹‚ÈàÆ@¡ƒ‚“ðnƒS‰‚T ƒðnfǀ† ÿÿƒðnƀŸ ƒÄ[]ÃU‰åSƒìè(áÿÿ‹Èh“Èh‹‚ÈàÆ@£ƒ‚“Èhƒ M‰‚\ ƒÈhfǀŠ ÿÿƒÈhƀ¡ ‹Èh“Èh‹‚ÈàÆ@Šƒ‚“ÈhƒHM‰‚h ƒÈhfǀ ÿÿƒÈhƀ€ ‹Èh“Èh‹‚ÈàÆ@!ƒ‚“ÈhƒˆM‰‚TƒÈhfǀ† ÿÿƒÈhƀ ‹Èh“Èh‹‚ÈàÆ@ƒ‚“ÈhƒžM‰‚ƒÈhfǀf ÿÿƒÈhƀ ‹Èh“Èh‹‚ÈàÆ@ƒ‚“ÈhƒèM‰‚ƒÈhfǀh ÿÿƒÈhƀ ‹Èh“Èh‹‚ÈàÆ@mƒ‚“Èhƒ(N‰‚„ ƒÈhfǀ ÿÿƒÈhƀk ‹Èh“Èh‹‚ÈàÆ@¥ƒ‚“ÈhƒhN‰‚d ƒÈhfǀŽ ÿÿƒÈhƀ£ ‹Èh“Èh‹‚ÈàÆ@ǃ‚“ÈhƒN‰‚ì ƒÈhfÇ€Ò ÿÿƒÈhƀŠ‹Èh“Èh‹‚ÈàÆ@€ƒ‚“ÈhƒšN‰‚` ƒÈhfǀŒ ÿÿƒÈhƀ¢ ‹Èh“Èh‹‚ÈàÆ@2ƒ‚“ÈhƒÈN‰‚˜ƒÈhfǀš ÿÿƒÈhƀ0 ‹Èh“Èh‹‚ÈàÆ@3ƒ‚“ÈhƒO‰‚œƒÈhfǀª ÿÿƒÈhƀ1 ‹Èh“Èh‹‚ÈàÆ@4ƒ‚“ÈhƒHO‰‚ ƒÈhfǀ¬ ÿÿƒÈhƀ2 ‹Èh“Èh‹‚ÈàÆ@5ƒ‚“ÈhƒoO‰‚€ƒÈhfǀ® ÿÿƒÈhƀ3 ‹Èh“Èh‹‚ÈàÆ@7ƒ‚“Èhƒ‰O‰‚¬ƒÈhfǀ² ÿÿƒÈhƀ5 ‹Èh“Èh‹‚ÈàÆ@6ƒ‚“ÈhƒšO‰‚šƒÈhfǀ° ÿÿƒÈhƀ4 ‹Èh“Èh‹‚ÈàÆ@ƃ‚“ÈhƒÈO‰‚è ƒÈhfǀРÿÿƒÈhÆ€Ä ‹Èh“Èh‹‚ÈàÆ@ ƒ‚“ÈhƒP‰‚P ƒÈhfǀ„ ÿÿƒÈhƀž ‹Èh“Èh‹‚ÈàÆ@ƒ‚“ÈhƒHP‰‚$ƒÈhfǀn ÿÿƒÈhƀ ƒÄ[]АU‰åSƒìèPÛÿÿ‹ðb“ðb‹‚ÈàÆ@>ƒ‚“ðbƒ°J‰‚ȍƒðbfǀÀ ÿÿƒðbƀ< ‹ðb“ðb‹‚ÈàÆ@bƒ‚“ðbƒÐJ‰‚X ƒðbfǀ ÿÿƒðbƀ` ‹ðb“ðb‹‚ÈàÆ@eƒ‚“ðbƒK‰‚d ƒðbfǀ bƒðbƀc ‹ðb“ðb‹‚ÈàÆ@cƒ‚“ðbƒPK‰‚\ ƒðbfǀ ÿÿƒðbƀa ‹ðb“ðb‹‚ÈàÆ@dƒ‚“ðbƒK‰‚` ƒðbfǀ cƒðbƀb ‹ðb“ðb‹‚ÈàÆ@Mƒ‚“ðbƒÐK‰‚ ƒðbfÇ€Þ ÿÿƒðbƀK ‹ðb“ðb‹‚ÈàÆ@Hƒ‚“ðbƒL‰‚ðƒðbfÇ€Ô ÿÿƒðbƀF ‹ðb“ðb‹‚ÈàÆ@?ƒ‚“ðbƒPL‰‚̍ƒðbfǀ ÿÿƒðbƀ= ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒL‰‚썃ðbfǀR ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒÐL‰‚ ƒðbfǀb ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒýL‰‚ƒðbfǀd ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒ0M‰‚ƒðbfǀj ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@9ƒ‚“ðbƒpM‰‚Žƒðbfǀ¶ ÿÿƒðbƀ7 ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒ°M‰‚Hƒðbfǀ€ ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒÐM‰‚Lƒðbfǀ‚ ÿÿƒðbƀ ‹ðb“ðb‹‚ÈàÆ@ƒ‚“ðbƒñM‰‚8ƒðbfǀx ÿÿƒðbƀ ƒÄ[]АU‰åSƒìèÖÿÿ‹Œ]“Œ]‹‚ÈàÆ@@ƒ‚“Œ]ƒÛH‰‚ЍƒŒ]fÇ€Ä ÿÿƒŒ]ƀ> ‹Œ]“Œ]‹‚ÈàÆ@«ƒ‚“Œ]ƒòH‰‚| ƒŒ]fǀš ÿÿƒŒ]ƀ© ‹Œ]“Œ]‹‚ÈàÆ@yƒ‚“Œ]ƒI‰‚Ž ƒŒ]fǀ6 «ƒŒ]ƀw ‹Œ]“Œ]‹‚ÈàÆ@zƒ‚“Œ]ƒII‰‚ž ƒŒ]fǀ8 ÿÿƒŒ]ƀx ‹Œ]“Œ]‹‚ÈàÆ@~ƒ‚“Œ]ƒ\I‰‚È ƒŒ]fǀ@ «ƒŒ]ƀ| ‹Œ]“Œ]‹‚ÈàÆ@ƒ‚“Œ]ƒœI‰‚Ì ƒŒ]fǀB ÿÿƒŒ]ƀ} ‹Œ]“Œ]‹‚ÈàÆ@{ƒ‚“Œ]ƒÜI‰‚Œ ƒŒ]fǀ: ÿÿƒŒ]ƀy ‹Œ]“Œ]‹‚ÈàÆ@€ƒ‚“Œ]ƒJ‰‚Ð ƒŒ]fǀD ÿÿƒŒ]ƀ~ ‹Œ]“Œ]‹‚ÈàÆ@nƒ‚“Œ]ƒ ÿÿƒŒ]ƀ{ ‹Œ]“Œ]‹‚ÈàÆ@xƒ‚“Œ]ƒœL‰‚° ƒŒ]fǀ4 ÿÿƒŒ]ƀv ‹Œ]“Œ]‹‚ÈàÆ@‚ƒ‚“Œ]ƒÂL‰‚Ø ƒŒ]fǀH ÿÿƒŒ]ƀ€ ‹Œ]“Œ]‹‚ÈàÆ@(ƒ‚“Œ]ƒüL‰‚pƒŒ]fǀ” ÿÿƒŒ]ƀ& ‹Œ]“Œ]‹‚ÈàÆ@,ƒ‚“Œ]ƒ‰‚È ƒ$FfǀÀ œƒ$FƀŒ ‹$F“$F‹‚ÈàÆ@¿ƒ‚“$Fƒ>‰‚Ì ƒ$Ffǀ ÿÿƒ$Fƀœ ‹$F“$F‹‚ÈàÆ@·ƒ‚“$FƒD>‰‚¬ ƒ$Ffǀ² ÿÿƒ$Fƀµ ‹$F“$F‹‚ÈàÆ@žƒ‚“$Fƒ>‰‚° ƒ$FfǀŽ ·ƒ$Fƀ¶ ‹$F“$F‹‚ÈàÆ@¹ƒ‚“$Fƒ>‰‚Ž ƒ$Ffǀ¶ ÿÿƒ$Fƀ· ‹$F“$F‹‚ÈàÆ@Eƒ‚“$Fƒi>‰‚䍃$FfǀΠÿÿƒ$FƀC ‹$F“$F‹‚ÈàÆ@˃‚“$Fƒ€>‰‚ü ƒ$FfÇ€Ú ÿÿƒ$FÆ€É ‹$F“$F‹‚ÈàÆ@̓‚“$Fƒä>‰‚ ƒ$FfÇ€Þ Ëƒ$FÆ€Ë ‹$F“$F‹‚ÈàÆ@̃‚“$Fƒ?‰‚ ƒ$FfÇ€Ü ÿÿƒ$FÆ€Ê ‹$F“$F‹‚ÈàÆ@Ѓ‚“$FƒD?‰‚ ƒ$Ffǀä ÿÿƒ$FƀЍ‹$F“$F‹‚ÈàÆ@󂍓$Fƒ„?‰‚ ƒ$Ffǀâ ÿÿƒ$FÆ€Í ‹$F“$F‹‚ÈàÆ@΃‚“$FƒÄ?‰‚ ƒ$Ffǀà ÿÿƒ$FÆ€Ì ƒÄ[]АU‰åƒìèñ·ÿÿÇEôݍEôƒ(ƒ}ôÿu덁‘?EôÐ Æ@ ëÞÉАU‰åWVSƒì\趷ÿÿ“>?‹ƒ>?‹‹€‰‚8 ƒ>?‹Ç€‹V?“>?‹ƒ>?‹‹’<¯ü‰Ðd‰ ƒV?ǀ˜ƒV?ǀšƒV?ǀ°ƒV?Ç@“V?ƒ¶=òòB ƒV?ǀЍƒV?ǀ°ƒV?ǀȍƒV?ǀ؍ƒV?ǀ荃V?ǀÀƒV?ǀž»V?³>?‹6ƒ>?‹‹€ô‰$è¬=‰Â‹†@)Љ‡°ƒ>?‹ƒžu0ƒ>?‹ƒxu"ƒ>?‹òˆpƒŸ=òf.ÁwëD“V?ƒ>?‹òŠpò€|f.Áw덃V?“>?‹ò‚|ò€pƒ>?‹ƒžtD“V?ƒ>?