#NEXUS
[written Thu Jul 14 00:04:02 SGT 2016 by Mesquite  version 3.03 (build 702) at MesemiteAir.local/10.0.1.8 (William Piel)]

BEGIN TAXA;
	TITLE Taxa;
	DIMENSIONS NTAX=48;
	TAXLABELS
		Tubiluchus_Priapulida Cricocosmia Aysheaia Siberion Onychodictyon_ferox Onychodictyon_gracilis Diania Xenusion Paucipodia Microdictyon Cardiodictyon Hallucigenia_sparsa Hallucigenia_fortis Hallucigenia_hongmeia Luolishania Collinsium Collins_monster_Burgess_Shale Collins_monster_Emu_Bay Acinocrinus Orstenotubulus Tritonychus Carbotubulus Antennacanthopodia Helenodora Euperipatoides_Onychophora Plicatoperipatus_Onychophora Ooperipatellus_Onychophora Actinarctus_Heterotardigrada Halobiotus_Eutardigrada Siberian_Orsten_tardigrade Megadictyon Jianshanopodia Hadranax Kerygmachela Pambdelurion Opabinia Anomalocaris_canadensis Peytoia_nathorsti Hurdia_victoria Aegirocassis_benmoulae Lyrarapax_unguispinus Schinderhannes Fuxianhuia Chengjiangocaris Leanchoilia Alalcomenaeus Misszhouia_longicaudata Kuamaia_lata 
	;

END;


BEGIN CHARACTERS;
	TITLE  Character_Matrix;
	DIMENSIONS  NCHAR=115;
	FORMAT DATATYPE = STANDARD GAP = - MISSING = ? SYMBOLS = "  0 1 2 3 4 5";
	CHARSTATELABELS 
		1 Paired_appendages /  absent present, 2 Anterior_region_covered_by_sclerites /  absent present, 3 'Head shield (cephalic shield) formed by fused cephalic segments' /  absent present, 4 'Isolated dorsal sclerite associated with eye-stalks' /  isolated_dorsal_sclerite_absent_or_not_associated_with_eyestalks isolated_dorsal_sclerite_is_associated_with_eyestalks, 5 Shape_of_dorsal_isolated_sclerite /  oval_or_rounded elongate triangular, 6 Degree_of_attachment_of_dorsal_isolated_sclerite_on_head /  broad_attachment_to_cephalic_region narrow_attachment_to_anterior_edge_of_cephalic_region, 7 'Isolated lateral sclerites, forming tripartite carapace' /  absent present, 8 Anterior_trunk_flexure_in_coronal_plane /  orientation_of_mouth_is_fixed_relative_to_main_trunk 'flexible anterior trunk allowing mouth’s dorsal-ventral orientation to be independent of main trunk axis', 9 Swelling_of_anteriormost_trunk /  'anteriormost trunk contiguous with posterior trunk; no swollen ‘head’' 'anteriormost trunk elliptical, substantially wider than adjacent trunk', 10 'Spine-like cuticular projections on anterior region (cirri)' /  absent present, 11 Mouth_opening_orientation /  terminal ventral posterior, 12 Appendages_anterior_to_mouth_opening /  no_appendages_anterior_to_mouth_opening one_or_more_appendage_pairs_anterior_to_mouth_opening, 13 'Pre-oral chamber' /  absent present, 14 Radially_arranged_circumoral_structures /  absent present, 15 Differentiated_circumoral_structures /  'undifferentiated plates (e.g. Pambdelurion)' 'differentiation of three or four enlarged plates (i.e. Radiodonta)', 16 Spinose_projections_from_inner_face_of_circumoral_structures /  proximal_surface_with_single_projection proximal_surface_with_multiple_spines, 17 Pharynx_differentiated_from_midgut /  not_differentiated differentiated, 18 Pharynx_eversible /  permanently_inverted completely_eversible, 19 Sclerotized_pharyngeal_‘teeth’ /  absent present, 20 Nature_of_pharyngeal_teeth_or_aciculae /  'spinose/acicular: each tooth has a single point' 'multiple cusps: each tooth has multiple tips, perhaps expressed as denticles or serrations', 21 Arrangement_of_pharyngeal_teeth_or_aciculae /  uniform_distribution_around_pharynx limited_number_of_longitudinal_rows_or_series, 22 Eyes /  absent present, 23 Eye_attachment /  eye_sessile eye_stalked, 24 Type_of_eyes /  'ocellus-like or pigment spots ' 'multiple visual units (including compound eyes) ', 25 'Sclerotized post-ocular (post-protocerebral) body appendages with arthrodial membranes' /  'not sclerotized; arthrodial membranes absent (‘lobopodous’)' 'sclerotized; arthrodial membranes present (‘arthropodized’)', 26 'Pre-ocular (protocerebral) limb pair, structurally differentiated from trunk appendages' /  'pre-ocular limb pair absent or not differentiated from other limbs' 'distinct pre-ocular limb pair', 27 'Sclerotization of pre-ocular (protocerebral) limb pair ' /  not_sclerotized sclerotized, 28 'Pre-ocular (protocerebral) limb pair with arthrodial membranes ' /  absent present, 29 'Nature of post-ocular lobopodous inner branch ' /  'cylindrical/subconical appendage' laterally_expanded_swimming_flap, 30 