, W a t t a g e   C o m m e n t s # # O T H E R # # , W a t t a g e # # E L E C T R I C A L _ W A T T A G E # # W A T T S , W E I G H T   L B # # O T H E R # # , V o l t a g e   L o s s # # O T H E R # # , V O L T A G E   R A N G E   V # # O T H E R # # , V O L T A G E # # E L E C T R I C A L _ P O T E N T I A L # # V O L T S , U R L # # O T H E R # # , T o t a l   L i g h t   L o s s   F a c t o r # # O T H E R # # , T i l t   A n g l e # # A N G L E # # D E G R E E S , T e m p e r a t u r e   L o s s # # O T H E R # # , T e m p e r a t u r e   C o l o r # # O T H E R # # , T E C H N I C A L   S H E E T # # O T H E R # # , S u r f a c e   D e p r e c i a t i o n   L o s s # # O T H E R # # , P h o t o m e t r i c   W e b   F i l e # # O T H E R # # , P R O D U C T   S H E E T # # O T H E R # # , P R O D U C T   C O D E # # O T H E R # # , N o n e # # O T H E R # # , N O I S E   A B S O R P T I O N   C O E F F I C I E N T   ( N R C ) # # O T H E R # # , M o d e l # # O T H E R # # , M a n u f a c t u r e r # # O T H E R # # , M A T E R I A L   D E S C R I P T I O N # # O T H E R # # , L u m i n o u s   I n t e n s i t y # # E L E C T R I C A L _ L U M I N O U S _ I N T E N S I T Y # # C A N D E L A S , L u m i n o u s   F l u x # # E L E C T R I C A L _ L U M I N O U S _ F L U X # # L U M E N S , L u m i n a i r e   D i r t   D e p r e c i a t i o n # # O T H E R # # , L i g h t   L o s s   I n p u t   M e t h o d # # O T H E R # # , L i g h t   L o s s   F a c t o r # # O T H E R # # , L a m p   T i l t   L o s s # # O T H E R # # , L a m p   L u m e n   D e p r e c i a t i o n # # O T H E R # # , L a m p # # O T H E R # # , L E N G H T # # L E N G T H # # I N C H E S , I n i t i a l   L i g h t   I n t e n s i t y   I n p u t   M e t h o d # # O T H E R # # , I n i t i a l   I n t e n s i t y # # O T H E R # # , I n i t i a l   C o l o r   T e m p e r a t u r e # # C O L O R _ T E M P E R A T U R E # # K E L V I N , I n i t i a l   C o l o r # # O T H E R # # , I l l u m i n a n c e # # E L E C T R I C A L _ I L L U M I N A N C E # # L U X , I L L U M I N O T E C H N I C A L   P E R F O R M A N C E # # O T H E R # # , H E I G H T # # L E N G T H # # I N C H E S , F R E Q U E N C Y   R A N G E   H z # # O T H E R # # , E m i t   f r o m   C i r c l e   D i a m e t e r # # L E N G T H # # I N C H E S , E m i t   S h a p e   V i s i b l e   i n   R e n d e r i n g # # O T H E R # # , E f f i c a c y # # E L E C T R I C A L _ E F F I C A C Y # # L U M E N S _ P E R _ W A T T , D i m m i n g   L a m p   C o l o r   T e m p e r a t u r e   S h i f t # # O T H E R # # , D e s c r i p t i o n # # O T H E R # # , D e f a u l t   E l e v a t i o n # # L E N G T H # # I N C H E S , D E P H T # # L E N G T H # # I N C H E S , C o l o r   F i l