‹òŠ ò€Œf.Èw덃V?“>?‹ò‚Œò€ ƒ>?‹‹€‰Eäƒ}ät‹Eäƒx,uë‹Eä€`M¿‹Eä‹@,‰Eäëݍƒ>?‹ƒx<tUƒ>?‹‹€‰Eäƒ}ät>‹Eäƒx,uë3‹Eä¶@NÐè¶À‰Âƒâƒ>?‹;t‹Eä€HM@‹Eä‹@,‰Eä댍ƒ>?‹‹€‰Eäƒ}ä„Ê‹Eäƒx,u錋Eä¶@MÀè¶Àƒà…Àtƒ>?‹ƒž”té„‹Eä‹@0‰$èÊ;‰EŽ‹Eä‹@8‰$è¹;‰EŒ‹Eä‹@4‰$èš;‰EžƒV?ƒ€°‹V?“V?‹EŽ‚؉ØƒV?‹€ˆ;EŽ}“V?‹EŽ‰‚ˆ‹V?“V?‹EŒ‚ȉÈƒV?‹€`;EŒ}“V?‹EŒ‰‚`‹V?“V?‹Eä·@L%ÿ‚À‰À‹Eä·@L%ÿ‰E°ƒV?‹€ž;E°}“V?‹E°‰‚ž‹Eä¶@MÀè¶Àƒà…Àu/ƒ>?‹‹UŽ;4uƒV?ƒ€ë ƒV?ƒ€ˆƒ}žt;‹V?“V?‹Ež‚ЉÐƒV?‹€x;Ež}“V?‹Ež‰‚x»V?³V?‹>?‹ ‹EŽ‹UŒ‰ÐÀÐЁü†˜ƒÀ`‰‡˜‹Eäƒx4tI‹V?³V?‹Už‰ÐÀЍ<ƒ>?‹‹4‰ÐÀÐЃÀ¯EžÑè8†šƒÀ‰š‹Eäƒx<t3»V?³V?‹Eä‹@<‰$è9‰Â‰ÐÀÐІ ƒÀ‰‡ ‹Eäƒx@t3»V?³V?‹Eä‹@@‰$èa9‰Â‰ÐÀÐІ ƒÀ‰‡ ‹Eä¶@MÀè¶Àƒà…ÀtéÛ‹Eä€HM@ÇEà‹Eäƒx8„ï‹Eä‹@8ƒÀ‰E܋E܋‰UàE܃…Òué̃}àtãƒ}àt݋Eà¶@MÀè¶Àƒà…ÀuɋEäƒxtÀ‹Eàƒxu뵋Eà‹@‰D$‹Eä‹@‰$èŒ8Ý]ȍƒV?ƒ@“V?ƒV?ò@ òXEÈòB ƒV?òH(òEÈf.Áw덃V?òEÈò@(ƒV?òH0òEÈf.Èwé2ÿÿÿƒV?òEÈò@0éÿÿÿ‹Eäƒx„ÄÇE؋Eäƒx0„°‹Eä‹@0ƒÀ‰EԋEԋ‰U؍Eԃ…Òu鍍ƒV?ƒ€žEÀ‰D$‹Eä‰D$‹E؋@‰$è†7ƒV?òˆˆòEÀf.Áw덃V?òEÀò€ˆƒV?òˆòEÀf.ÈwétÿÿÿƒV?òEÀò€é\ÿÿÿ‹Eä‹@,‰Eäé,ûÿÿƒ>?‹‹€0‰E؃}Ø„É‹E؃8u錋Eض@Àè¶Àƒà…Àt閍“V?ƒV?‹€°ƒÀ‰‚°‹E؃x tr‹E؋@ ‰$èÓ6‰EŒ‹V?“V?‹EŒ‚艁荃V?‹€;EŒ}“V?‹EŒ‰‚³V?‹V?‹UŒ‰ÐÀÐЁ°ƒÀ‰†°‹E؋‰EØé-ÿÿÿƒ>?‹“>?‹‹’8 ‰ƒÄ\[^_]ÃU‰åƒìÉÃU‰åSƒì4èð®ÿÿƒ6ǀèÛ®ÿÿèÂŽÿÿèÅœÿÿèpÇÿÿè“ÍÿÿèfÓÿÿè•ØÿÿèHáÿÿèèÿÿèðÿÿƒ6žçvAÇD$ 獃6‹€‰D$ƒp0‰D$ƒt6‹‹@4‰$èV5Ç$è15ƒ6ǀÀƒ6ǀȍƒ6ǀØÿÿÿƒ6ǀЀ“6ƒ5òò‚荓6ƒ5òò‚ø“6ƒ5òò‚ðÇEô}ôÜ~韍ƒ6Eôð €x~;“6ƒ6Eôð ¶@ò„žòE荓6‹EôòEèòÂëEƒ6Eôð €xt1“6ƒ6Eôð ¶@‹„ž‰E䍋6‹Uô‹Eä‰эEôƒéSÿÿÿƒÄ4[]ÐU‰åSƒì$è ­ÿÿÇEô“¬4ƒ¬4Eà¶@€Œþ u ‹EƒÀ‰Eðë‹E‰Eð‹Eð‰E썓¬4‹Eì;‚}v“¬4ƒ¬4Eìà¶@€Œþ uëRƒ¬4Eìà¶@‰$è:3…Àu)“¬4ƒ¬4Eìà¶@€ŒÛ uÇEôEìƒéyÿÿÿ‹U ‹E쉋EôƒÄ$[]ÃU‰åWVSƒìè&¬ÿÿƒÆ3Eð €x~7³Æ3‹U‹Æ3ƒÆ3Eð ¶@ò Öò„Ážf.ÈztCƒÆ3Eð €x8»Æ3‹M³Æ3ƒÆ3Eð ¶P‹Ï;„Öžtë ÇEäëÇEä‹EäƒÄ[^_]ÐU‰åƒìèuóÿÿèšóÿÿ‹E ‰D$‹E‰$èþ1‹E‰$èÚ1ÉÐU‰åVSƒìPè?«ÿÿƒÇ2‹“Ç2‹‹€<;‚@t2“ß2ƒg1òò‚@“ß2ƒg1òò‚HëO³ß2Eè‰D$ƒß2ò€HòD$ ƒß2ò€@òD$ƒß2‹€8‰$è1ݞH³ß2Eè‰D$ƒß2ò€PòD$ ƒß2ò€HòD$ƒß2‹€`‰$èÉ0ݞPƒÇ2‹€P‰D$ƒ¿2‹‹‰D$ƒÇ2‹€P‰D$ƒÇ2‹€P‰D$ ‹E ‰D$ƒ?-‰D$‹E‰$èà0ƒÇ2‹ò€øòD$8ƒÇ2‹ò€€òD$0ƒÇ2‹ò€šòD$(ƒÇ2‹ò@ òD$ ƒÇ2‹ò€pòD$ƒÇ2‹ò€ˆòD$ƒÇ2‹ò€òD$ƒ-‰D$‹E‰$è40ƒÇ2‹ƒž0t+ƒÇ2‹ò€àòD$ƒ/‰D$‹E‰$èø/ƒÇ2‹òH,ƒo1òf.Áwë(ƒÇ2‹ò@,òD$ƒ_/‰D$‹E‰$è±/ƒÇ2‹ƒžÌt+ƒÇ2‹ò€”òD$ƒŸ/‰D$‹E‰$èu/ƒÇ2‹òH4ƒo1òf.Áwë(ƒÇ2‹ò@4òD$ƒß/‰D$‹E‰$è./ƒÇ2‹ƒžÈt+ƒÇ2‹ò€œòD$ƒ0‰D$‹E‰$èò.ƒÇ2‹ò€žòD$ƒw1òòD$ƒÇ2‹ò€èòD$ƒ_0‰D$‹E‰$è¡.ÇEðƒÇ2‹‹Uð;4|ë@“Ç2‹‹Eð ŋ‚ÜòòD$ƒ 1‰D$‹E‰$èM.Eðƒ뫍ƒ1‰D$‹E‰$è0.ÇEô“ß2‹Eô;‚|ëEô‰D$‹Eô‰D$‹E‰$èg-ë҃ÄP[^]ÐU‰åWVSƒìèöŠÿÿ} ܏¢ƒ–.E Ð €x …Šƒ–.E ð €xu.“–.‹E ‹„‚ЉD$ƒÎ,‰D$‹E‰$èƒ-éHÇE‹E ‰$èIúÿÿ…À….“–.‹E ƒŒ‚Ðu鍃–.E Ð Æ@ “–.‹E fƒŒBD ÿt7‹–.“–.‹E ¶„BD ƒ<ÁuƒÒ,‰D$‹E‰$èô,鐍ƒ–.E ð €x~B“–.‹E fƒŒBD ÿu.“–.‹E òÂòD$ƒÛ,‰D$‹E‰$èž,é:ƒ–.E ð €x~b“–.‹E fƒŒBD ÿtN»–.‹u ‹–.“–.‹E ¶„BD ò* Áò÷ò^ÁòD$ƒÛ,‰D$‹E‰$è(,é胖.E ð €x;“–.‹E fƒŒBD ÿu'“–.‹E ‹‰D$ƒá,‰D$‹E‰$èÖ+ëuƒ–.E ð €xa“–.‹E fƒŒBD ÿtM“–.‹E ò* ‹–.“–.‹E ¶„BD ò*Áò^Èf(ÁòD$ƒå,‰D$‹E‰$è_+“–.