Deutocerebral_limb_pair_structurally_differentiated_from_trunk_appendages /  'undifferentiated, or differentiated in size only' structurally_differentiated, 31 'Nature of sclerotized first post-ocular (deutocerebral) appendage' /  antenniform_with_distinct_podomeres 'short great-appendage', 32 'Nature of lobopodous first post-ocular (deutocerebral) appendage' /  ambulatory sensorial 'masticatory, with sclerotized jaw', 33 Inner_blade_of_deutocerebral_jaw_with_diastema /  absent present, 34 'Nature of lobopodous second post-ocular (tritocerebral) appendage' /  undifferentiated specialized_papilla, 35 'Nature of arthropodized second post-ocular (tritocerebral) appendage' /  ambulatory_limb_with_distinct_podomeres 'specialized post-antennal appendage', 36 'Position of pre-ocular (protocerebral) appendage pair' /  lateral ventral terminal, 37 'Pre-ocular (protocerebral) appendages directly adjacent to one another' /  'pre-ocular appendages not directly adjacent' 'pre-ocular appendages adjacent to one another, with or without physical fusion', 38 'Pre-ocular (protocerebral) appendages mechanically fused' /  'pre-ocular appendages adjacent but not mechanically fused' 'pre-ocular appendages are mechanically fused to form a single element', 39 'Extent of pre-ocular (protocerebral) appendage fusion' /  'locational basal only, with separate distal elements ' fused_into_a_reduced_labrum_, 40 'Spines/spinules on pre-ocular (protocerebral) appendage' /  absent 'present (anomalocaridids, gilled lobopodians, certain lobopodians)', 41 'Number of spine/spinule series on pre-ocular (protocerebral) frontal appendage' /  'one series (e.g. Aysheaia, Kerygmachela, Opabinia, Hurdia, Peytoia)' 'two series (e.g. Anomalocaris, Onychodictyon ferox)', 42 'Coplanar spine/spinule series in pre-ocular (protocerebral) frontal appendages' /  'no (as in Radiodonta)' 'yes (as in Onychodictyon ferox)', 43 Multifurcate_distal_termination_of_protocerebral_appendage /  absent present, 44 Epidermal_segmentation /  absent present, 45 Dorsal_integument_sclerotized_and_connected_by_arthrodial_membranes /  absent present, 46 Sternites_connected_by_arthrodial_membranes /  absent_ present, 47 Annulations /  absent present, 48 Annulation_distribution /  limbs_only_ trunk_and_limbs_, 49 Anterior_projection_of_trunk_lacking_annulations /  annulations_continue_for_full_length_of_trunk differentiated_anterior_region_of_trunk_lacking_annulations, 50 Organization_of_trunk_annulation /  homonomous heteronomous, 51 Branching_of_annular_rings /  unbranched branched, 52 Metamerically_arranged_dorsolateral_epidermal_specializations /  absent present, 53 Nature_of_paired_epidermal_specialization /  epidermal_depressions epidermal_evaginations, 54 Proportions_of_epidermal_trunk_evaginations /  'wider than tall (e.g. nodes or plates)' 'taller than wide (e.g. spines)', 55 Trunk_epidermal_evaginations_with_acute_distal_termination /  absent present, 56 Acute_distal_termination_in_epidermal_evagination_is_curved /  straight curved, 57 Sclerotization_of_epidermal_evaginations /  epidermal_evaginations_not_sclerotized epidermal_evaginations_sclerotized, 58 Dorsal_trunk_sclerite_ornament /  'net-like' scaly, 59 Sclerites_consist_of_a_stack_of_constituent_elements /  sclerites_comprise_single_element sclerites_comprise_stacked_elements, 60 Maximum_number_of_primary_dorsal_epidermal_specializations_above_each_leg_pair /  one two three four five seven, 61 ‘Secondary’_structures_in_dorsal_epidermal_specializations /  absent present, 62 Size_of_dorsal_epidermal_specialisations_consistent /  each_group_of_dorsal_elements_of_equivalent_size size_of_dorsal_elements_varies_between_groups, 63 Spacing_of_epidermal_specializations /  regular variable, 64 Papillae_on_trunk_annulations /  absent_ present, 65 'Serially repeated mid-gut glands' /  absent 'reniform, submillimetric lamellar', 66 Differentiated_anterior_trunk /  trunk_of_uniform_construction 'anterior trunk differentiated from posterior trunk by abrupt change in thickness, armature and appendage construction', 67 Trunk_exites /  absent present, 68 Form_of_exite /  lateral_lobes simple_oval_paddle_with_marginal_spines bipartite_shaft_with_lamellar_setae_, 69 'Dorsal flaps / exites fused with endopod to form biramous appendage' /  not_fused fused, 70 'Exites (= lanceolate dorsal blades) associated with dorsolateral flaps' /  absent present, 