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2objects objects - periods 2 to 6 2objectsobjects - period 6, other, sync
3objectsobjects - periods 2 to 5
4objectsobjects - periods 2 to 5 4objectsobjects - period 5, other
4objectsobjects - sync
5objectsobjects - periods 2 to 5 5objectsobjects - period 5
3objectsobjects - pd 6,other,mplex,sync
4objectsobjects - mplex, sync mplex
2 2
3
4 4
4 4
5 5
3
PERIOD 6
PERIOD 5
PERIOD 2 PERIOD 3 PERIOD 4 PERIOD 6
OTHER
SYNCHRONOUS
PERIOD 2 PERIOD 3
PERIOD 4
PERIOD 5
PERIOD 2 PERIOD 3
PERIOD 4
PERIOD 5 PERIOD 5 OTHER
SYNCHRONOUS
PERIOD 2
PERIOD 3 PERIOD 4 PERIOD 5 PERIOD 5
4 83031 24 84012 24 84030 25 61701 225 91401 2244 70251 144 70350 144 70611 145 70161 1245 70701 1245 90141 1245 90303 1245 90501 12
3451245141 45501 46131 46302464015244052512 525305514055203 56130 6314163501
64203 6611172330 73131 74130 4 51630 24 55050 24 57030 24 61251 24 61350 24 61611 24 81312 24 81330 2
PERIOD 6
OTHER
MULTIPLEX SYNCHRONOUS
6 66670 46 66814 46 66850 46 67570 46 67813 46 67840 46 66814 46 69244 46 69253 46 69514 46 69550 46 69613 46 75670 4
6 75814 46 75850 46 77272 46 77470 46 77812 46 77830 46 79234 46 79252 46 79414 46 79450 46 79612 46 79630 46 83572 4
6 83833 46 85570 46 85813 46 85840 46 86272 46 86470 46 86812 46 86830 46 89233 46 89413 46 89440 46 89512 46 89530 4
7 77911 447 83923 447 83941 447 84913 447 84940 447 86911 4466 66805 366 68173 366 69145 366 69163 366 69505 366 69703 366 75805 3
313 40 1
34030350113502041131414014500151112
312 330 411 4203 501 14 600 20
51130514005203055000611116112061201
340141124130440051115120
6130062011620206300164000
3 50140 13 50500 1
52015300
3 6011 13 6020 1
4 7001 20
3 70111 13 70120 13 70201 13 70300 14 80011 204 80020 205 90001 300
340401350130350400360111360120360201360300414030415011415020450030460011460020
511401515001520401560001611130611400612030615000620130620400630030660000711111
711120711201711300712011712020
713001714000720111720120720201
720300730011730020740001750000
3 506001 13 601500 13 606000 13 801111 13 801120 1
3 801201 13 801300 13 802011 13 802020 13 803001 1
3 804000 14 900111 204 900120 204 900201 204 900300 20
3401411340501136014003701111370300141601115111411
71111307700000811111181400018500001
9111111191113001
91140001 414050130
3 5070011 13 6011501 13 6016001 13 7011140 1
3 7030040 13 7070000 13 9030011 14 7007000 20
3 70111501 13 507006000 13 701170011 1
(2x,2x)(4,2x)(2x,0)(2x,4)(0,2x)
42 4 51 245 60 12
4440451245305241534055115520
423441522531
4 450 2
4440451245305241534055115520
62226231631263306411
4 7131 24 7401 2
4 612 2 4 630 2 5 711 2244 603 146 801 122 5 5700 22 5 8130 22 6 9111 222 6 9300 22244 6051 144 7041 145 8013 1245 8040 12
451512461241461511471231471312525141526122526131
622512631512722241723141731241
4 615600 24 713151 24 913131 2
45161316316131
4530534036316166001