‹E ‹„‚ЉD$ƒë,‰D$‹E‰$è6+ƒÄ[^_]АU‰åSƒì$è0€ÿÿEð‰D$‹E ‰$è÷ÿÿ…ÀtVƒ**‰D$‹E‰$èô*‹E ‰Eô‹Eô;Eð|ë1ÇD$ƒÐ+Eôà¶@‰D$‹E‰$èÈüÿÿEôƒëŃ}t‹U‹Eð‰ƒÄ$[]ÃU‰åƒìHòE òEðòEòEè‹Eò*MòEðò^Áòò*MòEèò^Áf(ȋE‹UòòYò\Èf(Áò$è)Ý]àòEàòEÐÝEÐÉÃprecision statisticsave. distance of a new vertex to a facet (not 0s)max. distance of a new vertex to a facetmax. distance of an output vertex to a facetmin. distance of an output vertex to a facetmin. denominator in hyperplane computationprecision problems (corrected unless 'Q0' or an error)coplanar half ridges in outputconcave half ridges in outputflipped facetscoplanar horizon facets for new verticescoplanar points during partitioningdegenerate hyperplanes recomputed with gaussian eliminationnearly singular or axis-parallel hyperplaneszero divisors during back substitutezero divisors during gaussian eliminationridges with multiple neighborssummary informationnumber of vertices in outputnumber of facets in outputnumber of non-simplicial facets in outputnumber of simplicial facets that were mergednumber of ridges in outputaverage number of ridges per facetmaximum number of ridgesaverage number of neighbors per facetmaximum number of neighborsaverage number of vertices per facetmaximum number of verticesaverage number of neighbors per vertexcpu seconds for qhull after inputvertices created altogetherfacets created altogetherridges created altogetherfacets before post mergeaverage merges per facet (at most 511) maximum merges for a facet (at most 511)average angle (cosine) of facet normals for all ridges maximum angle (cosine) of facet normals across a ridge minimum angle (cosine) of facet normals across a ridgetotal area of facets maximum facet area minimum facet areabuild hull statisticspoints processedretries due to precision problems max. random jogglemax. vertices at any one timeave. visible facets per iteration ave. visible facets without an horizon neighbor ave. facets deleted per iteration maximumave. visible vertices per iterationave. horizon facets per iterationave. new or merged facets per iteration maximum (includes initial simplex)average new facet balance standard deviationaverage partition balance number of trialssearches of all points for initial simplexdeterminants computed (area & initial hull)determinants not computed because vertex too lowpoints ignored (not above max_outside)points ignored (not above a good facet)points ignored (didn't create a good new facet)good facets founddistance tests for facet visibilitydistance tests to report minimum vertexpoints checked for facets' outer planes ave. distance tests per checkpartitioning statistics (see previous for outer planes)total vertices deleted maximum vertices deleted per iterationcalls to findbest ave. facets tested max. facets tested ave. coplanar searchcalls to findbestnew ave. clearly better calls due to qh_sharpnewfacetscalls to findhorizon horizon facets better than bestfacetangle tests for repartitioned coplanar points repartitioned coplanar points for flipped orientationinside points inside points kept with a facet inside