71 'Exite (=setal blade) distribution' /  confined_laterally present_dorsally, 72 'Antero-posteriorly compressed protopodite with gnathobasic endites in post-deutocerebral appendage pair' /  absent present, 73 'Secondary structures on non-sclerotized (lobopodous) limbs' /  absent present, 74 Nature_of_secondary_structure /  'spines/setae' appendicules, 75 Length_of_spines_on_secondary_structure /  'short / equant' 'needle-like', 76 'Papillae on non-sclerotized (lobopodous) limbs' /  absent present, 77 Papillae_with_terminal_spine /  spine_absent spine_present, 78 'Finger-like elements in distal tip of limbs' /  absent present, 79 Terminal_claws_on_trunk_limbs /  absent present, 80 Terminal_claws_with_multiple_branches /  absent present, 81 Number_of_claws_on_undifferentiated_trunk_limbs /  one two three four seven, 82 Nature_of_claws_on_each_trunk_limb /  claws_on_single_limb_all_identical_ claws_on_single_limb_differentiated, 83 Differentiated_distal_foot_in_lobopodous_trunk_limbs /  absent present, 84 Strengthening_rays_in_lateral_flaps /  absent present, 85 Posterior_tapering_of_lateral_flaps /  absent present, 86 Hypertrophied_set_of_anterior_body_flaps /  absent present, 87 Anterior_flaps_reduced /  anterior_flaps_present anterior_flaps_reduced_in_size, 88 Number_of_lobopodous_limbs_on_differentiated_anterior_trunk /  two three five six, 89 Nature_of_lobopodous_limbs_on_differentiated_anterior_trunk /  'slender, simple' cirrate, 90 Appendages_comprise_15_or_more_podomeres /  Fewer_than_15_podomeres 15_or_more_podomeres, 91 Limbless_posterior_extension_of_the_lobopodous_trunk /  absent 'present: tubular portion of the body extends beyond the last observable appendage pair', 92 Posterior_tagma_composed_of_three_paired_lateral_flaps /  absent present, 93 Posteriormost_pair_of_trunk_appendages_structurally_differentiated /  undifferentiated differentiated, 94 Nature_of_differentiated_posteriormost_appendages /  appendicular_tail 'partially fused/reduced walking legs', 95 Nature_of_appendicular_tail /  tail_rami tail_flaps, 96 Direction_of_claws_on_posteriormost_appendage_pair /  Same_direction_as_claws_on_other_appendages rotated_anteriad, 97 Ventral_nerve_cord_with_paired_ganglia /  absent present, 98 Dorsal_condensed_brain /  absent present, 99 Number_of_neuromeres_integrated_into_the_dorsal_condensed_brain /  one_ two three_, 100 Mouth_innervation_relative_to_brain_neuromeres /  protocerebral_innervation deutocerebral_innervation innervation_from_multiple_neuromeres tritocerebral_innervation, 101 'Ventral nerve cord (VNC) paired' /  unpaired paired, 102 VNC_with_morphologically_discrete_condensed_hemiganglia_connected_by_medial_commissures /  hemiganglia_absent morphologically_discrete_condensed_hemiganglia_connected_by_medial_commissures, 103 Paired_nerve_cord_lateralized /  'absent (Alalcomenaeus, Fuxianhuia, Tardigrada)' 'present (Onychophora)', 104 Paired_nerve_cord_bears_medial_interpedal_commissures /  medial_interpedal_commissures_absent medial_interpedal_commissures_present, 105 Regularly_spaced_peripheral_nerves_along_the_entire_length_of_the_nerve_cord /  'absent, or not occurring regularly along entire length of nerve cord' present_along_entire_length_of_nerve_cord, 106 Nerve_cord_has_orthogonal_organization /  not_orthogonally_organized orthogonally_organized, 107 Orthogonal_nerve_cord_has_complete_ring_commissures /  ring_commissures_incomplete_or_absent complete_ring_commissures, 108 Segmental_leg_nerves_shifted_anteriorly_relative_to_appendages /  not_shifted_anteriorly shifted_anteriorly, 109 Segmental_leg_nerves_paired /  unpaired paired, 110 Stomatogastric_ganglion /  absent present, 111 Heart /  absent present, 112 Skeletal_musculature /  peripheral_longitudinal_and_circular_muscle metamerically_arranged_skeletal_muscle, 113 Longitudinal_peripheral_musculature /  absent present, 114 Circular_peripheral_musculature /  absent present, 115 Circular_musculature_inside_longitudinal_musculature /  circular_muscles_inside_longitudinal longitudinal_muscles_inside_circular ; 
	MATRIX
	Tubiluchus_Priapulida          00-----0000-0100111100---------------------00-1-1000------0----100------------------------------00--00--111--000111
	Cricocosmia                    00-----0000-0100111?00---------------------00-1-1001100-1001-00100------------------------------???????????????0???