451640164500564006415041714014714700741701740041
7330730370330
4 5505051 24 6161601 24 7141404 25 71701701 2245 6050505 12
1[42]222[32]23[31]24[21]
4 1[51]2 2521[43]0
2 [31][21]2 2[32] 4 1[11][42] 2
(4,2)(4x,2x)(2x,4)*
(4,4)(4,0) (4,6x)(2x,0) (4x,4x)(4,0) (4x,6x)(2,0) (6,4x)(2x,0) (6,4)(2,0) (6,2)(2,2)
(6,2)(2x,2x)(2x,6x) (8,2x)(2x,0) (2,2)
(4,4) (6,0)(2,4) (4,0)(4,4) (6,0)(4x,2x) (4,0)
[32] 4 1[11][42] 2
4 1[51]2 244 20[43] 1
46 20[61] 122
535 62 3
56 71 23
534552633642
55515623564163526451662266317333
73427423744175227531
5 5560 3
5 561 35 723 35 741 36 822 33
6 831 3355 660 255 714 257 912 233
5 5713 35 6712 35 8233 35 8413 35 8512 36 9223 336 9241 336 9313 33
55 7162 255 8134 255 8152 256 9124 2356 9151 23
67223672416731373352734517362273631742527461275251772227723177312
55550556135625256612572335724257413575126355163623636416461366251
83333833428342383441835228353184233845128522385241853138622286231
863125 58133 35 58142 35 66161 35 68123 35 68141 35 72461 35 72722 35 72731 35 75161 35 78122 35 78131 3
5 92333 35 92342 35 92423 35 92441 35 92522 35 92531 35 94133 35 94142 35 95123 35 95141 35 96122 35 96131 3
6 72812 3355 81362 255 81461 255 81722 255 81731 255 91334 255 91352 255 91424 255 91451 255 91622 255 91631 256 81812 23 5 571731 3
5 6716161 3
566151575151577131733551747141736251
456712355615516357142636615163741526461641
445571335626252556716151
8441841481441
(4,4)(4x,4x)
(4,6x)(2x,4)(4,6x)(4x,2)(4,6)(4,2)
(4,6)(2x,4x)(4x,6x)(2,4)
(4x,6x)(4x,2x)(4x,6)(4,2x)(4x,6)(2,4x)
(6,4x) (2x,6x) (2x,4)
(6,4) (2,6)(2x,6x) (2,4)(4,6) (2x,8x)(2x,4x) (2x,4x)(4,6) (2x,8)(4,2x) (2x,4x)(6,4) (4x,6)(0,6x) (2,4)(6,4x) (4x,6x)(6,0) (2x,4)(4x,6x) (6x,2x)*(2,4)
(6,4x) (2x,8)(2x,4)* (2x,4)(6,4x) (6x,2)(2x,6)* (2x,4)(4x,6x) (8x,2x)(2x,4x)(2x,6x) (2,4)(4,6x) (2x,8)(4,2)(8,2)(4,2x) (2x,4)
(6,4) (6x,4)(0,6x) (2,4)(6,4x) (6,4)(6,0) (2x,4)(4,6x) (8,2)(2x,4x) (2x,4)(6x,4) (8x,2x)(4x,2x) (2,4x)
MULTIPLEX
SYNCHRONOUS MULTIPLEX
1[53]52 1[63]42 1[65]22 23[53]3 23[54]2 24[54]1 1[54]2
23[43] 5 22[53] 3
556 20[64] 40 557 20[73] 403
(6,6) (2,4)([4x4],2x) (2,2)(2,4x)([4x4],2)(2,2x)([6x6],0)
25[53]1 26[43]1 5 1[75]12 3 5 22[63]3 3 5 22[64]2 3 5 24[64]0 3
5 25[63]0 3 5 27[43]0 3 6 22[74]1 33 6 23[74]0 33 7 1[93]12 333 6 22[83]1 333
7 23[83]0 333 55 1[76]02 2558 20[94]1 4033 1[74]242 1[76]312 23[53]52
23[54]5123[64]2323[64]4123[65]31
24[65]12 5 22[54]61 3
(4,6x)(2x,2)(2x,[44x]) (4,6)(2x,2)(2,[44x])
(6x,4x)(2x,2)(2,[44x])
(4x,2)(2,[64x])(2x,4x) (4,2)(2x,[6x4x])(2x,4)
(4x,6x) (6x,2x)(2x,2)(2,[6x4]) (2,4)(4,6x) (2x,2)(2x,[6x4])(6,2x) (2x,4)(4,6x) (6x,2)(2x,2)(2,[6x4x]) (2x,4)(4,6) (6x,2)(2,2x)([6x4],2x) (2x,4x)
646 73 4
67 82 34678 91 234
6789 a0 1234
645 663 744 753
6 672 4 6 834 4 6 852 4
7 933 44 7 942 4466 771 366 825 366 861 3
667 915 24
6662673467527463756277337742844484538534855286338642
