%PDF-1.6
%
1 0 obj
<>
endobj
2 0 obj
<>stream
application/pdf
ChronostratChart2020-03Finnish
Adobe Illustrator 25.2 (Windows)
2021-02-10T18:57:39+02:00
2021-02-10T18:57:39+01:00
2021-02-10T18:57:39+01:00
256
184
JPEG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xmp.did:c0a1f143-f9aa-e44d-b1be-d4dfb81e4e4b
uuid:c3bc2ca2-8d15-4695-817e-2254f75d45ed
proof:pdf
uuid:34CBD795335FE21180AB96FE9A8AAF01
xmp.iid:b69f455a-4a32-a247-981c-080bb029d3bf
xmp.did:b69f455a-4a32-a247-981c-080bb029d3bf
uuid:34CBD795335FE21180AB96FE9A8AAF01
default
saved
xmp.iid:ACF021BBB964E211B5F4DA3DC998A3E2
2013-01-22T18:32:44+01:00
Adobe Illustrator CS4
/
saved
xmp.iid:c0a1f143-f9aa-e44d-b1be-d4dfb81e4e4b
2021-02-10T18:57:27+01:00
Adobe Illustrator 25.2 (Windows)
/
EmbedByReference
D:\NCS\geohamer.gif
EmbedByReference
D:\NCS\geohamer.gif
EmbedByReference
D:\NCS\geohamer.gif
EmbedByReference
D:\NCS\geohamer.gif
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\1_SGE _whiteCROP.jpg
0
uuid:faf5bdd5-ba3d-11da-ad31-d33d75182f1b
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\3_IGEO_white.jpg
adobe:docid:photoshop:2cb63e74-6a41-11e2-b7f9-f867574ffb10
uuid:2cb63e76-6a41-11e2-b7f9-f867574ffb10
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\2_IGME_Rec_White.jpg
adobe:docid:photoshop:2cb63e77-6a41-11e2-b7f9-f867574ffb10
uuid:11f9bed8-6a42-11e2-b7f9-f867574ffb10
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\1_SGE _whiteCROP.jpg
0
uuid:faf5bdd5-ba3d-11da-ad31-d33d75182f1b
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\4_RAC.jpg
adobe:docid:photoshop:175f9340-6a40-11e2-bcd3-a7b572ca5aa6
uuid:175f9342-6a40-11e2-bcd3-a7b572ca5aa6
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\3_IGEO_white.jpg
adobe:docid:photoshop:2cb63e74-6a41-11e2-b7f9-f867574ffb10
uuid:2cb63e76-6a41-11e2-b7f9-f867574ffb10
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\2_IGME_Rec_White.jpg
adobe:docid:photoshop:2cb63e77-6a41-11e2-b7f9-f867574ffb10
uuid:11f9bed8-6a42-11e2-b7f9-f867574ffb10
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\1_SGE _whiteCROP.jpg
0
uuid:faf5bdd5-ba3d-11da-ad31-d33d75182f1b
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\4_RAC.jpg
adobe:docid:photoshop:175f9340-6a40-11e2-bcd3-a7b572ca5aa6
uuid:175f9342-6a40-11e2-bcd3-a7b572ca5aa6
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\3_IGEO_white.jpg
adobe:docid:photoshop:2cb63e74-6a41-11e2-b7f9-f867574ffb10
uuid:2cb63e76-6a41-11e2-b7f9-f867574ffb10
EmbedByReference
O:\GEO\FG\Onderzoek\CFG\RMDelta\PDFsArtikelen\Cohen_ea______Gibbard_ea_____Busschers_ea\ICS-chart-2012\TRANSLATED-versions\SPANISH\PreTemplate2018\ICS-chart-2013_SPANISH\2_IGME_Rec_White.jpg