	Aysheaia                       10-----0000-0100?0???0--010-00-0-0-00--10-100-111000------0----1000-----1000-010400-------0-11-1???????????????0???
	Siberion                       10-----0000-0100?0???0--010-00-0-0-010-????00-11?000------?----1?00-----???0-??????-------?-???????????????????????
	Onychodictyon_ferox            10-----0000-0????0???100010-00-0-0-00--111000-111101101010?1-001000-----11-0-010110-------0-11-1???????????????????
	Onychodictyon_gracilis         10-----??00-0????0??????0???0?-?-0-????????00-110?0110??1??1-0010?0-----???0-0101?0----??-1-11-0???????????????????
	Diania                         10-----0000-?????0???0--00--00-0-0-00--0---00-110101100-0??0-001000-----1000-0?---0-------1-0--????????????????????
	Xenusion                       10-----?00???????????0--00--00-0-0-00--????00-11?101100-0??1-001?00-----1??????????-------1-0--????????????????????
	Paucipodia                     10-----0000-?????01??0--00--00-0-0-00--0---00-110000------?----0000-----0--0-010100-------1-0--????????????????????
	Microdictyon                   10-----1000-?????0???0--00--00-0-0-00--0---00-111101100-10?1-000000-----0--0-0101?0-------1-0--0???????????????????
	Cardiodictyon                  10-----110{0 1}??????0???10?0???0?-??0-00--0---00-111101100-10?1-000000-----0--0-0101?0-------1-0--0???????????????????
	Hallucigenia_sparsa            10-----1100-11001010110000--00-{0 1}-0-00--0---00-0----111111111000-010-----0--0-010100----10-0-0--0???????????????????
	Hallucigenia_fortis            10-----1100-?????0???10?00--00-{0 1}-0-00--0---00-1111?111111??10000010-----0--0-0101?0----00-?-0--0???????????????????
	Hallucigenia_hongmeia          1???????????????????????0???0?-??0-????????00-11?1?1111110?10100??0-----0--0-0100-0----??-1-0--????????????????????
	Luolishania                    1100---?100-?????0???100010-00-{0 1}-0-00--0---00-11110111111??20111010-----101100100-0----21-1-0--0???????????????????
	Collinsium                     1100---1000-?????????0--010-00-{0 1}-0-00--0---00-110101111110140111010-----1010-0100-0----31-1-0--0???????????????????
	Collins_monster_Burgess_Shale  1???????????????????????0???00-{0 1}-0-????????00-11?10111111????????10-----101????????----31-?-???????????????????????
	Collins_monster_Emu_Bay        110?????????????????????0???0?-{0 1}-0-????????00-11?10111111??201???10-----1010-0100-0----21-?????????????????????????
	Acinocrinus                    1???????????????????????0???00-{0 1}-0-????????00-11?10111111??511??010-----101????????----21-?-???????????????????????
	Orstenotubulus                 1???????????????????????0???0?-???-????????00-11?11111?????101?1??0-----0--11??????----??-?-???????????????????????
	Tritonychus                    1???????????????????????0???0?-???-????????00-11??1????????????1??0-----0--1101?200----????????????????????????01??
	Carbotubulus                   1???????????????????????0???0?-???-????????00-0----????????????-?10-----0--0-??????----??-0-??-????????????????0???
	Antennacanthopodia             10-----?00???????????100010-01-1-0-00--0---00-1????0------?----??00-----0--1?00-----------1-0---???????????????????
	Helenodora                     10-----?00??????????????010-0?-??1-00--0---00-?????0------?----10?0-----0--1?01010?----??-?-???????????????????????