points that were coplanar with a facetcalls to findbestlower with search of vertex neighborsdifference in max_outside at final checkdistance tests for initial partitionpartitions of a pointdistance tests for partitioningdistance tests for checking flipped facetsdistance tests for checking convexitydistance tests for checking good pointdistance tests for outputdistance tests for statisticstotal number of distance testspartitions of coplanar points or deleted vertices distance tests for these partitionsdistance tests for computing furtheststatistics for matching ridgestotal lookups for matching ridges of new facetsaverage number of tests to match a ridgetotal lookups of subridges (duplicates and boundary)average number of tests per subridgeduplicated ridges in same merge cycleduplicated ridges with flipped facetsstatistics for determining mergesangles computed for ridge convexitybest merges used centrum instead of verticesdistance tests for best mergedistance tests for centrum convexitydistance tests for checking simplicial convexitycoplanar angles in getmergesetcoplanar centrums in getmergesetconcave ridges in getmergesetstatistics for mergingmerge iterationsave. initial non-convex ridges per iteration maximum ave. additional non-convex ridges per iteration maximum additional in one passinitial non-convex ridges for post merging additional non-convex ridgesmax distance of vertex or coplanar point above facet (w/roundoff)max distance of merged vertex below facet (or roundoff)centrums frozen due to a wide mergecentrums frozen due to extra verticestotal number of facets or cycles of facets mergedmerged a simplexsimplices merged into coplanar horizoncycles of facets merged into coplanar horizon ave. facets per cycle max. facetsnew facets merged into horizonnew facets mergedhorizon facets merged into new facetsvertices deleted by mergingvertices deleted by merging into coplanar horizonvertices deleted by degenerate facetmerges due to flipped facets in duplicated ridgemerges due to redundant neighborsnon-convex vertex neighborsmerges due to angle coplanar facets average merge distance maximum merge distancemerges due to coplanar facetsmerges due to concave facetscoplanar/concave merges due to avoiding old mergemerges due to degenerate facetsmerges due to removing flipped facetsmerges due to duplicated ridgesrenamed vertex statisticsrenamed vertices shared by two facetsrenamed vertices in a pinched facetrenamed vertices shared by multiple facetsrename failures due to duplicated ridges duplicate ridges detecteddeleted ridges due to renamed verticesdropped neighbors due to renamed verticesdegenerate facets due to dropped neighbors facets deleted because of no neighborsvertices removed from facets due to no ridges deletedvertex intersections for locating