adobe:docid:photoshop:2cb63e77-6a41-11e2-b7f9-f867574ffb10
uuid:11f9bed8-6a42-11e2-b7f9-f867574ffb10
D:\NCS\geohamer.gif
D:\NCS\geohamer.gif
D:\NCS\geohamer.gif
D:\NCS\geohamer.gif
Adobe PDF library 15.00
Adobe Illustrator
1
False
True
419.999866
317.654639
Millimeters
ArialMT
Arial
Regular
Open Type
Version 7.00
False
arial.ttf
Arial-ItalicMT
Arial
Italic
Open Type
Version 7.00
False
ariali.ttf
Arial-BoldMT
Arial
Bold
Open Type
Version 7.00
False
arialbd.ttf
Cyan
Magenta
Yellow
Black
PANTONE Process Blue C 1
Default Swatch Group
0
White
PROCESS
100.000000
CMYK
0.000000
0.000000
0.000000
0.000000
logoICS
PROCESS
100.000000
CMYK
67.998803
67.998803
0.000000
32.999200
Black
PROCESS
100.000000
CMYK
0.000000
0.000000
0.000000
100.000000
0c 0m 0y 30k
PROCESS
100.000000
CMYK
0.000000
0.000000
0.000000
29.999200
Meghalayan_LateHol
PROCESS
100.000000
CMYK
0.000000
10.000000
4.998900
0.000000
Northgrippian_MiddleHol
PROCESS
100.000000
CMYK
0.000000
10.000000
10.000000
0.000000
Greenlandian_EarlyHol
PROCESS
100.000000
CMYK
0.000000
10.000000
15.000001
0.000000
_Holocene
PROCESS
100.000000
CMYK
0.000000
10.000000
20.000000
0.000000
4thStage_UppPleis
PROCESS
100.000000
CMYK
0.000000
5.000000
14.999600
0.000000
_UpperPleistoceneSUBseries
PROCESS
100.000000
CMYK
0.000000
5.000000
14.999600
0.000000
Chibanian
PROCESS
100.000000
CMYK
0.000000
4.998900
20.000000
0.000000
Calabrian
PROCESS
100.000000
CMYK
0.000000
4.998900
24.998900
0.000000
Gelasian
PROCESS
100.000000
CMYK
0.000000
4.998900
30.000001
0.000000
_LowerPleistoceneSUBseries
PROCESS
100.000000
CMYK
0.000000
4.998900
34.999999
0.000000
_Pleistocene
PROCESS
100.000000
CMYK
0.000000
4.998900
40.000001
0.000000
__Quaternary
PROCESS
100.000000
CMYK
0.000000
0.000000
49.999201
0.000000
Piacenzian
PROCESS
100.000000
CMYK
0.000000
0.000000
24.998900
0.000000
Zanclean
PROCESS
100.000000
CMYK
0.000000
0.000000
29.999200
0.000000
_Pliocene
PROCESS
100.000000
CMYK
0.000000
0.000000
40.000001
0.000000
Messinian
PROCESS
100.000000
CMYK
0.000000
0.000000
54.999602
0.000000
Tortonian
PROCESS
100.000000
CMYK
0.000000
0.000000
60.000002
0.000000
Serravallian
PROCESS
100.000000
CMYK
0.000000
0.000000
64.998901
0.000000
Langhian
PROCESS
100.000000
CMYK
0.000000
0.000000
69.999200
0.000000
Burdigalian
PROCESS
100.000000
CMYK
0.000000
0.000000
74.999601
0.000000
Aquitanian
PROCESS
100.000000
CMYK
0.000000
0.000000
80.000001
0.000000
_Miocene
PROCESS
100.000000
CMYK
0.000000
0.000000
100.000000
0.000000
__Neogene
PROCESS
100.000000
CMYK
0.000000
9.999200
89.999199
0.000000
Chattian
PROCESS
100.000000
CMYK
0.000000
9.999200
29.999200
0.000000
Rupelian
PROCESS
100.000000
CMYK
0.000000
14.999600