	Euperipatoides_Onychophora     10-----0001110--100--100010-01-201-00--0---00-110010------1----1000-----0--11010101-------1-0--00112101111101010111
	Plicatoperipatus_Onychophora   10-----0001110--100--100010-01-211-00--0---00-110010------1----1000-----0--11010101-------1-0--00112101111101010111
	Ooperipatellus_Onychophora     10-----0001110--100--100010-01-211-00--0---00-110010------1----1000-----0--11010101-------1-0--00112101111101010111
	Actinarctus_Heterotardigrada   1100---00110010010100100011000-0-0-10------00-0----1100-100??---000-----0--0-110310-------0-11-11100110111011?-100-
	Halobiotus_Eutardigrada        10-----0000-010010100100011000-0-0-20------00-0----10-----0??---000-----0--0-111110-------0-11-111001101110111-100-
	Siberian_Orsten_tardigrade     10-----0000-0100????????0???0?-???-????????00-0----???--?????---?00-----0--0-011110-------0-1{1 2}-????????????????????
	Megadictyon                    10-----?00???1???0???0--010-00-0-0-00--10-100-11?0?0------?----0100-----11-0-0????0-------?-???????????????????????
	Jianshanopodia                 10-----0000-01??101100--010-00-0-0-0???10-?00-11?100------?----0100-----11-0-0????0-------0-101-???????????????????
	Hadranax                       1???????????????????????0???0?-???-????????00-11?101100-0-?3--01?00-----0--10?????0-------?-???????????????????????
	Kerygmachela                   10-----0000-0100?0??????010-00-0-0-010-10-100-110101100-0-?3-?011010010-0--0-00---00000---00100-???????????????0???
	Pambdelurion                   10-----000100100?0???0--010-00-0-0-110-10-?00-1????????????--?-?1010010-0--0-00---00000---?????????????????????110-
	Opabinia                       10-----000210????0???111010-00-0-0-111010-110-0----0------------1010011-0--0-00---00000---?1101-???????????????????
	Anomalocaris_canadensis        11010000?011011110???111011110-0-0-110-110100-0----0------------1010001-0--0-00----1101---01101-???????????????1???
	Peytoia_nathorsti              11011000?0110111?0???111011110-0-0-110-10-100-0----0------------1010011-0--0-00----1101---000---???????????????????
	Hurdia_victoria                11011010?011011110110111011110-0-0-1???10-1?0-0----0------------?010011-0--0-00----1001---00101????????????????????
	Aegirocassis_benmoulae         11011010?0?10???????????011110-0-0-1???10-100-0----0------------?010011-0--0-00----110?---000---???????????????????
	Lyrarapax_unguispinus          11010000?01101???????111011110-0-0-110-10-100-0----0------------0010001-0--0-00----?111---01101-?10011?????????1???
	Schinderhannes                 1??????0?01101???????1110111??-0-0-110-110?????????????????????????????-?????????????1?---00101-???????????????????
	Fuxianhuia                     110101-0--2100--?0???1111110-10---11111----110------------------0-111-00-----00----------1--101-?12111????????1100-
	Chengjiangocaris               110101-0--2100--?0???1111110-10---11111----110------------------0-111-00-----00----------1--101-1?????0?1??????????
	Leanchoilia                    1110---0--2100--?0???1111110-11---01111----11?------------0-----1-111-01-----010{0 2}?-------0--0---???????????????????
	Alalcomenaeus                  1110---0--2100--?0???11111??-11---01111----11?------------0-----1-111-01-----0100--------0--0---112111000--????????
	Misszhouia_longicaudata        111101-0--2100--?0???1111110-10---01111----111------------0-----1-121-01-----0100--------0--0---???????????????1???
	Kuamaia_lata                   111101-0--2100--?0???1111110-10---01111----111------------0-----1-121-01-----01021-------0--0---???????????????1???