t e r # # O T H E R # # , C O R D   L E N G T H   C O N T R O L # # L E N G T H # # I N C H E S , C O R D   L E N G T H # # L E N G T H # # I N C H E S , C O L O R   T E M P # # O T H E R # # , C O L O R   R E N D E R I N G   I N D E X # # O T H E R # # , C O E F F I C I E N T   O F   W E I G H T E N E D   A C O U S T I C   A B S O R P T I O N  ( w ) # # O T H E R # # , B a l l a s t   L o s s # # O T H E R # # , B I M   U S E R   M A N U A L # # O T H E R # # , B I M   B A D G E # # O T H E R # # , B I M   A U T H O R # # O T H E R # # , A t   a   d i s t a n c e # # L E N G T H # # I N C H E S , A p p a r e n t   L o a d # # E L E C T R I C A L _ A P P A R E N T _ P O W E R # # V O L T _ A M P E R E S , A C C E S S O R Y   C O D E # # O T H E R # # , A C C E S S O R I E S # # O T H E R # # , A B S O R P T I O N   C L A S S E S # # O T H E R # # 
 L U C E P L A N _ P E T A L _ D 7 1 P 1 L , , 6 5 . 0 0 0 0 0 0 0 0 0 0 0 0 , 2 1 , 1 , 1 2 0 - 2 7 7   V , 1 1 0 . 0 0 0 0 0 0 0 0 0 0 0 0 , w w w . l u c e p l a n u s a . c o m , 1 , - 9 0 . 0 0 0 0 0 0 0 0 0 0 0 0 , 1 , 0 , h t t p s : / / w w w . l u c e p l a n u s a . c o m / p r o d u c t s / p e t a l e - s u s p e n s i o n , 1 , P  t a l e _ D 7 1 6 D L _ 4 2 W   L E D   D L M . I E S , h t t p s : / / w w w . a r c h i p r o d u c t s . c o m / e n / p r o d u c t s / l u c e p l a n / l e d - f a b r i c - p e n d a n t - l a m p - p e t a l e _ 3 4 9 4 9 4 , 1 D 7 1 0 P 1 L 0 0 0 2 , IESNA:LM-63-2002
[TEST] 4787376336.1
[MANUFAC] PHILIPS LIGHTING ITALY
[LUMCAT] PETALE D71CL
[LUMINAIRE] PETALE D71CL
[TESTLAB] PHILIPS LIGHTING ITALY
[ISSUEDATE] 17 Mar 2016
[FLASHAREA] 0.074216
[LAMPCAT] LED
[LAMP] LED - 44.00 W
[OTHER] Absolute Photometry
TILT=NONE
1 -1 1.0 73 1 1 2 -0.350 -0.350 0.150
1.00 1.00 44.00
0.00 2.50 5.00 7.50 10.00 12.50 15.00 17.50 20.00 22.50 
25.00 27.50 30.00 32.50 35.00 37.50 40.00 42.50 45.00 
47.50 50.00 52.50 55.00 57.50 60.00 62.50 65.00 67.50 
70.00 72.50 75.00 77.50 80.00 82.50 85.00 87.50 90.00 
92.50 95.00 97.50 100.00 102.50 105.00 107.50 110.00 
112.50 115.00 117.50 120.00 122.50 125.00 127.50 130.00 
132.50 135.00 137.50 140.00 142.50 145.00 147.50 150.00 
152.50 155.00 157.50 160.00 162.50 165.00 167.50 170.00 
172.50 175.00 177.50 180.00 
0.00 
1295.51 1294.82 1292.24 1287.40 1279.36 1267.88 1252.32 
1233.21 1210.10 1183.17 1152.05 1117.52 1079.24 1038.21 
993.83 947.40 899.09 848.73 796.67 743.38 688.56 633.50 
579.04 525.89 474.21 424.09 375.68 329.14 284.77 243.11 
204.54 168.52 135.46 105.91 80.33 58.89 41.66 29.27 18.34 
5.88 0.90 1.39 1.67 1.84 1.95 2.23 2.51 2.82 3.10 3.45 
3.55 3.72 3.97 4.21 4.25 4.45 4.66 4.84 5.01 5.19 5.46 
5.67 6.02 6.16 6.44 6.72 7.07 7.27 7.52 7.41 7.24 7.10 
6.96 
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