34.999600
0.000000
_Oligocene
PROCESS
100.000000
CMYK
0.000000
24.998900
44.998899
0.000000
Priabonanian
PROCESS
100.000000
CMYK
0.000000
20.000000
29.999200
0.000000
Bartonian
PROCESS
100.000000
CMYK
0.000000
24.998900
34.999600
0.000000
Lutetian
PROCESS
100.000000
CMYK
0.000000
29.999200
40.000001
0.000000
Ypresian
PROCESS
100.000000
CMYK
0.000000
34.999600
44.998899
0.000000
_Eocene
PROCESS
100.000000
CMYK
0.000000
29.999200
49.999201
0.000000
Thanetian
PROCESS
100.000000
CMYK
0.000000
24.998900
49.999201
0.000000
Selandian
PROCESS
100.000000
CMYK
0.000000
24.998900
54.999602
0.000000
Danian
PROCESS
100.000000
CMYK
0.000000
29.999200
54.999602
0.000000
_Paleocene
PROCESS
100.000000
CMYK
0.000000
34.999600
54.999602
0.000000
__Paleogene
PROCESS
100.000000
CMYK
0.000000
40.000001
60.000002
0.000000
___Cenozoic
PROCESS
100.000000
CMYK
4.998900
0.000000
89.999199
0.000000
Maastrichtian
PROCESS
100.000000
CMYK
4.998900
0.000000
44.998899
0.000000
Campanian
PROCESS
100.000000
CMYK
9.999200
0.000000
49.999201
0.000000
Santonian
PROCESS
100.000000
CMYK
14.999600
0.000000
54.999602
0.000000
Coniacian
PROCESS
100.000000
CMYK
20.000000
0.000000
60.000002
0.000000
Turonian
PROCESS
100.000000
CMYK
24.998900
0.000000
64.998901
0.000000
Cenomanian
PROCESS
100.000000
CMYK
29.999200
0.000000
69.999200
0.000000
_UpperCretaceous
PROCESS
100.000000
CMYK
34.999600
0.000000
74.999601
0.000000
Albian
PROCESS
100.000000
CMYK
20.000000
0.000000
40.000001
0.000000
Aptian
PROCESS
100.000000
CMYK
24.998900
0.000000
44.998899
0.000000
Barremian
PROCESS
100.000000
CMYK
29.999200
0.000000
49.999201
0.000000
Hauterivian
PROCESS
100.000000
CMYK
34.999600
0.000000
54.999602
0.000000
Valanginian
PROCESS
100.000000
CMYK
40.000001
0.000000
60.000002
0.000000
Berriasian
PROCESS
100.000000
CMYK
44.998899
0.000000
64.998901
0.000000
_LowerCretaceous
PROCESS
100.000000
CMYK
44.998899
0.000000
69.999200
0.000000
__Cretaceous
PROCESS
100.000000
CMYK
49.999201
0.000000
74.999601
0.000000
Tithonian
PROCESS
100.000000
CMYK
14.999600
0.000000
0.000000
0.000000
Kimmeridgian
PROCESS
100.000000
CMYK
20.000000
0.000000
0.000000
0.000000
Oxfordian
PROCESS
100.000000
CMYK
24.998900
0.000000
0.000000
0.000000
_LateJurassic
PROCESS
100.000000
CMYK
29.999200
0.000000
0.000000
0.000000
Callovian
PROCESS
100.000000
CMYK
24.998900
0.000000
4.998900
0.000000
Bathonian
PROCESS
100.000000
CMYK
29.999200
0.000000
4.998900
0.000000
Bajocian
PROCESS
100.000000
CMYK
34.999600
0.000000
4.998900
0.000000
Aalenian
PROCESS
100.000000
CMYK
40.000001
0.000000
4.998900
0.000000
_MiddleJurassic
PROCESS
100.000000
CMYK
49.999201
0.000000
4.998900
0.000000
Toarcian
PROCESS
100.000000