;

END;
BEGIN ASSUMPTIONS;
	TYPESET * UNTITLED   =  unord:  1 -  115;

END;

BEGIN MESQUITECHARMODELS;
	ProbModelSet * UNTITLED   =  'Mk1 (est.)':  1 -  115;
END;

BEGIN TREES;
	Title Results;
	LINK Taxa = Taxa;
	TRANSLATE
[0] 		1 Tubiluchus_Priapulida,
[1] 		2 Cricocosmia,
[2] 		3 Aysheaia,
[3] 		4 Siberion,
[4] 		5 Onychodictyon_ferox,
[5] 		6 Onychodictyon_gracilis,
[6] 		7 Diania,
[7] 		8 Xenusion,
[8] 		9 Paucipodia,
[9] 		10 Microdictyon,
[10] 		11 Cardiodictyon,
[11] 		12 Hallucigenia_sparsa,
[12] 		13 Hallucigenia_fortis,
[13] 		14 Hallucigenia_hongmeia,
[14] 		15 Luolishania,
[15] 		16 Collinsium,
[16] 		17 Collins_monster_Burgess_Shale,
[17] 		18 Collins_monster_Emu_Bay,
[18] 		19 Acinocrinus,
[19] 		20 Orstenotubulus,
[20] 		21 Tritonychus,
[21] 		22 Carbotubulus,
[22] 		23 Antennacanthopodia,
[23] 		24 Helenodora,
[24] 		25 Euperipatoides_Onychophora,
[25] 		26 Plicatoperipatus_Onychophora,
[26] 		27 Ooperipatellus_Onychophora,
[27] 		28 Actinarctus_Heterotardigrada,
[28] 		29 Halobiotus_Eutardigrada,
[29] 		30 Siberian_Orsten_tardigrade,
[30] 		31 Megadictyon,
[31] 		32 Jianshanopodia,
[32] 		33 Hadranax,
[33] 		34 Kerygmachela,
[34] 		35 Pambdelurion,
[35] 		36 Opabinia,
[36] 		37 Anomalocaris_canadensis,
[37] 		38 Peytoia_nathorsti,
[38] 		39 Hurdia_victoria,
[39] 		40 Aegirocassis_benmoulae,
[40] 		41 Lyrarapax_unguispinus,
[41] 		42 Schinderhannes,
[42] 		43 Fuxianhuia,
[43] 		44 Chengjiangocaris,
[44] 		45 Leanchoilia,
[45] 		46 Alalcomenaeus,
[46] 		47 Misszhouia_longicaudata,
[47] 		48 Kuamaia_lata;
	TREE piwe_k_equal = (1,(2,(3,4,5,6,7,8,9,10,11,13,14,20,21,23,24,25,26,27,33,34,35,(12,22),(15,16,17,18,19),(28,29,30),(31,32),((36,((43,44),((45,46),(47,48)))),(37,38,39,40,41,42)))));
	TREE xpiwe_k_equal = (1,(2,(3,4,5,6,7,8,9,10,11,13,14,20,21,23,24,25,26,27,33,34,35,(12,22),(15,16,17,18,19),(28,29,30),(31,32),((36,((43,44),((45,46),(47,48)))),(37,38,39,40,41,42)))));
	TREE piwe_k_259.4 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_259.4 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_159.5 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_159.5 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_117.3 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_117.3 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_93.12 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_93.12 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_77.20 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_77.20 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_65.84 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_65.84 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_57.29 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_57.29 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_50.59 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_50.59 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_45.19 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_45.19 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_40.74 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_40.74 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_37.01 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_37.01 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_33.83 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_33.83 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_31.09 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_31.09 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_28.71 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_28.71 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_26.61 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_26.61 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_24.76 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_24.76 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_23.10 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_23.10 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_21.62 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_21.62 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_20.28 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_20.28 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_19.07 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_19.07 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_17.96 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_17.96 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_16.95 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_16.95 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_16.03 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_16.03 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_15.17 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_15.17 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_14.39 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_14.39 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_13.66 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_13.66 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_12.99 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_12.99 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_12.36 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_12.36 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_11.78 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_11.78 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_11.23 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_11.23 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_10.72 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_10.72 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_10.24 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,(29,30)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_10.24 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_9.797 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_9.797 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_9.375 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_9.375 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_8.978 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_8.978 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_8.603 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_8.603 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_8.249 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_8.249 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_7.914 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_7.914 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_7.598 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_7.598 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_7.297 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_7.297 