Aulum (100x77x52) - Office JYSK - Free user manual and instructions
Find the device manual for free Aulum (100x77x52) JYSK in PDF.
| Product type | Desk |
| Brand | JYSK |
| Model | Aulum (100x77x52) |
| Dimensions (W x D x H) | 100 x 52 x 75 cm |
| Desktop dimensions | 100 x 52 x 11.8 cm |
| Leg dimensions | 5 x 5 x 75 cm |
| Materials | Particle board, steel |
| Color | Not specified (usually white or light wood) |
| Estimated net weight | 20 kg |
| Maximum supported load | 50 kg (estimate) |
| Number of legs | 4 |
| Assembly type | Self-assembly (instructions provided) |
| Tools required | Screwdriver, Allen key (provided) |
| Care and cleaning | Clean with a damp cloth, avoid abrasive products |
| Usage | Home office, work, study |
| Warranty | 2 years (according to JYSK terms) |
| Spare parts | Available upon request from JYSK |
| Repairability | Possible with replacement parts |
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USER MANUAL Aulum (100x77x52) JYSK
m = 311
R
R
R
R
R
R
R
R
R
R
F
R
R
R
R
R
R
R
R
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
F
F
F
F
F
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
1
1
1
1 + u8 = 6 + ( 1 - u) u8 >
1
1
1
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1
1
1
1
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1
1
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1
1
1 + u7 = 7 + 1 > ( 1 + u) u7 = u
1
1
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1
1
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1
1
1
1 + u8 = 6 + ( 1 - u) u8 >
m = 311
-
m - 1 0 ;
m = 311
m = 311
m - 1 0 ;
m = 311
m - 1 0 ;
m = 311
m - 1 0 ;
m = 311
m - 1 0 ;
m = 311
12x - 1 > 0
m - 1 0 ;
m = 311
13
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
(1)
1 + u7 = 4.8
1,2,3 1,3,4 2,3,4 3,4,5 4,5,6 5,6 6,7 7,8 8,9 9,10 10,11 11,12 12,13 13,14 14,15 15,16 16,17 17,18 18,19 19,20 20,21 21,22 22,23 23,24 24,25 25,26 26,27 27,28 28,29 29,30 30,31 31,32 32,33 33,34 34,35 35,36 36,37 37,38 38,39 39,40 40,41 41,42 42,43 43,44 44,45 45,46 46,47 47,48 48,49 49,50 50,51 51,52 52,53 53,54 54,55 .
≥
( x - 1) ( x + 3) = 0
( xt^2 - 5x^2) t + xy^2 = ( x) f^
( xt^2 - 5x^2) t + xy^2 = ( x) f^
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 1) ( x + 3) = 0
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 1) ( x + 3) = 0
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
≤
m - 1 0 ;
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
QXO
(1)
4.2
1 + u7 = 40
m - 1 0 ;
( x - 2x) t - xy^2 = ( x - 2x) f^ t
5 - 12 = 2
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
( x - 2x) t - xy^2 = ( x - 2x) f^ t
1 + u1 - 1 = ( 1 + u) u1 < 1 = u
( x - 1) ( x + 3) = 0
1 + u8 = 6 + ( 1 - u) u8 >
m - 1 0 ;
m - 1 0 ;
m = 311
E
m = 311
m = 311
m = 311 ;
m = 311
m = 311
(1)
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