CMYK
40.000001
4.998900
0.000000
0.000000
Pliensbachian
PROCESS
100.000000
CMYK
49.999201
4.998900
0.000000
0.000000
Sinemurian
PROCESS
100.000000
CMYK
60.000002
4.998900
0.000000
0.000000
Hettangian
PROCESS
100.000000
CMYK
69.999200
4.998900
0.000000
0.000000
_LowerJurassic
PROCESS
100.000000
CMYK
74.999601
4.998900
0.000000
0.000000
__Jurassic
PROCESS
100.000000
CMYK
80.000001
0.000000
4.998900
0.000000
Rhaetian
PROCESS
100.000000
CMYK
9.999200
24.998900
0.000000
0.000000
Norian
PROCESS
100.000000
CMYK
14.999600
29.999200
0.000000
0.000000
Carnian
PROCESS
100.000000
CMYK
20.000000
34.999600
0.000000
0.000000
_UpperTriassic
PROCESS
100.000000
CMYK
24.998900
40.000001
0.000000
0.000000
Ladinian
PROCESS
100.000000
CMYK
20.000000
44.998899
0.000000
0.000000
Anisian
PROCESS
100.000000
CMYK
24.998900
49.999201
0.000000
0.000000
_MiddleTriassic
PROCESS
100.000000
CMYK
29.999200
54.999602
0.000000
0.000000
Olenekian
PROCESS
100.000000
CMYK
29.999200
64.998901
0.000000
0.000000
Induan
PROCESS
100.000000
CMYK
34.999600
69.999200
0.000000
0.000000
_LowerTriassic
PROCESS
100.000000
CMYK
40.000001
74.999601
0.000000
0.000000
__Triassic
PROCESS
100.000000
CMYK
49.999201
80.000001
0.000000
0.000000
___Mesozoic
PROCESS
100.000000
CMYK
60.000002
0.000000
4.998900
0.000000
Changhsingian
PROCESS
100.000000
CMYK
0.000000
24.998900
20.000000
0.000000
Wuchiapingian
PROCESS
100.000000
CMYK
0.000000
29.999200
24.998900
0.000000
_Lopingian
PROCESS
100.000000
CMYK
0.000000
34.999600
29.999200
0.000000
Capitanian
PROCESS
100.000000
CMYK
0.000000
40.000001
34.999600
0.000000
Wordian
PROCESS
100.000000
CMYK
0.000000
44.998899
40.000001
0.000000
Roadian
PROCESS
100.000000
CMYK
0.000000
49.999201
44.998899
0.000000
_Guadalupian
PROCESS
100.000000
CMYK
0.000000
54.999602
49.999201
0.000000
Kungurian
PROCESS
100.000000
CMYK
9.999200
44.998899
40.000001
0.000000
Artinskian
PROCESS
100.000000
CMYK
9.999200
49.999201
44.998899
0.000000
Sakmarian
PROCESS
100.000000
CMYK
9.999200
54.999602
49.999201
0.000000
Asselian
PROCESS
100.000000
CMYK
9.999200
60.000002
54.999602
0.000000
_Cisuralian
PROCESS
100.000000
CMYK
4.998900
64.998901
60.000002
0.000000
__Permian
PROCESS
100.000000
CMYK
4.998900
74.999601
74.999601
0.000000
Gzhelian
PROCESS
100.000000
CMYK
20.000000
9.999200
14.999600
0.000000
Kasimovian
PROCESS
100.000000
CMYK
24.998900
9.999200
14.999600
0.000000
_UpperrPennsylvanian
PROCESS
100.000000
CMYK
24.998900
9.999200
20.000000
0.000000
Moscovian
PROCESS
100.000000
CMYK
29.999200
9.999200
20.000000
0.000000
_MiddlePennsylvanian
PROCESS
100.000000
CMYK
34.999600
9.999200
20.000000
0.000000
Bashkirian
PROCESS
100.000000
CMYK
40.000001