redundant verticesintersections failed to find a redundant vertexintersections found redundant vertices ave. number found per vertex max. found for a vertex ave. number of ridges per tested vertex max. number of ridges per tested vertexmemory usage statistics (in bytes)for facets and their normals, neighbor and vertex setsfor vertices and their neighbor setsfor input points and outside and coplanar setsfor ridges and their vertex setsVoronoi ridge statisticsnon-simplicial Voronoi vertices for all ridges ave. distance to ridge max. distance to ridgebounded ridges ave. distance of midpoint to ridge max. distance of midpoint to ridgebounded ridges with ok normal ave. angle to ridge max. angle to ridgebounded ridges with near-zero normalTriangulation statistics (Qt)non-simplicial facets triangulated ave. new facets created (may be deleted) max. new facets creatednull new facets deleted (duplicated vertex)mirrored pairs of new facets deleted (same vertices)degenerate new facets in output (same ridge)qhull error (qh_initstatistics): increase size of qhstat.id[]. qhstat.next %d should be <= sizeof(qhstat id) %d %s qhull invoked by: %s | %s %s with options: %s precision constants: %6.2g max. abs. coordinate in the (transformed) input ('Qbd:n') %6.2g max. roundoff error for distance computation ('En') %6.2g max. roundoff error for angle computations %6.2g min. distance for outside points ('Wn') %6.2g min. distance for visible facets ('Vn') %6.2g max. distance for coplanar facets ('Un') %6.2g max. facet width for recomputing centrum and area %6.2g max. distance for near-inside points %6.2g max. cosine for pre-merge angle %6.2g radius of pre-merge centrum %6.2g max. cosine for post-merge angle %6.2g radius of post-merge centrum %6.2g max. distance for merging two simplicial facets %6.2g max. roundoff error for arithmetic operations %6.2g min. denominator for divisions zero diagonal for Gauss: %6.2e %s *0 cnt*%7.2g%7d%7.3g %s ÿÿÿÿÿÿßÿÿÿÿÿÿïÿÿÿÿÿÿïÿÿÿÿÿÿÿß°<è»yÿÿ‹ÿ⍀Pé§yÿÿè¢yÿÿ‹ùÿ⍀ùPéŽyÿÿè‰yÿÿ‹äÿ⍀äPéuyÿÿèpyÿÿ‹Ïÿ⍀ÏPé\yÿÿèWyÿÿ‹ºÿ⍀ºPéCyÿÿè>yÿÿ‹¥ÿ⍀¥Pé*yÿÿè%yÿÿ‹ÿ⍀Péyÿÿè yÿÿ‹{ÿ⍀{Péøxÿÿèóxÿÿ‹fÿ⍀fPéßxÿÿèÚxÿÿ‹Qÿ⍀QPéÆxÿÿèÁxÿÿ‹<ÿ⍀<Pé­xÿÿM†f††˜†±†Ê†ã†ü†‡.‡G‡‹$Ë $Ë$í\0\\¢ ‡¡Ð[÷[è[€ú…¡Ð[Þ[Ì[ µ[Š[€õ…¡ Y’[¢ ‡¡ YŒ[}[€ï…¡ YY[¢ ‡¡ YS[¢ ‡¡ YE[¢ ‡¡ Y1[¢ ‡¡ Y[¢ ‡¡ Y[[€ë…¡ YöZ¢ ‡¡ YâZ¢ ‡¡ YÎZ¢ ‡¡ YÃZŽZ€å…¡ YZ¢ ‡¡ Y‰Z¢ ‡¡ Y€Z¢ ‡¡ YlZ¢ ‡¡ YXZ¢ ‡¡ YMZ>Z€å…¡ Y*Z¢ ‡¡ YZ¢ ‡¡ YZ¢ ‡¡ Y÷YèY€Ü…¡ YÑY¢ ‡¡ YËY¢ ‡¡ Y·Y¢ ‡¡ Y¥Y¢ ‡¡ YY¢ ‡¡ YYhYYY€Ø…¡ YEY¢ ‡¡ Y1Y¢ ‡¡ YY¢ ‡¡ YY îXÈX¢ ‡¡ÁT»X¬X€Õ…¡ÁTžXX€Î…¡ÁTlX€ˆ‡¡ÁTWX€ˆ‡¡ÁTJX;X€ …¡ÁT%X€ˆ‡¡ÁTX€8†¡ÁTÿW€ˆ‡¡ÁTùWêW€à„¡ÁTÔW€ˆ‡¡ÁTÃW€ˆ‡¡ÁTœW®W€ „¡ÁT›W€ˆ‡¡ÁT‰W€0†¡ÁT|W€ˆ‡¡ÁTvWgW€`„¡ÁTQW€ˆ‡¡ÁT@W€ˆ‡¡ÁT:W+W€ „¡ÁTW€ˆ‡¡ÁTW€0†¡ÁTùV€ˆ‡¡ÁTóVäV€àƒ¡ÁTÎV€ˆ‡¡ÁTœV€ˆ‡¡ÁT·VšV€@‚¡ÁT’V€ˆ‡¡ÁT|V€ˆ‡¡ÁTfV€ˆ‡¡ÁTSV€ˆ‡¡ÁT=V€ˆ‡¡ÁT'V€ˆ‡¡ÁTV€ˆ‡¡ÁT VüU€‚¡ÁTãU€ˆ‡¡ÁTÑU€ˆ‡¡ÁTÃU€€‡¡ÁT±U€ˆ‡¡ÁT¥U—U¢ ‡¡ÁTƒU¢ ‡¡ÁToU¢ ‡¡ÁTbU¢ ‡¡ÁTVUHU¢ ‡¡ÁT4U¢ ‡¡ÁT U¢ ‡¡ÁTU¢ ‡¡ÁTÿT€(†¡ÁTùT¢ ‡¡ÁTçT€(†¡ÁTáT¢ ‡¡ÁTËT€ˆ‡¡ÁTÃT€ˆ‡¡ÁTœT ­T¢TT‹TJT¢ ‡¡ÚSDT¢ ‡¡ÚS;T¢ ‡¡ÚS'T¢ ‡¡ÚSÿS¢ ‡¡ÚSùS¢ ‡¡ÚSðS¢ ‡¡ÚSÜS¢ ‡¡ÚSÖS S¢ ‡¡ôR‰S¢ ‡¡ôRSkS¢ ‡¡ôRMS¢ ‡¡ôRGS¢ ‡¡ôR6S¢ ‡¡ôRS¢ ‡¡ôRýR¢ ‡¡ôRðR ÉR¢ ‡¡Q­R¢ ‡¡Q§R¢ ‡¡Q“R¢ ‡¡Q~R¢ ‡¡Q^R¢ ‡¡QXR¢ ‡¡QDR¢ ‡¡QR€ †¡QR¢ ‡¡QR€†¡QÿQ¢ ‡¡QíQ€†¡QçQ¢ ‡¡Q×Q¢ ‡¡QÇQ¢ ‡¡Q·Q¢ ‡¡Q§Q¢ ‡¡Q¡Q•QˆQ€„‡¡Q~Q€€¡QnQ¢ ‡¡QTQ¢ ‡¡QNQIQDQ?Q:Q5Q0Q+Q&Q!QQ¢ ‡¡Q Q âP€ˆ‡¡JHÚP€ˆ‡¡JH­P¢ ‡¡JH§P¢ ‡¡JH˜P¢ ‡¡JH‡P¢ ‡¡JHrP¢ ‡¡JHlP¢ ‡¡JHcP=P¢ ‡¡JH7P¢ ‡¡JHöO€ˆ‡¡JHÐO¢ ‡¡JH²O¢ ‡¡JHŸO¢ ‡¡JH„O¢ ‡¡JH~O[O¢ ‡¡JHO¢ ‡¡JHçN¢ ‡¡JH×N¢ ‡¡JH¿N¢ ‡¡JHªN¢ ‡¡JH€N¢ ‡¡JHšN¢ ‡¡JH‘NÕMÇM¢ ‡¡JHÁM¢ ‡¡JH™M‹M¢ ‡¡JH…M¢ ‡¡JHKM€ˆ‡¡JH9M¢ ‡¡JH3M¢ ‡¡JHýL€ˆ‡¡JH÷L¢ ‡¡JHñL¢ ‡¡JHâL¢ ‡¡JHÑL¢ ‡¡JHŒL¢ ‡¡JH¶L¢ ‡¡JH£L¢ ‡¡JH”L¢ ‡¡JHL€ˆ‡¡JH^L¢ ‡¡JHML¢ ‡¡JH L¢ ‡¡JHL¢ ‡¡JH L¢ ‡¡JHúK¢ ‡¡JHåK¢ ‡¡JHßK¢ ‡¡JHÐK¢ ‡¡JH¿K¢ ‡¡JHªK¢ ‡¡JH€K¢ ‡¡JH—K¢ ‡¡JHŽK}KlKNK€ˆ‡¡JHK€ˆ‡¡JHïJ€ˆ‡¡JHŒJ€ˆ‡¡JH®J€ˆ‡¡JHzJ€ˆ‡¡JHbJ€ˆ‡¡JH\J¢ ‡¡JHG¢ ‡¡|A2G€À€¡|A,G¢ ‡¡|AG¢ ‡¡|AG¢ ‡¡|AûF¢ ‡¡|AìF¢ ‡¡|AàF€‹€¡|AÚF¢ ‡¡|AŒF¢ ‡¡|A¶F¢ ‡¡|A©F¢ ‡¡|AšF¢ ‡¡|AŽF€`€¡|AˆF¢ ‡¡|AjF¢ ‡¡|AdF¢ ‡¡|AWF¢ ‡¡|AHF¢ ‡¡|A¢ ‡¡h9Ü>¢ ‡¡h9Ï>¢ ‡¡h9À>¢ ‡¡h9Ž>€ |¡h9®>¢ ‡¡h9>¢ ‡¡h9Š>¢ ‡¡h9}>¢ ‡¡h9n>¢ ‡¡h9b>€€|¡h9\>¢ ‡¡h9>>¢ ‡¡h98>¢ ‡¡h9+>¢ ‡¡h9>¢ ‡¡h9>€@|¡h9 >¢ ‡¡h9ì=¢ ‡¡h9æ=¢ ‡¡h9Ù=¢ ‡¡h9Ê=¢ ‡¡h9Ÿ=€|¡h9ž=¢ ‡¡h9š=¢ ‡¡h9”=¢ ‡¡h9‡=¢ ‡¡h9x=¢ ‡¡h9l=€À{¡h9f=¢ ‡¡h9H=¢ ‡¡h9B=¢ ‡¡h95=¢ ‡¡h9&=¢ ‡¡h9=€®{¡h9=¢ ‡¡h9ö<¢ ‡¡h9ð<¢ ‡¡h9ã<¢ ‡¡h9Ô<¢ ‡¡h9È<€€{¡h9Â<¢ ‡¡h9€<¢ ‡¡h9ž<¢ ‡¡h9‘<¢ ‡¡h9‚<¢ ‡¡h9v<€@{¡h9p<¢ ‡¡h9R<¢ ‡¡h9L<¢ ‡¡h9?<¢ ‡¡h90<¢ ‡¡h9$<€{¡h9<¢ ‡¡h9<¢ ‡¡h9ú;¢ ‡¡h9í;¢ ‡¡h9Þ;¢ ‡¡h9Ò;€Àz¡h9Ì;¢ ‡¡h9®;¢ ‡¡h9š;¢ ‡¡h9›;¢ ‡¡h9Œ;¢ ‡¡h9€;€€z¡h9z;¢ ‡¡h9\;¢ ‡¡h9V;¢ ‡¡h9I;¢ ‡¡h9:;¢ ‡¡h9.;€Iz¡h9(;¢ ‡¡h9 ;¢ ‡¡h9;¢ ‡¡h9÷:¢ ‡¡h9è:¢ ‡¡h9Ü:€ z¡h9Ö:¢ ‡¡h9ž:¢ ‡¡h9²:¢ ‡¡h9¥:¢ ‡¡h9–:¢ ‡¡h9Š:€ày¡h9„:¢ ‡¡h9f:¢ ‡¡h9`:¢ ‡¡h9S:¢ ‡¡h9D:¢ ‡¡h98:€ y¡h92:¢ ‡¡h9:¢ ‡¡h9:¢ ‡¡h9:¢ ‡¡h9ò9¢ ‡¡h9æ9€`y¡h9à9¢ ‡¡h9Â9¢ ‡¡h9Œ9¢ ‡¡h9¯9¢ ‡¡h9 9¢ ‡¡h9”9€@y¡h9Ž9¢ ‡¡h9p9¢ ‡¡h9j9¢ ‡¡h9d9 K9¢ ‡¡œ2<9¢ ‡¡œ209€x¡œ2*9¢ ‡¡œ2 9¢ ‡¡œ29¢ ‡¡œ2ù8¢ ‡¡œ2ê8¢ ‡¡œ2Þ8€x¡œ2Ø8¢ ‡¡œ2º8¢ ‡¡œ2Ž8¢ ‡¡œ2§8¢ ‡¡œ2˜8¢ ‡¡œ2Œ8€ y¡œ2†8¢ ‡¡œ2h8¢ ‡¡œ2b8¢ ‡¡œ2U8¢ ‡¡œ2F8¢ ‡¡œ2:8€x¡œ248¢ ‡¡œ28¢ ‡¡œ28¢ ‡¡œ28¢ ‡¡œ2ô7¢ ‡¡œ2è7€x¡œ2â7¢ ‡¡œ2Ä7¢ ‡¡œ2Ÿ7¢ ‡¡œ2±7¢ ‡¡œ2¢7¢ ‡¡œ2–7€àx¡œ27¢ ‡¡œ2r7¢ ‡¡œ2l7¢ ‡¡œ2_7¢ ‡¡œ2P7¢ ‡¡œ2D7€x¡œ2>7¢ ‡¡œ2 7¢ ‡¡œ27¢ ‡¡œ2 7¢ ‡¡œ2þ6¢ ‡¡œ2ò6€x¡œ2ì6¢ ‡¡œ2Î6¢ ‡¡œ2È6¢ ‡¡œ2»6¢ ‡¡œ2¬6¢ ‡¡œ2 6€Àx¡œ2š6¢ ‡¡œ2|6¢ ‡¡œ2v6¢ ‡¡œ2i6¢ ‡¡œ2Z6¢ ‡¡œ2N6€x¡œ2H6¢ ‡¡œ2*6¢ ‡¡œ2$6¢ ‡¡œ26¢ ‡¡œ26¢ ‡¡œ2ü5€x¡œ2ö5¢ ‡¡œ2Ø5¢ ‡¡œ2Ò5¢ ‡¡œ2Å5¢ ‡¡œ2¶5¢ ‡¡œ2ª5€€x¡œ2€5¢ ‡¡œ2†5¢ ‡¡œ2€5¢ ‡¡œ2s5¢ ‡¡œ2d5¢ ‡¡œ2X5€x¡œ2R5¢ ‡¡œ245¢ ‡¡œ2.5¢ ‡¡œ2!5¢ ‡¡œ25¢ ‡¡œ25€x¡œ25¢ ‡¡œ2â4¢ ‡¡œ2Ü4¢ ‡¡œ2Ï4¢ ‡¡œ2À4¢ ‡¡œ2Ž4€Tx¡œ2®4¢ ‡¡œ24¢ ‡¡œ2Š4¢ ‡¡œ2}4¢ ‡¡œ2n4¢ ‡¡œ2b4€x¡œ2\4¢ ‡¡œ2>4¢ ‡¡œ284¢ ‡¡œ2+4¢ ‡¡œ24¢ ‡¡œ24€x¡œ2 4¢ ‡¡œ2ì3¢ ‡¡œ2æ3¢ ‡¡œ2Ù3¢ ‡¡œ2Ê3¢ ‡¡œ2Ÿ3€6x¡œ2ž3¢ ‡¡œ2š3¢ ‡¡œ2”3¢ ‡¡œ2‡3¢ ‡¡œ2x3¢ ‡¡œ2l3€x¡œ2f3¢ ‡¡œ2H3¢ ‡¡œ2B3¢ ‡¡œ253¢ ‡¡œ2&3¢ ‡¡œ23€x¡œ23¢ ‡¡œ2ö2¢ ‡¡œ2ð2¢ ‡¡œ2ã2¢ ‡¡œ2Ô2¢ ‡¡œ2È2€àw¡œ2Â2¢ ‡¡œ2€2¢ ‡¡œ2ž2¢ ‡¡œ2˜2 2¢ ‡¡ä)p2¢ ‡¡ä)d2€Âw¡ä)^2¢ ‡¡ä)@2¢ ‡¡ä):2¢ ‡¡ä)-2¢ ‡¡ä)2¢ ‡¡ä)2€ w¡ä) 2¢ ‡¡ä)î1¢ ‡¡ä)è1¢ ‡¡ä)Û1¢ ‡¡ä)Ì1¢ ‡¡ä)À1€`w¡ä)º1¢ ‡¡ä)œ1¢ ‡¡ä)–1¢ ‡¡ä)‰1¢ ‡¡ä)z1¢ ‡¡ä)n1€ w¡ä)h1¢ ‡¡ä)J1¢ ‡¡ä)D1¢ ‡¡ä)71¢ ‡¡ä)(1¢ ‡¡ä)1€àv¡ä)1¢ ‡¡ä)ø0¢ ‡¡ä)ò0¢ ‡¡ä)å0¢ ‡¡ä)Ö0¢ ‡¡ä)Ê0€Šv¡ä)Ä0¢ ‡¡ä)Š0¢ ‡¡ä) 0¢ ‡¡ä)“0¢ ‡¡ä)„0¢ ‡¡ä)x0€€v¡ä)r0¢ ‡¡ä)T0¢ ‡¡ä)N0¢ ‡¡ä)A0¢ ‡¡ä)20¢ ‡¡ä)&0€_v¡ä) 0¢ ‡¡ä)0¢ ‡¡ä)ü/¢ ‡¡ä)ï/¢ ‡¡ä)à/¢ ‡¡ä)Ô/€@v¡ä)Î/¢ ‡¡ä)°/¢ ‡¡ä)ª/¢ ‡¡ä)/¢ ‡¡ä)Ž/¢ ‡¡ä)‚/€&v¡ä)|/¢ ‡¡ä)^/¢ ‡¡ä)X/¢ ‡¡ä)K/¢ ‡¡ä)-¢ ‡¡ä) -¢ ‡¡ä)-¢ ‡¡ä) -¢ ‡¡ä)þ,¢ ‡¡ä)ò,€€t¡ä)ì,¢ ‡¡ä)Î,¢ ‡¡ä)È,¢ ‡¡ä)»,¢ ‡¡ä)¬,¢ ‡¡ä) ,€ t¡ä)š,¢ ‡¡ä)|,¢ ‡¡ä)v,¢ ‡¡ä)i,¢ ‡¡ä)Z,¢ ‡¡ä)N,€t¡ä)H,¢ ‡¡ä)*,¢ ‡¡ä)$,¢ ‡¡ä),¢ ‡¡ä),¢ ‡¡ä)ü+€Às¡ä)ö+¢ ‡¡ä)Ø+¢ ‡¡ä)Ò+¢ ‡¡ä)Å+¢ ‡¡ä)¶+¢ ‡¡ä)ª+€€s¡ä)€+¢ ‡¡ä)†+¢ ‡¡ä)€+¢ ‡¡ä)s+¢ ‡¡ä)d+¢ ‡¡ä)X+€@s¡ä)R+¢ ‡¡ä)4+¢ ‡¡ä).+¢ ‡¡ä)!+¢ ‡¡ä)+¢ ‡¡ä)+€-s¡ä)+¢ ‡¡ä)â*¢ ‡¡ä)Ü*¢ ‡¡ä)Ï*¢ ‡¡ä)À*¢ ‡¡ä)Ž*€s¡ä)®*¢ ‡¡ä)*¢ ‡¡ä)Š*¢ ‡¡ä)}*¢ ‡¡ä)n*¢ ‡¡ä)b*€Ör¡ä)\*¢ ‡¡ä)>*¢ ‡¡ä)8*¢ ‡¡ä)+*¢ ‡¡ä)*¢ ‡¡ä)*€¿r¡ä) *¢ ‡¡ä)ì)¢ ‡¡ä)æ)¢ ‡¡ä)à) Å)¢ ‡¡°$¶)¢ ‡¡°$ª)€¡r¡°$€)¢ ‡¡°$†)¢ ‡¡°$€)¢ ‡¡°$s)¢ ‡¡°$d)¢ ‡¡°$X)€€r¡°$R)¢ ‡¡°$4)¢ ‡¡°$.)¢ ‡¡°$!)¢ ‡¡°$)¢ ‡¡°$)€`r¡°$)¢ ‡¡°$â(¢ ‡¡°$Ü(¢ ‡¡°$Ï(¢ ‡¡°$À(¢ ‡¡°$Ž(€ r¡°$®(¢ ‡¡°$(¢ ‡¡°$Š(¢ ‡¡°$}(¢ ‡¡°$n(¢ ‡¡°$b(€àq¡°$\(¢ ‡¡°$>(¢ ‡¡°$8(¢ ‡¡°$+(¢ ‡¡°$(¢ ‡¡°$(€­q¡°$ (¢ ‡¡°$ì'¢ ‡¡°$æ'¢ ‡¡°$Ù'¢ ‡¡°$Ê'¢ ‡¡°$Ÿ'€€q¡°$ž'¢ ‡¡°$š'¢ ‡¡°$”'¢ ‡¡°$‡'¢ ‡¡°$x'¢ ‡¡°$l'€@q¡°$f'¢ ‡¡°$H'¢ ‡¡°$B'¢ ‡¡°$5'¢ ‡¡°$&'¢ ‡¡°$'€q¡°$'¢ ‡¡°$ö&¢ ‡¡°$ð&¢ ‡¡°$ã&¢ ‡¡°$Ô&¢ ‡¡°$È&€Àp¡°$Â&¢ ‡¡°$€&¢ ‡¡°$ž&¢ ‡¡°$‘&¢ ‡¡°$‚&¢ ‡¡°$v&€€p¡°$p&¢ ‡¡°$R&¢ ‡¡°$L&¢ ‡¡°$?&¢ ‡¡°$0&¢ ‡¡°$$&€@p¡°$&¢ ‡¡°$&¢ ‡¡°$ú%¢ ‡¡°$í%¢ ‡¡°$Þ%¢ ‡¡°$Ò%€p¡°$Ì%¢ ‡¡°$®%¢ ‡¡°$š%¢ ‡¡°$›%¢ ‡¡°$Œ%¢ ‡¡°$€%€Ào¡°$z%¢ ‡¡°$\%¢ ‡¡°$V%¢ ‡¡°$I%¢ ‡¡°$:%¢ ‡¡°$.%€€o¡°$(%¢ ‡¡°$ %¢ ‡¡°$%¢ ‡¡°$÷$¢ ‡¡°$è$¢ ‡¡°$Ü$€`o¡°$Ö$¢ ‡¡°$ž$¢ ‡¡°$²$¢ ‡¡°$¬$ ‘$¢ ‡¡Ø‚$¢ ‡¡Øv$€ o¡Øp$¢ ‡¡ØR$¢ ‡¡ØL$¢ ‡¡Ø?$¢ ‡¡Ø0$¢ ‡¡Ø$$€àn¡Ø$¢ ‡¡Ø$¢ ‡¡Øú#¢ ‡¡Øí#¢ ‡¡ØÞ#¢ ‡¡ØÒ#€ n¡ØÌ#¢ ‡¡Ø®#¢ ‡¡Øš#¢ ‡¡Ø›#¢ ‡¡ØŒ#¢ ‡¡Ø€#€€n¡Øz#¢ ‡¡Ø\#¢ ‡¡ØV#¢ ‡¡ØI#¢ ‡¡Ø:#¢ ‡¡Ø.#€an¡Ø(#¢ ‡¡Ø #¢ ‡¡Ø#¢ ‡¡Ø÷"¢ ‡¡Øè"¢ ‡¡ØÜ"€Gn¡ØÖ"¢ ‡¡Øž"¢ ‡¡Ø²"¢ ‡¡Ø¥"¢ ‡¡Ø–"¢ ‡¡ØŠ"€ n¡Ø„"¢ ‡¡Øf"¢ ‡¡Ø`"¢ ‡¡ØS"¢ ‡¡ØD"¢ ‡¡Ø8"€àm¡Ø2"¢ ‡¡Ø"¢ ‡¡Ø"¢ ‡¡Ø"¢ ‡¡Øò!¢ ‡¡Øæ!€ m¡Øà!¢ ‡¡ØÂ!¢ ‡¡ØŒ!¢ ‡¡Ø¯!¢ ‡¡Ø !¢ ‡¡Ø”!€€m¡ØŽ!¢ ‡¡Øp!¢ ‡¡Øj!¢ ‡¡Ø]!¢ ‡¡ØN!¢ ‡¡ØB!€em¡Ø¢ ‡¡°8¢ ‡¡°+¢ ‡¡°¢ ‡¡°€Ðj¡° ¢ ‡¡°ì¢ ‡¡°æ¢ ‡¡°Ù¢ ‡¡°Ê¢ ‡¡°Ÿ€‘j¡°ž¢ ‡¡°š¢ ‡¡°”¢ ‡¡°‡¢ ‡¡°x¢ ‡¡°l€}j¡°f¢ ‡¡°H¢ ‡¡°B¢ ‡¡°5¢ ‡¡°&¢ ‡¡°€»j¡°¢ ‡¡°ö¢ ‡¡°ð¢ ‡¡°ã¢ ‡¡°Ô¢ ‡¡°È€¥j¡°Â¢ ‡¡°€¢ ‡¡°ž¢ ‡¡°‘¢ ‡¡°‚¢ ‡¡°v€‘j¡°p¢ ‡¡°R¢ ‡¡°L¢ ‡¡°?¢ ‡¡°0¢ ‡¡°$€}j¡°¢ ‡¡°¢ ‡¡°ú¢ ‡¡°í¢ ‡¡°Þ¢ ‡¡°Ò€kj¡°Ì¢ ‡¡°®¢ ‡¡°š¢ ‡¡°›¢ ‡¡°Œ¢ ‡¡°€€@j¡°z¢ ‡¡°\¢ ‡¡°V¢ ‡¡°I¢ ‡¡°:¢ ‡¡°.€j¡°(¢ ‡¡° ¢ ‡¡°¢ ‡¡°÷¢ ‡¡°è¢ ‡¡°Ü€ài¡°Ö¢ ‡¡°ž¢ ‡¡°²¢ ‡¡°¬ ‘¢ ‡¡‚¢ ‡¡v€Ài¡p¢ ‡¡R¢ ‡¡L¢ ‡¡?¢ ‡¡0¢ ‡¡$€€i¡¢ ‡¡¢ ‡¡ú¢ ‡¡í¢ ‡¡Þ¢ ‡¡Ò€@i¡Ì¢ ‡¡®¢ ‡¡š¢ ‡¡›¢ ‡¡Œ¢ ‡¡€€i¡z¢ ‡¡\¢ ‡¡V¢ ‡¡I¢ ‡¡:¢ ‡¡.