66661667246675167363675616772367741683446835368524685516862368641
6 6671 46 6824 4 6 6851 4 6 7571 46 7823 46 7841 46 9344 46 9353 46 9524 46 9551 46 9623 46 9641 47 7922 4
47 7931 4466 6815 366 8273 366 8813 366 9245 366 9263 366 9515 366 9713 3
67 8912 3477 9281 33666 8174 2666 9155 2666 9164 2
74662747347475275661757247575177362774617773178334783527842478451
78631844638456284733853638556185723857418636286461867318833394444
5objectsobjects - period 5, other 5objectsobjects - other, sync 2 & 4
5objectsobjects - sync 4 & 6 5objectsobjects - sync 8, mplex
5objectsobjects - mplex, sync mplex 5objectsobjects - sync mplex
6objectsobjects - pd 2 to 6, other, sync
7objectsobjects - all
6objectsobjects - sync, mplex, sync mplex
5 5
5
5 5
6
5
6
7
PERIOD 5 OTHER OTHER SYNCHRONOUS PERIOD 2
SYNCHRONOUS PERIOD 4
SYNCHRONOUS PERIOD 4
SYNCHRONOUS PERIOD 6
SYNCHRONOUS PERIOD 8 MULTIPLEX
SYNCHRONOUS MULTIPLEXSYNCHRONOUS MULTIPLEX
MULTIPLEX
PERIOD 2
PERIOD 3
PERIOD 4
SYNCHRONOUS
PERIOD 2
PERIOD 3
PERIOD 4
PERIOD 5
OTHER
SYNCHRONOUS
757 84 5
78 93 45789 a2 345
789a b1 2345789ab c0 12345
756774855864
7 945 5
7 783 57 963 5
77 882 477 936 4
777 891 35
PERIOD 577467773864686738844885395559645966397449753
777 9915 3
757567746677475777368556688536888339663699444a5555b6661
OTHER777366777771778851868671869661
884466888822888831979731999333
999441b66661b97531979191
868671678 8696616 45
(4,8)(6,6)
(6x,6x)(4x,8x)
(6x,8)(4,6x)
868 95 6
89 a4 5689a b3 456
89ab c2 345689abc d1 23456
89abcd e0 123456
867885966975
8884966799559964a666a864
8888396677975779797399944
aa555b6666b9555
995577996477
8 888891 68 979395 68 979791 6
888888188899618897971
(6x,8x)(8,6)
(6x,8)(8,6x)
(8,6x)(6x,8)(8x,6)(6,8x)(8x,6)(6,8x)
99559668 9999292 6
88 9992992 597979717
8 99999191 688 99991991 5
888 99919991 4
25[56]26[64]27[54]
25[75]525[76]4
(2,2)([6,4],[6,4])(2,4)([8,6],4)
(2,4x)([84x],6)(2,6)([64],6)
(2,6)([6x6],4x)(2,6x)([6x6],4)(2,8x)([6x4],4)
(6x,8)(6,4x)(8x,4x)(4,8)(8,6x)(4x,6)
(8x,6x)(4x,6x)(8,6x)(6x,4)(8x,6)(6,4x)(8x,6x)(6,4)(8x,6)(4,6x)(8,6)(6x,4x)(8x,6)(8,2x)(8,8)(4,4)
SYNCHRONOUS
(4x,6) (8x,6)(6,4x) (4x,6)
(6,8) (2,4)([8x6],4x) (6,4)(8,6) (2,4x)([84x],6) (4,6)(8,6) (2,4x)([86x],4) (4,6)(8,8) (2,4)([8x8],2x) (4,4)(8,8) (2,4x)([8x8],2) (4,4)
26[74]527[74]4827[43]
25[22]4[654]25[22]7[543]
25[87]4425[65]24[654]
25[22]5[756]2
MULTIPLEX
SYNCHRONOUS MULTIPLEX
666 81772 2666 81835 2666 81862 2666 88072 2666 89035 2666 89062 2666 91474 2666 91672 2666 91834 2666 91852 2667 91681 24667 91924 24
66 78172 366 78802 366 79135 366 79162 366 79405 366 79702 366 92473 366 92572 366 92833 366 95173 366 95803 366 96172 366 96802 3
66 99133 366 99403 366 99502 367 78181 3467 78901 3467 92923 3467 92941 3467 94903 3467 96181 3467 96901 3477 79180 33666 68074 2666 69055 2
1[65]62 1[75]52
1 [65]22 [54] 24[64]4 24[65]3 25[63]4 25[65]2 26[64]2 623[54]