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_7.013 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_7.013 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_6.743 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_6.743 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_6.486 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_6.486 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_6.242 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_6.242 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_6.010 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_6.010 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_5.788 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_5.788 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_5.577 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_5.577 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_5.376 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_5.376 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_5.183 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_5.183 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_5.000 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_5.000 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_4.824 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_4.824 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_4.656 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE piwe_k_4.495 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_4.495 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_4.341 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_4.341 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_4.193 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_4.193 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_4.051 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_4.051 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.916 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_3.916 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.785 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,(29,30)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_3.785 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE xpiwe_k_3.660 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.540 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE xpiwe_k_3.313 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.207 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_3.207 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.104 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_3.104 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_3.005 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_3.005 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.910 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.910 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.818 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.818 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.730 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.730 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.645 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.645 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.563 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.563 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.484 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(30,(28,29)))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.484 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.407 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.407 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.334 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.334 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.263 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.263 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.194 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.194 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.128 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.128 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.064 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.064 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_2.002 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_2.002 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.943 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.943 = (1,(2,(3,(((33,((4,(34,(35,((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(5,(28,29,30))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.885 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.885 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.829 = (1,(2,(3,((5,((4,33,(34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42)))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.829 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.775 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.775 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.723 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.723 = (1,(2,(3,((5,((4,33,(34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42)))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.673 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.673 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.624 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.624 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.577 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.577 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.531 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.531 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.487 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.487 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.444 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.444 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.402 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.402 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE xpiwe_k_1.362 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE xpiwe_k_1.322 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
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	TREE xpiwe_k_1.284 = (1,(2,(3,((5,((4,33,(34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42)))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.246 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.246 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.209 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.209 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.173 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.173 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.137 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(39,(40,(38,(37,(41,42))))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.137 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.100 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.100 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),((37,(41,42)),(38,(39,40))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE piwe_k_1.061 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));