9.999200
20.000000
0.000000
_LowerPennsylvanian
PROCESS
100.000000
CMYK
44.998899
9.999200
20.000000
0.000000
_Pennsylvanian
PROCESS
100.000000
CMYK
40.000001
9.999200
20.000000
0.000000
Serphukhovian
PROCESS
100.000000
CMYK
24.998900
14.999600
54.999602
0.000000
_UpperMississippian
PROCESS
100.000000
CMYK
29.999200
14.999600
54.999602
0.000000
Visean
PROCESS
100.000000
CMYK
34.999600
14.999600
54.999602
0.000000
_MiddleMississippian
PROCESS
100.000000
CMYK
40.000001
14.999600
54.999602
0.000000
Tournaisian
PROCESS
100.000000
CMYK
44.998899
14.999600
54.999602
0.000000
_LowerMississippian
PROCESS
100.000000
CMYK
49.999201
14.999600
54.999602
0.000000
_Mississippian
PROCESS
100.000000
CMYK
60.000002
24.998900
54.999602
0.000000
__Carboniferous
PROCESS
100.000000
CMYK
60.000002
14.999600
29.999200
0.000000
Famennian
PROCESS
100.000000
CMYK
4.998900
4.998900
20.000000
0.000000
Frasnian
PROCESS
100.000000
CMYK
4.998900
4.998900
29.999200
0.000000
_UpperDevonian
PROCESS
100.000000
CMYK
4.998900
9.999200
34.999600
0.000000
Givetian
PROCESS
100.000000
CMYK
4.998900
9.999200
44.998899
0.000000
Eifelian
PROCESS
100.000000
CMYK
4.998900
14.999600
49.999201
0.000000
_MiddleDevonian
PROCESS
100.000000
CMYK
4.998900
20.000000
54.999602
0.000000
Emsian
PROCESS
100.000000
CMYK
9.999200
14.999600
49.999201
0.000000
Pragian
PROCESS
100.000000
CMYK
9.999200
20.000000
54.999602
0.000000
Lochkovian
PROCESS
100.000000
CMYK
9.999200
24.998900
60.000002
0.000000
_LowerDevonian
PROCESS
100.000000
CMYK
9.999200
29.999200
64.998901
0.000000
__Devonian
PROCESS
100.000000
CMYK
20.000000
40.000001
74.999601
0.000000
_Pridoli
PROCESS
100.000000
CMYK
9.999200
0.000000
9.999200
0.000000
Ludfordian
PROCESS
100.000000
CMYK
14.999600
0.000000
9.999200
0.000000
Gorstian
PROCESS
100.000000
CMYK
20.000000
0.000000
9.999200
0.000000
_Ludlow
PROCESS
100.000000
CMYK
24.998900
0.000000
14.999600
0.000000
Homerian
PROCESS
100.000000
CMYK
20.000000
0.000000
14.999600
0.000000
Sheinwoodian
PROCESS
100.000000
CMYK
24.998900
0.000000
20.000000
0.000000
_Wenlock
PROCESS
100.000000
CMYK
29.999200
0.000000
20.000000
0.000000
Telychian
PROCESS
100.000000
CMYK
24.998900
0.000000
14.999600
0.000000
Aeronian
PROCESS
100.000000
CMYK
29.999200
0.000000
20.000000
0.000000
Rhuddanian
PROCESS
100.000000
CMYK
34.999600
0.000000
24.998900
0.000000
_Llandovery
PROCESS
100.000000
CMYK
40.000001
0.000000
24.998900
0.000000
__Silurian
PROCESS
100.000000
CMYK
29.999200
0.000000
24.998900
0.000000
Hirnantian
PROCESS
100.000000
CMYK
34.999600
0.000000
29.999200
0.000000
Katian
PROCESS
100.000000
CMYK
40.000001
0.000000
29.999200
0.000000
Sandbian
PROCESS
100.000000
CMYK
44.998899