€Ðh¡(¢ ‡¡ ¢ ‡¡¢ ‡¡÷¢ ‡¡è¢ ‡¡Ü€ h¡Ö¢ ‡¡ž¢ ‡¡²¢ ‡¡¥¢ ‡¡–¢ ‡¡Š€`h¡„¢ ‡¡f¢ ‡¡`¢ ‡¡S¢ ‡¡D¢ ‡¡8€ h¡2¢ ‡¡¢ ‡¡¢ ‡¡¢ ‡¡ò¢ ‡¡æ€àg¡à¢ ‡¡Â¢ ‡¡Œ¢ ‡¡¯¢ ‡¡ ¢ ‡¡”€ g¡Ž¢ ‡¡p¢ ‡¡j¢ ‡¡]¢ ‡¡N¢ ‡¡B€`g¡<¢ ‡¡¢ ‡¡¢ ‡¡ ¢ ‡¡ü¢ ‡¡ð€0g¡ê¢ ‡¡Ì¢ ‡¡Æ¢ ‡¡¹¢ ‡¡ª¢ ‡¡ž€g¡˜¢ ‡¡z¢ ‡¡t¢ ‡¡g¢ ‡¡X¢ ‡¡L€g¡F¢ ‡¡(¢ ‡¡"¢ ‡¡¢ ‡¡¢ ‡¡ú€g¡ô¢ ‡¡Ö¢ ‡¡Ð¢ ‡¡Ã¢ ‡¡Ž¢ ‡¡š€çf¡¢¢ ‡¡„¢ ‡¡~¢ ‡¡q¢ ‡¡b¢ ‡¡V€Àf¡P¢ ‡¡2¢ ‡¡,¢ ‡¡¢ ‡¡¢ ‡¡€€f¡þ¢ ‡¡à¢ ‡¡Ú¢ ‡¡Í¢ ‡¡Ÿ¢ ‡¡²€@f¡¬¢ ‡¡Ž¢ ‡¡ˆ¢ ‡¡{¢ ‡¡l¢ ‡¡`€äe¡Z¢ ‡¡<¢ ‡¡6¢ ‡¡)¢ ‡¡¢ ‡¡€f¡¢ ‡¡ê¢ ‡¡ä¢ ‡¡×¢ ‡¡È¢ ‡¡Œ€äe¡¶¢ ‡¡˜¢ ‡¡’¢ ‡¡…¢ ‡¡v¢ ‡¡j€Àe¡d¢ ‡¡F¢ ‡¡@¢ ‡¡3¢ ‡¡$¢ ‡¡€€e¡¢ ‡¡ô¢ ‡¡î¢ ‡¡á¢ ‡¡Ò¢ ‡¡Æ€@e¡À¢ ‡¡¢¢ ‡¡œ¢ ‡¡¢ ‡¡€¢ ‡¡t€e¡n¢ ‡¡P¢ ‡¡J¢ ‡¡=¢ ‡¡.¢ ‡¡"€e¡¢ ‡¡þ¢ ‡¡ø¢ ‡¡ë¢ ‡¡Ü¢ ‡¡Ð€àd¡Ê¢ ‡¡¬¢ ‡¡Š¢ ‡¡™¢ ‡¡Š¢ ‡¡~€Îd¡x¢ ‡¡Z¢ ‡¡T¢ ‡¡G¢ ‡¡8¢ ‡¡,€žd¡&¢ ‡¡¢ ‡¡¢ ‡¡ü 㢠‡¡øÔ¢ ‡¡øÈ€£d¡ø¢ ‡¡ø€¢ ‡¡øž¢ ‡¡ø‘¢ ‡¡ø‚¢ ‡¡øv€Žd¡øp¢ ‡¡øR¢ ‡¡øL¢ ‡¡ø?¢ ‡¡ø0¢ ‡¡ø$€yd¡ø¢ ‡¡ø¢ ‡¡øú ¢ ‡¡øí ¢ ‡¡øÞ ¢ ‡¡øÒ €@d¡øÌ ¢ ‡¡ø® ¢ ‡¡øš ¢ ‡¡ø› ¢ ‡¡øŒ ¢ ‡¡ø€ €d¡øz ¢ ‡¡ø\ ¢ ‡¡øV ¢ ‡¡øI ¢ ‡¡ø: ¢ ‡¡ø. €Àc¡ø( ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡ø÷ ¢ ‡¡øè ¢ ‡¡øØ ¢ ‡¡øº ¢ ‡¡øŽ ¢ ‡¡ø§ ¢ ‡¡ø˜ ¢ ‡¡øŒ €€c¡ø† ¢ ‡¡øh ¢ ‡¡øb ¢ ‡¡øU ¢ ‡¡øF ¢ ‡¡ø: €@c¡ø4 ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡øô ¢ ‡¡øè €c¡øâ ¢ ‡¡øÄ ¢ ‡¡øŸ ¢ ‡¡ø± ¢ ‡¡ø¢ ¢ ‡¡ø– €øb¡ø ¢ ‡¡ør ¢ ‡¡øl ¢ ‡¡ø_ ¢ ‡¡øP ¢ ‡¡øD €Þb¡ø> ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡øþ ¢ ‡¡øò €Âb¡øì ¢ ‡¡øÎ ¢ ‡¡øÈ ¢ ‡¡ø» ¢ ‡¡ø¬ ¢ ‡¡ø  € b¡øš ¢ ‡¡ø| ¢ ‡¡øv ¢ ‡¡øi ¢ ‡¡øZ ¢ ‡¡øN €æa¡øH ¢ ‡¡ø* ¢ ‡¡ø$ ¢ ‡¡ø ¢ ‡¡ø ¢ ‡¡øü €`b¡øö ¢ ‡¡øØ ¢ ‡¡øÒ ¢ ‡¡øÅ ¢ ‡¡ø¶ ¢ ‡¡øª €Eb¡ø€ ¢ ‡¡ø† ¢ ‡¡ø€ ¢ ‡¡øs ¢ ‡¡ød ¢ ‡¡øX € b¡øR ¢ ‡¡ø4 ¢ ‡¡ø. ¢ ‡¡ø! ¢ ‡¡ø ¢ ‡¡ø €æa¡ø ¢ ‡¡ø⢠‡¡øÜ¢ ‡¡øÏ¢ ‡¡øÀ¢ ‡¡øŽ€Àa¡ø®¢ ‡¡ø¢ ‡¡øŠ¢ ‡¡ø}¢ ‡¡øn¢ ‡¡øb€£a¡ø\¢ ‡¡ø>¢ ‡¡ø8¢ ‡¡ø+¢ ‡¡ø¢ ‡¡ø€€a¡ø ¢ ‡¡ø좠‡¡ø梠‡¡øÙ¢ ‡¡øÊ¢ ‡¡øŸ€Ma¡øž¢ ‡¡øš¢ ‡¡ø”¢ ‡¡ø‡¢ ‡¡øx¢ ‡¡øl€ a¡øf¢ ‡¡øH¢ ‡¡øB¢ ‡¡ø5¢ ‡¡ø&¢ ‡¡ø€à`¡ø¢ ‡¡øö¢ ‡¡ø𢠇¡ø㢠‡¡øÔ¢ ‡¡øÈ€°`¡ø¢ ‡¡ø€¢ ‡¡øž¢ ‡¡ø‘¢ ‡¡ø‚¢ ‡¡øv€“`¡øp¢ ‡¡øR¢ ‡¡øL¢ ‡¡ø?¢ ‡¡ø0¢ ‡¡ø$€`¡ø¢ ‡¡ø¢ ‡¡øú¢ ‡¡øô Û¢ ‡¡ Ì¢ ‡¡ À€``¡ º¢ ‡¡ œ¢ ‡¡ –¢ ‡¡ ‰¢ ‡¡ z¢ ‡¡ n€ `¡ h¢ ‡¡ J¢ ‡¡ D¢ ‡¡ 7¢ ‡¡ (¢ ‡¡ €à_¡ ¢ ‡¡ ø¢ ‡¡ ò¢ ‡¡ 墠‡¡ Ö¢ ‡¡ Ê€ _¡ Ä¢ ‡¡ Š¢ ‡¡  ¢ ‡¡ “¢ ‡¡ „¢ ‡¡ x€`_¡ r¢ ‡¡ T¢ ‡¡ N¢ ‡¡ A¢ ‡¡ 2¢ ‡¡ &€ _¡ ¢ ‡¡ ¢ ‡¡ ü¢ ‡¡ ‡¡ ࢠ‡¡ Ô€à^¡ ΢ ‡¡ °¢ ‡¡ ª¢ ‡¡ ¢ ‡¡ Ž¢ ‡¡ ‚€œ^¡ |¢ ‡¡ ^¢ ‡¡ X¢ ‡¡ K¢ ‡¡ <¢ ‡¡ 0€Ÿ^¡ *¢ ‡¡ ¢ ‡¡ ¢ ‡¡ ù¢ ‡¡ ꢠ‡¡ Þ€€^¡ Ø¢ ‡¡ º¢ ‡¡ Ž¢ ‡¡ §¢ ‡¡ ˜¢ ‡¡ Œ€@^¡ †¢ ‡¡ h¢ ‡¡ b¢ ‡¡ P¢ ‡¡ J¢ ‡¡ =¢ ‡¡ .¢ ‡¡ "€^¡ ¢ ‡¡ þ¢ ‡¡ ø¢ ‡¡ 뢠‡¡ Ü¢ ‡¡ ЀÀ]¡ Ê¢ ‡¡ ¬¢ ‡¡ Š¢ ‡¡ ™¢ ‡¡ Š¢ ‡¡ ~€€]¡ x¢ ‡¡ Z¢ ‡¡ T¢ ‡¡ G¢ ‡¡ 8¢ ‡¡ ,€@]¡ &¢ ‡¡ ¢ ‡¡ ¢ ‡¡ õ¢ ‡¡ 梠‡¡ Ú€]¡ Ô¢ ‡¡ ¶¢ ‡¡ °¢ ‡¡ £¢ ‡¡ ”¢ ‡¡ „¢ ‡¡ f¢ ‡¡ `¢ ‡¡ S¢ ‡¡ D¢ ‡¡ 8€à\¡ 2¢ ‡¡ ¢ ‡¡ ¢ ‡¡  # €{‡¡?‡€{‡¡?‡û ö# ð€w‡¡&‡è€w‡¡&‡â Ý# ×€s‡¡ ‡Ï€s‡¡ ‡É Ä# Ÿ€o‡¡ô†¶€o‡¡ô†° «# ¥€k‡¡Û†€k‡¡Û†— ’# Œ€g‡¡Â†„€g‡¡Â†~ y# s€c‡¡©†k€c‡¡©†e `# Z€_‡¡†R€_‡¡†L G# A€[‡¡w†9€[‡¡w†3 .# (€W‡¡^† €W‡¡^† # €S‡¡E†€S‡¡E† ($  "" !‚ €Œ‡ €”‡¹ €‡1ì>ôK€XÌe€$sØ)€2\9špA§HÑ