1# BEGIN ARRANGEMENT 2# number_of_vertices 333 4# number_of_edges 540 6# number_of_faces 710 8# BEGIN VERTICES 90 2 0 100 3 0 111 2 0 121 3 0 134 4 1 Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[-15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 , -126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 144 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4) 154 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4) 164 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 174 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4) 184 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4) 194 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4) 204 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4),--,--,--,4) 214 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4) 224 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5),--,--,--,4) 234 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6),--,--,--,4) 244 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 254 4 1 Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 264 4 1 Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4) 274 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 304 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4) 314 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4) 324 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4) 334 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4),--,--,--,4) 344 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5),--,--,--,4) 354 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6),--,--,--,4) 364 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],7),--,--,--,4) 374 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 384 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4) 394 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4) 404 4 1 Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4) 414 4 1 Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 , 15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4) 42# END VERTICES 43# BEGIN EDGES 440 1 0 0 451 3 0 0 463 2 1 0 472 0 1 0 485 4 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[-15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 , -126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0,0,1,0,1) 496 4 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[-15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 , -126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1,0,2,0,1) 508 7 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 , -21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1,0,1,0,1) 5817 8 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3,2,1,0,1) 6017 10 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4),--,--,--,4),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5,4,1,0,1) 6217 13 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6),--,--,--,4),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],7,6,1,0,1) 6418 17 0 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[-8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 , -16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],7),--,--,--,4),Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],9,7,2,0,1) 6620 16 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0,0,0,0,1) 6717 20 0 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1,1,0,0,1) 6821 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2,1,1,0,1) 6922 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3,1,2,0,1) 7023 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4,1,3,0,1) 7124 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5,1,4,0,1) 7225 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6,1,5,0,1) 7326 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],7,1,6,0,1) 7427 17 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[1(1,1)],[0/1 , 0/1 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 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Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1,2,0,0,1) 7829 23 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2,3,1,0,1) 7930 24 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3,4,2,0,1) 8031 25 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],4,5,3,0,1) 8126 31 0 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[16319450268673956180278393125834385245884768464606339563614859364061454447284579849607923899958879162390965655337781425898124276149232001876486311535260613/107262463439540776796592199985646769019834926564739147021788491549774112240588375814414994385335227421520254865491888406830031062495572559571469192048672768 , 8159725134336978090139196562917192622942384232303169781807429682030727223642289924803961949979439581195482827668890712949062138074616000938243155767630307/53631231719770388398296099992823384509917463282369573510894245774887056120294187907207497192667613710760127432745944203415015531247786279785734596024336384 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],6),--,--,--,4),Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],3),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],5,6,3,0,1) 8232 29 1 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1),--,--,--,4),Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 , 15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0,1,0,0,1) 8330 32 0 1 Arc_2(Point_2( Algebraic_real_xca_2([P[32(0,1)(8,-3482624)(16,-875495424)(24,4143972352)(32,4294967296)],[21667172327500109717451155872545794825858932913849615821594072775214039838430738091107546295177662299997920265791425214484580057263408597186313697857739347/26815615859885194199148049996411692254958731641184786755447122887443528060147093953603748596333806855380063716372972101707507765623893139892867298012168192 , 5416793081875027429362788968136448706464733228462403955398518193803509959607684522776886573794415574999480066447856303621145014315852149296578424464434837/6703903964971298549787012499102923063739682910296196688861780721860882015036773488400937149083451713845015929093243025426876941405973284973216824503042048 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],2),--,--,--,4),Point_2( Algebraic_real_xca_2([P[8(0,-2)(8,1)],[126272168694758868278933438138020839839901170985755611934556561933143625952871/115792089237316195423570985008687907853269984665640564039457584007913129639936 , 15784021086844858534866679767252604979987646373219451491819570241642953244109/14474011154664524427946373126085988481658748083205070504932198000989141204992 ]],P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],0),--,--,--,4),P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])],1,2,0,0,1) 84# END EDGES 85# BEGIN FACES 86# BEGIN FACE 871 0 88# number_of_outer_ccbs 890 90# number_of_inner_ccbs 911 92# halfedges_on_inner_ccb 934 940 2 4 6 95# number_of_isolated_vertices 960 97# END FACE 98# BEGIN FACE 991 1 100# number_of_outer_ccbs 1011 102# halfedges_on_outer_ccb 1034 1041 7 5 3 105# number_of_inner_ccbs 1061 107# halfedges_on_inner_ccb 10836 10938 41 43 62 60 59 74 72 56 55 71 78 76 68 52 51 66 64 48 46 44 24 27 28 12 15 30 32 16 8 11 19 34 36 20 23 110# number_of_isolated_vertices 1110 112# END FACE 113# BEGIN FACE 1140 1 115# number_of_outer_ccbs 1161 117# halfedges_on_outer_ccb 1184 11931 14 13 29 120# number_of_inner_ccbs 1210 122# number_of_isolated_vertices 1230 124# END FACE 125# BEGIN FACE 1260 1 127# number_of_outer_ccbs 1281 129# halfedges_on_outer_ccb 1306 13135 18 10 9 17 33 132# number_of_inner_ccbs 1330 134# number_of_isolated_vertices 1350 136# END FACE 137# BEGIN FACE 1380 1 139# number_of_outer_ccbs 1401 141# halfedges_on_outer_ccb 1424 14339 22 21 37 144# number_of_inner_ccbs 1450 146# number_of_isolated_vertices 1470 148# END FACE 149# BEGIN FACE 1500 1 151# number_of_outer_ccbs 1521 153# halfedges_on_outer_ccb 1544 15547 26 25 45 156# number_of_inner_ccbs 1570 158# number_of_isolated_vertices 1590 160# END FACE 161# BEGIN FACE 1620 1 163# number_of_outer_ccbs 1641 165# halfedges_on_outer_ccb 1664 16763 42 40 61 168# number_of_inner_ccbs 1690 170# number_of_isolated_vertices 1710 172# END FACE 173# BEGIN FACE 1740 1 175# number_of_outer_ccbs 1761 177# halfedges_on_outer_ccb 1784 17967 50 49 65 180# number_of_inner_ccbs 1810 182# number_of_isolated_vertices 1830 184# END FACE 185# BEGIN FACE 1860 1 187# number_of_outer_ccbs 1881 189# halfedges_on_outer_ccb 1904 19175 58 57 73 192# number_of_inner_ccbs 1930 194# number_of_isolated_vertices 1950 196# END FACE 197# BEGIN FACE 1980 1 199# number_of_outer_ccbs 2001 201# halfedges_on_outer_ccb 2026 20379 70 54 53 69 77 204# number_of_inner_ccbs 2050 206# number_of_isolated_vertices 2070 208# END FACE 209# END FACES 210# END ARRANGEMENT 211# BEGIN CURVES 212# number_of_curves 2131 214P[16(0,P[16(8,-2)(16,1)])(2,P[14(6,56)(14,8)])(4,P[12(4,-140)(12,28)])(6,P[10(2,56)(10,56)])(8,P[8(0,-2)(8,70)])(10,P[6(6,56)])(12,P[4(4,28)])(14,P[2(2,8)])(16,P[0(0,1)])] 215# induced_edges 21636 21739 31 29 49 11 43 15 45 23 33 13 59 61 21 51 47 69 71 57 63 65 67 73 75 77 79 53 55 17 35 25 27 19 41 9 37 218# END CURVES 219 220