0.000000
40.000001
0.000000
_UpperOrdovician
PROCESS
100.000000
CMYK
49.999201
0.000000
40.000001
0.000000
Darriwilian
PROCESS
100.000000
CMYK
54.999602
0.000000
34.999600
0.000000
Dapingian
PROCESS
100.000000
CMYK
60.000002
0.000000
40.000001
0.000000
_MiddleOrdovician
PROCESS
100.000000
CMYK
69.999200
0.000000
49.999201
0.000000
Floian
PROCESS
100.000000
CMYK
74.999601
0.000000
44.998899
0.000000
Tremadocian
PROCESS
100.000000
CMYK
80.000001
0.000000
49.999201
0.000000
_LowerOrdovician
PROCESS
100.000000
CMYK
89.999199
0.000000
60.000002
0.000000
__Ordovician
PROCESS
100.000000
CMYK
100.000000
0.000000
60.000002
0.000000
Stage10
PROCESS
100.000000
CMYK
9.999200
0.000000
20.000000
0.000000
Jiangshanian
PROCESS
100.000000
CMYK
14.999600
0.000000
24.998900
0.000000
Paibian
PROCESS
100.000000
CMYK
20.000000
0.000000
29.999200
0.000000
_Furongian
PROCESS
100.000000
CMYK
29.999200
0.000000
40.000001
0.000000
Guzhangian
PROCESS
100.000000
CMYK
20.000000
4.998900
29.999200
0.000000
Drumian
PROCESS
100.000000
CMYK
24.998900
4.998900
34.999600
0.000000
Wuliuan
PROCESS
100.000000
CMYK
29.999200
4.998900
40.000001
0.000000
_Miaolingian
PROCESS
100.000000
CMYK
34.999600
4.998900
44.998899
0.000000
Stage4
PROCESS
100.000000
CMYK
29.999200
9.999200
40.000001
0.000000
Stage3
PROCESS
100.000000
CMYK
34.999600
9.999200
44.998899
0.000000
_Series2
PROCESS
100.000000
CMYK
40.000001
9.999200
49.999201
0.000000
Stage2
PROCESS
100.000000
CMYK
34.999600
14.999600
44.998899
0.000000
Fortunian
PROCESS
100.000000
CMYK
40.000001
14.999600
49.999201
0.000000
_Terreneuvian
PROCESS
100.000000
CMYK
44.998899
14.999600
54.999602
0.000000
__Cambrian
PROCESS
100.000000
CMYK
49.999201
20.000000
64.998901
0.000000
___Paleozoic
PROCESS
100.000000
CMYK
40.000001
9.999200
40.000001
0.000000
____Phanerozoic
PROCESS
100.000000
CMYK
40.000001
0.000000
4.998900
0.000000
__Ediacaran
PROCESS
100.000000
CMYK
0.000000
14.999600
54.999602
0.000000
__Cryogenian
PROCESS
100.000000
CMYK
0.000000
20.000000
60.000002
0.000000
__Tonian
PROCESS
100.000000
CMYK
0.000000
24.998900
64.998901
0.000000
___NeoProterozoic
PROCESS
100.000000
CMYK
0.000000
29.999200
69.999200
0.000000
__Stenian
PROCESS
100.000000
CMYK
0.000000
14.999600
34.999600
0.000000
__Ectasian
PROCESS
100.000000
CMYK
0.000000
20.000000
40.000001
0.000000
__Calymmian
PROCESS
100.000000
CMYK
0.000000
24.998900
44.998899
0.000000
___MesoProterozoic
PROCESS
100.000000
CMYK
0.000000
29.999200
54.999602
0.000000
__Statherian
PROCESS
100.000000
CMYK
0.000000
54.999602
9.999200
0.000000
__Orosirian
PROCESS
100.000000
CMYK
0.000000
60.000002
14.999600
0.000000
__Rhyacian
PROCESS
100.000000
CMYK
0.000000
64.998901