24[75]3424[76]33
24[85]34424[95]3444
7466257477417733557747147777118244666777161757275277481448448641857716186481449494414
(2,4)([4x4],6x)(2,4)([64x],4x)(2,4x)([4x4],6)(2,4x)([6x4],4)
(2,6x)([6x4x],2x)(2,[4x4])([4x4],2)
(2,4)([6x6],4)(6,2x)(2,4x)([8x6],4x)(2x,4)(2,6)([6x6],2x)(6x,2x)
(4,2)(4,[6x4])*(4,2)(6,[4x4])*(4x,2)([64],4)*
95951519552752955815295971229952712a572722a772711
55668244556685146789123495851714b4a33333567891234
685716714747771714758517741774717741855815661b5b515151
b444b33344466671668144
678 d1517191b1 234
6 757173 46 777171 46 935373 4
7 847182 44 66 7266716 37 83571637 44 6 85716814 4
(4x,6x)(6,4)
(4x,6)(6x,8) (8x,2x) (2,4x)(4,6x)
(8,6x)(2x,4)(4x,6)(4,6x)(4x,6)(6,4x)(6,6)(6,2)
(6x,4)(4,6x)(6x,4)(6,4x)(6x,4x)(4,6)
(6x,6x)(2x,6x)(6x,8x)(2x,4x)(8x,4x)(4,4)(8,6)(2x,4x)(8,6x)(2x,4)(8x,6)(4,2x)
(8x,6x)(4x,2x)
(4x,8x) (4,ax)(4x,2x) (4,8)(6x,8x)(8x,2x)(2,8)(2x,4x)
(4x,6)(6,6)(8,2x)(4x,6)(2,6x)(4x,6)(6,6)(8,2x)(6x,4)(2,6x)
(4x,6)(6x,8)(ax,2x)(6x,2x)(2,4x)(4,6x)
(4x,6)(6x,8) (ax,2x)(6x,2x)(8x,2x) (2,4x)(4,6x)(4x,6)(6x,8) (ax,2x)(ax,2x)(4x,2x) (2,4x)(4,6x)(4x,6)(6x,8) (cx,2x)(8x,2x)(4x,2x) (2,4x)(4,6x)(4x,6)(6x,8) (ax,2x)(ax,2x)(4x,2x) (4,6x)(0,6x)
(6,6) (8,2x)(4x,6) (6x,2x)(6,6) (8x,2x)(4x,6x) (6x,2x)(6,6) (8x,2x)(6,4) (6x,2x)
(6x,8x) (2x,8)(8,2x) (2x,4x)(6x,8x) (8x,2)(8,2x) (2x,4x)
22 [32] [43][54]24[54]
25[53] 26[43]
6 1[75]2 4 6 23[64] 4
7 1[84]2 44 7 23[73] 44
66 22[65] 3 68 22[83] 344
1[76]42 22[43][54] 22[53][53]
(6,6)(2x,6)(6,4x)(6x,6x)(2,6x)(6x,4)(6,8x)(6x,2)(2x,6x)
(6x,8x)(2x,8x(4x,2x)
(6,6)(6,2x)*(6,4x)(6,4)*(6x,4)(4,6)*
(6x,4)(6x,4x)*(8x,4)(4,4)*
(8x,6)(2x,4x)*(8x,6x)(2x,4)*
(4x,6)(8x,4x)(4x,6x)(2,6x)(6,6)(2x,8x)(4x,6)*(2x,6x)(6,6)(8,2x)(4,6)*(6x,2x)
(6,6)(8,2x)(6x,4x)*(6x,2x)(4x,6)(6,8x) (2,8)(2x,8)*(2,4)
24[76]73124[87]333
24[98]333324[22]3[543]
24[22]3[764]4124[22]3[764]81716714
6 7323[22]3[753]3 424[22]3[765]31
24[22]3[222]3[7654]01
(6,6)(2,2)([64],6)(2x,6x)(6,6)(2,2)([6x6],4x)(2x,6x)
(4x,6)(6,6)(2,2x)([64x],6)(2,6x)(4x,6)(6,6)(2,2x)([6x6],4)(2,6x)
(4x,6)(6x,8)(2,2x)([8x6x],2x)(2,4x)(4,6x)(6,6)(2,2)(4,[6x6])*(6x,2x)(6,6)(2,2)(6,[64x])*(2x,6x)(6,6)(2,2)([64x],6)*(2x,6x)
(6,6)(2,2x)([6x6],4x)*(6x,2x)(8,4)(8,4)(2,2)(2x,[86])*(2,4)(4x,6)
(6x,8)(2,2x)([22],2x)([8x6x4x],2x)(2,4x)(4,6x)
(6x,[4x4])(2,4x)*(2,4x)([8x8],4)(4,2x)(2x,6)
([64],4)(4x,6)(4,2)* ([64],4)(4x,6x)(4x,2)* (6x,[4x4])(6x,4x)(2,4x)* ([6x4x],2x)(6,4x)(6x,2)* ([6x6],4)(6,2x)(2,4x)* ([6x6],4x)(2x,6x)(4x,2)* ([6x4x],2)(6x,4x)(6x,2)* ([6 4x],2x)(4x,6)(6x,2)* ([6x4],2)(4,6x)(6,2)* ([6x4],4)(6x,4x)(4,2)*
F U R T H E R I D E A SLEARNING A NEW SITESWAPThe best way to start with a new siteswap is to try a single repetition in the middle of the standard pattern for that number of objects. Take 534, a four object siteswap, for example. First try ...44 534 44... then try ...44 534534 44...etc. Try running the pattern from cold: 534534534... You can also break the pattern down, the siteswap 504 (3 balls) can be good practice for 534.