	TREE xpiwe_k_1.061 = (1,(2,(3,((5,((4,33,34,(35,((28,(29,30)),((36,((43,44),((45,46),(47,48)))),(38,39,40,(37,(41,42))))))),(31,32))),(6,(((7,8),(9,(10,(11,(13,(12,22),(14,(15,16,17,18,19))))))),(20,21,23,24,25,26,27)))))));

END;


BEGIN TREES;
	Title Consensus;
	LINK Taxa = Taxa;
[!Parameters: Majority-Rule Consensus of trees from Stored Trees]
	TRANSLATE
[0] 		1 Tubiluchus_Priapulida,
[1] 		2 Cricocosmia,
[2] 		3 Aysheaia,
[3] 		4 Siberion,
[4] 		5 Onychodictyon_ferox,
[5] 		6 Onychodictyon_gracilis,
[6] 		7 Diania,
[7] 		8 Xenusion,
[8] 		9 Paucipodia,
[9] 		10 Microdictyon,
[10] 		11 Cardiodictyon,
[11] 		12 Hallucigenia_sparsa,
[12] 		13 Hallucigenia_fortis,
[13] 		14 Hallucigenia_hongmeia,
[14] 		15 Luolishania,
[15] 		16 Collinsium,
[16] 		17 Collins_monster_Burgess_Shale,
[17] 		18 Collins_monster_Emu_Bay,
[18] 		19 Acinocrinus,
[19] 		20 Orstenotubulus,
[20] 		21 Tritonychus,
[21] 		22 Carbotubulus,
[22] 		23 Antennacanthopodia,
[23] 		24 Helenodora,
[24] 		25 Euperipatoides_Onychophora,
[25] 		26 Plicatoperipatus_Onychophora,
[26] 		27 Ooperipatellus_Onychophora,
[27] 		28 Actinarctus_Heterotardigrada,
[28] 		29 Halobiotus_Eutardigrada,
[29] 		30 Siberian_Orsten_tardigrade,
[30] 		31 Megadictyon,
[31] 		32 Jianshanopodia,
[32] 		33 Hadranax,
[33] 		34 Kerygmachela,
[34] 		35 Pambdelurion,
[35] 		36 Opabinia,
[36] 		37 Anomalocaris_canadensis,
[37] 		38 Peytoia_nathorsti,
[38] 		39 Hurdia_victoria,
[39] 		40 Aegirocassis_benmoulae,
[40] 		41 Lyrarapax_unguispinus,
[41] 		42 Schinderhannes,
[42] 		43 Fuxianhuia,
[43] 		44 Chengjiangocaris,
[44] 		45 Leanchoilia,
[45] 		46 Alalcomenaeus,
[46] 		47 Misszhouia_longicaudata,
[47] 		48 Kuamaia_lata;
	TREE 'Majority-Rule' = (1,(2,(3,((6,((20,21,23,24,25,26,27)[%consensusFrequency = 0.99 ],((7,8)[%consensusFrequency = 0.99 ],(9,(10,(11,(13,(12,22)[%consensusFrequency = 1 ],(14,(15,16,17,18,19)[%consensusFrequency = 1 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ],((5,(28,29,30)[%consensusFrequency = 1 ])[%consensusFrequency = 0.79 ],(33,((31,32)[%consensusFrequency = 1 ],(4,(34,(35,((38,39,40,(37,(41,42)[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 1 ],(36,((43,44)[%consensusFrequency = 1 ],((45,46)[%consensusFrequency = 1 ],(47,48)[%consensusFrequency = 1 ])[%consensusFrequency = 1 ])[%consensusFrequency = 1 ])[%consensusFrequency = 1 ])[%consensusFrequency = 1 ])[%consensusFrequency = 0.79 ])[%consensusFrequency = 0.79 ])[%consensusFrequency = 0.79 ])[%consensusFrequency = 0.79 ])[%consensusFrequency = 0.79 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 0.99 ])[%consensusFrequency = 1 ])[%consensusFrequency = 1 ])[%consensusFrequency = 1 ] [% ] [%  setBetweenBits = selected setBetweenDouble = consensusFrequency ];

END;


Begin MESQUITE;
		MESQUITESCRIPTVERSION 2;
		TITLE AUTO;
		tell ProjectCoordinator;
		timeSaved 1468425842465;
		getEmployee #mesquite.minimal.ManageTaxa.ManageTaxa;
		tell It;
			setID 0 1220829985951061669;
		endTell;
		getEmployee #mesquite.charMatrices.ManageCharacters.ManageCharacters;
		tell It;
			setID 0 8421533910499541586;
			mqVersion 303;
			checksumv 0 3 4208547866 null  getNumChars 115 numChars 115 getNumTaxa 48 numTaxa 48   short true   bits 2305843009213694015   states 63   sumSquaresStatesOnly 7115.0 sumSquares -4.150517416584649E19 longCompressibleToShort false usingShortMatrix true   NumFiles 1 NumMatrices 1;
			mqVersion;
		endTell;
		getWindow;
		tell It;
			suppress;
			setResourcesState true false 227;
			setPopoutState 400;
			setExplanationSize 0;
			setAnnotationSize 0;
			setFontIncAnnot 0;
			setFontIncExp 0;
			setSize 1062 644;
			setLocation 8 23;
			setFont SanSerif;
			setFontSize 10;
			getToolPalette;
			tell It;
			endTell;
			setActive;
			desuppress;
		endTell;
		getEmployee  #mesquite.charMatrices.BasicDataWindowCoord.BasicDataWindowCoord;
		tell It;
			showDataWindow #8421533910499541586 #mesquite.charMatrices.BasicDataWindowMaker.BasicDataWindowMaker;
			tell It;
				getWindow;
				tell It;
					setExplanationSize 30;
					setAnnotationSize 20;
					setFontIncAnnot 0;
					setFontIncExp 0;
					setSize 0 -72;
					setLocation 8 23;
					setFont SanSerif;
					setFontSize 10;
					getToolPalette;
					tell It;
					endTell;
					setTool mesquite.charMatrices.BasicDataWindowMaker.BasicDataWindow.arrow;
					colorCells  #mesquite.charMatrices.NoColor.NoColor;
					colorRowNames  #mesquite.charMatrices.TaxonGroupColor.TaxonGroupColor;
					colorColumnNames  #mesquite.charMatrices.CharGroupColor.CharGroupColor;
					colorText  #mesquite.charMatrices.NoColor.NoColor;
					setBackground White;
					toggleShowNames on;
					toggleShowTaxonNames on;
					toggleTight off;
					toggleThinRows off;
					toggleShowChanges on;
					toggleSeparateLines off;
					toggleShowStates on;
					toggleAutoWCharNames on;
					toggleAutoTaxonNames off;
					toggleShowDefaultCharNames off;
					toggleConstrainCW on;
					toggleBirdsEye off;
					toggleShowPaleGrid off;
					toggleShowPaleCellColors off;
					toggleShowPaleExcluded off;
					togglePaleInapplicable on;
					toggleShowBoldCellText off;
					toggleAllowAutosize on;
					toggleColorsPanel off;
					toggleDiagonal on;
					setDiagonalHeight 80;
					toggleLinkedScrolling on;
					toggleScrollLinkedTables off;
				endTell;
				getWindow;
				tell It;
					forceAutosize;
				endTell;
				hideWindow;
				getEmployee #mesquite.charMatrices.ColorByState.ColorByState;
				tell It;
					setStateLimit 9;
					toggleUniformMaximum on;
				endTell;
				getEmployee #mesquite.charMatrices.ColorCells.ColorCells;
				tell It;
					setColor Red;
					removeColor off;
				endTell;
				getEmployee #mesquite.categ.StateNamesStrip.StateNamesStrip;
				tell It;
					showStrip off;
				endTell;
				getEmployee #mesquite.charMatrices.AnnotPanel.AnnotPanel;
				tell It;
					togglePanel off;
				endTell;
				getEmployee #mesquite.charMatrices.CharReferenceStrip.CharReferenceStrip;
				tell It;
					showStrip off;
				endTell;
				getEmployee #mesquite.charMatrices.QuickKeySelector.QuickKeySelector;
				tell It;
					autotabOff;
				endTell;
				getEmployee #mesquite.charMatrices.SelSummaryStrip.SelSummaryStrip;
				tell It;
					showStrip off;
				endTell;
				getEmployee #mesquite.categ.SmallStateNamesEditor.SmallStateNamesEditor;
				tell It;
					panelOpen true;
				endTell;
			endTell;
		endTell;
		endTell;
end;