20.000000
0.000000
__Siderian
PROCESS
100.000000
CMYK
0.000000
69.999200
24.998900
0.000000
___Paleoproterozoic
PROCESS
100.000000
CMYK
0.000000
74.999601
29.999200
0.000000
____Proterozoic
PROCESS
100.000000
CMYK
0.000000
80.000001
34.999600
0.000000
__Neoarchean
PROCESS
100.000000
CMYK
0.000000
34.999600
4.998900
0.000000
___Neoarchean
PROCESS
100.000000
CMYK
0.000000
40.000001
4.998900
0.000000
__Mesoarchean
PROCESS
100.000000
CMYK
0.000000
49.999201
4.998900
0.000000
___Mesoarchean
PROCESS
100.000000
CMYK
0.000000
60.000002
4.998900
0.000000
__Paleoarchean
PROCESS
100.000000
CMYK
0.000000
60.000002
0.000000
0.000000
___Paleoarchean
PROCESS
100.000000
CMYK
0.000000
74.999601
0.000000
0.000000
__Eoarchean
PROCESS
100.000000
CMYK
4.998900
89.999199
0.000000
0.000000
___Eoarchean
PROCESS
100.000000
CMYK
9.999200
100.000000
0.000000
0.000000
____Archean
PROCESS
100.000000
CMYK
0.000000
100.000000
0.000000
0.000000
____Hadean
PROCESS
100.000000
CMYK
29.999200
100.000000
0.000000
0.000000
_____Precambrium
PROCESS
100.000000
CMYK
0.000000
74.999601
29.999200
0.000000
50c 10m 10y 0k
PROCESS
100.000000
CMYK
49.999201
9.999200
9.999200
0.000000
PANTONE Process Blue C 1
SPOT
100.000000
RGB
1
130
172
PANTONE 1615 C
SPOT
100.000000
LAB
39.215687
28
37
PANTONE 716 C
SPOT
100.000000
LAB
63.529411
42
74
PANTONE 201 CVC
SPOT
100.000000
CMYK
0.000000
100.000000
64.999998
34.000000
endstream
endobj
3 0 obj
<>
endobj
5 0 obj
<>/ExtGState<>/Font<>/ProcSet[/PDF/Text]/Shading<>>>/TrimBox[0.0 0.0 1190.55 900.438]/Type/Page>>
endobj
6 0 obj
<>stream
H,*nC`rO6*qbtka.G/_?U~ؕ$_?g?_G'>\9$k8*zqWǟAΫs]/J켗+%*պY!vrlb] ~S2@G=1bndpFO8YZ<bF8Ppa[wy>PpC-GCdO-
mojL3݂@LD܊ !flPp4B-oM ߨ,=lygR8ݐ +6Dj
GtB8rCtr
8h:O2$͆H6J-/szU'{9A0/S!7sBR(9o؋9,[5B-2GVkAB;$VLHܡ29;"To(Zam9R}E.υ^gJ!HAe^#ȃI=I4.8mw]&FD[zE31kBg h^np
6emdQ>~vY!%j$hIOͨ>̩u1H{' ݝ˾PLJb%TV8j
j~e!D(r@eaoB4GcƂ=m`bԻ= xk;Ki!buV= ԓ[O'q^US
)*|z HԤn9/Bbd6>?pe
+%Tl@{cM`=ls#(S$Zt:gfF QE2Tuh= aB=Mè)acJ@8%T#pt|*.ESzc8߳ɚ-kjVe6j}J@~ lscfeHᢖEY'+KKtbgXY>L0HBG+{)6bŠa{rnҗY{Way wF2?(kc`ϙMdWD=KJc-0
Z Eb ~$Zc"FtiqL`Xi;rYK
qzĈB>66$߫]AoUM̻5{9c~tBO>id7㣹J_շƤl«ٯALmpr;@3`
Hr(7fG̪ӠN3.h}~0cLkGh^HsAR!Q;D7#='.jlaj弈r^>Z=,_{5._?c[9_JTD>~G=.\2,kC瀋;j,j:e75>EmavQO&vi皶-ivMKcxӍ-)Y%Cr˞|t?0Ũu}d*8*I{>I8~z]}ꏅP\ZvN˝jB*XvGrw`1c\=,4wy!;JÁebRoϵMiԱ]jAc/PoQ4"c[ʓF+ۺ%"XDql{5,u&(&(wsX֤,
i}9CDnI2(#
Pj?6ad l+1-2i$b= FQcfUϣD5(H+EgMpɫY
rZr_a98idns^%w8CRK)8
NU&}k__+B7m+ۅaEFBpZ`-(U OTO
3-afP|AB0x' |I>S1һu͖lLQg@$.b!bӪZd8R =ZRfm`ڽC)Tv7R!B
ZNx+|}0BKh ȣ^B{HtTsS4zOOa61_5)qZ>KFe'dfPku(SjMfz]w&3y2x
p`ם$F5CR.of./x{Z-}Z>4J
W}ڤ6rBeC/LH?#JōC~=`k/?%l9ux+(0ms1ֹAߟ[yj@1!_OmA~&φ/ua:։<Z_.QR?lђCX_.uR7k+a},BNF/ejpLmd,-EaX0-aHSy},\oy&cbZ_%IRPݙh61/6}Z1͠66]̽]_R+OCi?
u5i?