PATTERN SUBSTITUTIONIn any pattern where a repeating sequence of identical numbers appears, an alternative siteswap may be substituted in place of the repeating sequence. A good example is 7333 where the “333” can be replaced by any three digit three ball siteswap. This gives rise to patterns such as 7423, 7441 and 7531. Another good example is the fi ve ball pattern 66661 where 6’s can be substituted by 75, 774, 8844, etc.
THROW THE 2!It has become popular for jugglers to hold on to their 2’s. This does not have to be the case, since a “2” can also be a small throw to the same hand. The following are good patterns to start experimenting with: 423, 52512 and 642. Try throwing the “2” around your other arm, under your leg or around your head.
INCREASING COMPLEXITYSiteswaps can form the basis of more complex and interesting juggling patterns. This may be achieved by integrating different techniques such as the following:- body throws (backcrosses, under the leg, 1’s behind the back)- Changing spin amounts- bounce juggling (diffi cult high throws become easy bounces)
The numbers in BLUE before the siteswaps are the entry sequence from ground state and the numbers after, again in BLUE, are the exit sequence. Siteswaps with the same entry and exit sequence can be strung together with no transition.An asterix (*) after a string of numbers means repeat sequence, starting on the other side.
SynchronousSince there are 2 throws at the same time, the throws are represented in brackets, e.g. (6,4). Only even numbers are valid. To distinguish between crossing throws and same hand throws, an “x” is added to the crossing throws, e.g. (4x, 6x).
MultiplexMultiplex means to throw two or more balls from the same hand at the same time. Multiplex throws are indicated by the numbers in square brackets, e.g. [54]
0 - empty hand1 - quick pass across from one hand to another2 - held ball or very small throw to the same hand3 - throw to the other hand, as in the 3 object cascade4 - throw to the same hand, as in the 4-object fountain5 - throw to the other hand, as in the 5-object cascade
a = 10b = 11c = 12d = 13e = 14
Notice all odd throws cross and all even throws return to the same hand.
22 33 44 55 66 77
Cards are colour-coded according to number of
objectsSITESWAP CARDSD E F I N I T I O N S
G E N E R A L G U I D E L I N E S
COPYRIGHT © 2004 GANDINI JUGGLING
The numbers in BLUE before the siteswaps are the entry sequence from ground state and the numbers after, again in BLUE, are the exit sequence. Siteswaps with the same entry and exit sequence can be strung together with no transition.An asterix (*) after a string of numbers means repeat sequence, starting on the other side.