4T}Cu~h[wm.s8zʘNYP{Uڽズ[.|Wmue>tf"(sIjDWBFK8P,'tp6WïRsE-EscMVMbbKKmG6â[YڞIώ6ʛPY9\r<66o%c\ZkPCsrQ䢜tB)^aT2/`ߧ_mC1S/OiU
0]Eolzby0g<_~q~_&/߿.ϙnõU䝯[ȟ=1DsĶ^mtʀE6J-^F(i]֧/sܘ2y;Sȟ#wf/?@{|7|\kȭ*$Gcw{t
Z[32T1]uZ1x.U`88A#TqzC,]i^%ˊk/4>uzTVgߜYcEG7Λknz9!mc
WAycP~7?4
*[g
mˡA3(B+ڡ-EÁE_cQL
MC5
V!PE_CʐEh@ȌizdP1TJiNQOoplϋ|wA=qr:=cħ_q!OV3
gwZ㝶x+(ZLԡMPq=CT&4Ar(QyMZ=)ЫN_AЪ?]ZzuϘC.C>[/qhEj@CPۯph/9WB>;W94e
;[#}djܾC!_ѐCs)D_PG!{ED*~c^@ȏ:rvshUʥ^3PN2IwPr('|H)<͡!ᭌ/sWP8wCyGzuϘCOsCaS=o{jC
{)W6+k֡r\m|=rs16ݔ$R,X?*~c6lߴV
5Ы[ ;MlS'%L"#3u siyD7f|PX89Wacb*0EjVxb[Vcui)ς ڂ-M:U>S<jKޞ_ybIm@3ʄ+&:gKs;`3M5tc[S'W¦K_f\<Ãx`Lx2]p!wlNeDoW:S([S%y<#2Ibt
eaհܚ/{(;0&w=Z%G1ʖ,H@ҧ;ײlJqP(;FrJ !ݮrTWuSwZ}`Ukof{zUu V;J=<2U8L:Jkr5,;<@}зQVKxWDGٞ^5.O.ӔlMcQ-(!Ykٲcl/Eٜ\-tc'볆\knUe@7)UgLJ&AX6Wr)e-?icِ1c
r
)saF9(sܡ!J
U,XAunS->&ِ1%NEhHƖtPz26od;js@gy<c5Nɱ!cLs2ѭ5$[ҫa})'eJɱuْڡL&N"*46ugչ
eb6Wɹ).twE$fKr392]Bx]6'W2IԽ4c;Ʋ "д5,|!vm-kr)#'r>2Uetg9,SxrqJ)h'!r\U' ~*u짤eKrFHH!YaIe*<(5V,;2)pJϞG{z54Kr[ٜ\-t);Л0[S%yꜢ,R;Tɵ`UNQM=bYB(ݦ?K#m:Җ54ԫ*|xGlR%cg<aEt-3K:짐B[@血mOBD~)-"C$l)" 9k`;^>SCk
Gl[ӭ:_5O-|CDX4>kiDKy|lMS,{lOpܟ
V\{쒏E['$t7BgszUiS:5#?hi8Z*B=g3_I8)|Q 't,'bf}IP-TR%$d:=:մDru2z/<:U&c#@H|9XC_/v@bC$"2X] ƴTZ"r@FDE.Dȴ+"-L#$CcNr3eQ&8Pj/-=_gwr͉#>8\齔7p{@v3NY/S?&Nݷ>5ۛZq8`1`ٝ\svfh3
!sII@ٓ\;״P?I=|͟kYb?ȟ53vgg_/xП=ɵyهYxv%kg/O HgK4;Cx.ٕkkwd٩`M²owH;le6 D0`v!CԌ?vo1`Yv%ѹ,5D>5d]Dڕ`sP9Cڟk#ᵑ5nxC)[vQV>,@{k/Լ89Ͼ^Zr%LtiXgshWz]ii2h})ڡ`т)
Ohf [sayv(Jt⃐s}Dtn@!+G;lMعEKxH早×K#'VS@G# | d'7xJ١C]vJ5fkI5q4G:NF<L%ϩaBwЗKZY$4$( mK
lQBF+0) #_D+[m%A@qӧBCVUZP0]L1cW37fNe!c2+9jŞ=51)ݹ@zM.9gwz-Dk26Oڟ^+>p?x;ּAy×KyZs+g<3Յ 7l$_v*BJB
ےɌ:I]q |$.FK"p>N`[$Zea}
TypTvSi#= ) 9D;|FtMPWBV\iu11DdD]ʵ܅A`xǗh9%={Tk>uWgso,X-8[.% fov(ؚKKK>9Ͼ^υ")IDN't!r´?gL3UȎK?P|IIII7DH:A}v*´JBFRLvDLȇrk=8tKp:%s8w ֗hv*UQ1+g~gz͙Cj[rMn_d2DWzsa-93}/p{i.̸n # = @ͦ\#glSLV+ Vfd+}^?-P!uMk3ՁV=57-LeeKYˠ=R+Q(UkDeO߽#Ј
jӷ_ߪK ^-<.(MIc:Ejۙ u$6}N炗=unmcݤu],J;L%;ZfR{Z* eZ0Wٌ$+eu+td^P'Zm[
uzצe
DvLY9UmZk^,Yux:<)ڶ,/iGUTγ6*xw
J{YUamzy4֪"eg5xF}mz(k=TėU]d{M/
#s/չjVVF