SynchronousSince there are 2 throws at the same time, the throws are represented in brackets, e.g. (6,4). Only even numbers are valid. To distinguish between crossing throws and same hand throws, an “x” is added to the crossing throws, e.g. (4x, 6x).
MultiplexMultiplex means to throw two or more balls from the same hand at the same time. Multiplex throws are indicated by the numbers in square brackets, e.g. [54]
0 - empty hand1 - quick pass across from one hand to another2 - held ball or very small throw to the same hand3 - throw to the other hand, as in the 3 object cascade4 - throw to the same hand, as in the 4-object fountain5 - throw to the other hand, as in the 5-object cascade
a = 10b = 11c = 12d = 13e = 14
Notice all odd throws cross and all even throws return to the same hand.
22 33 44 55 66 77
Cards are colour-coded according to number of
objectsSITESWAP CARDSD E F I N I T I O N S
G E N E R A L G U I D E L I N E S
COPYRIGHT © 2004 GANDINI JUGGLING
The numbers in BLUE before the siteswaps are the entry sequence from ground state and the numbers after, again in BLUE, are the exit sequence. Siteswaps with the same entry and exit sequence can be strung together with no transition.An asterix (*) after a string of numbers means repeat sequence, starting on the other side.
SynchronousSince there are 2 throws at the same time, the throws are represented in brackets, e.g. (6,4). Only even numbers are valid. To distinguish between crossing throws and same hand throws, an “x” is added to the crossing throws, e.g. (4x, 6x).
MultiplexMultiplex means to throw two or more balls from the same hand at the same time. Multiplex throws are indicated by the numbers in square brackets, e.g. [54]
0 - empty hand1 - quick pass across from one hand to another2 - held ball or very small throw to the same hand3 - throw to the other hand, as in the 3 object cascade4 - throw to the same hand, as in the 4-object fountain5 - throw to the other hand, as in the 5-object cascade
a = 10b = 11c = 12d = 13e = 14
Notice all odd throws cross and all even throws return to the same hand.
22 33 44 55 66 77
Cards are colour-coded according to number of
objectsSITESWAP CARDSD E F I N I T I O N S
G E N E R A L G U I D E L I N E S
COPYRIGHT © 2004 GANDINI JUGGLING
The numbers in BLUE before the siteswaps are the entry sequence from ground state and the numbers after, again in BLUE, are the exit sequence. Siteswaps with the same entry and exit sequence can be strung together with no transition.An asterix (*) after a string of numbers means repeat sequence, starting on the other side.
SynchronousSince there are 2 throws at the same time, the throws are represented in brackets, e.g. (6,4). Only even numbers are valid. To distinguish between crossing throws and same hand throws, an “x” is added to the crossing throws, e.g. (4x, 6x).
MultiplexMultiplex means to throw two or more balls from the same hand at the same time. Multiplex throws are indicated by the numbers in square brackets, e.g. [54]
0 - empty hand1 - quick pass across from one hand to another2 - held ball or very small throw to the same hand3 - throw to the other hand, as in the 3 object cascade4 - throw to the same hand, as in the 4-object fountain5 - throw to the other hand, as in the 5-object cascade
a = 10b = 11c = 12d = 13e = 14
Notice all odd throws cross and all even throws return to the same hand.
22 33 44 55 66 77
Cards are colour-coded according to number of
objectsSITESWAP CARDSD E F I N I T I O N S
G E N E R A L G U I D E L I N E S
COPYRIGHT © 2004 GANDINI JUGGLING
The numbers in BLUE before the siteswaps are the entry sequence from ground state and the numbers after, again in BLUE, are the exit sequence. Siteswaps with the same entry and exit sequence can be strung together with no transition.An asterix (*) after a string of numbers means repeat sequence, starting on the other side.
SynchronousSince there are 2 throws at the same time, the throws are represented in brackets, e.g. (6,4). Only even numbers are valid. To distinguish between crossing throws and same hand throws, an “x” is added to the crossing throws, e.g. (4x, 6x).
MultiplexMultiplex means to throw two or more balls from the same hand at the same time. Multiplex throws are indicated by the numbers in square brackets, e.g. [54]
0 - empty hand1 - quick pass across from one hand to another2 - held ball or very small throw to the same hand3 - throw to the other hand, as in the 3 object cascade4 - throw to the same hand, as in the 4-object fountain5 - throw to the other hand, as in the 5-object cascade
a = 10b = 11c = 12d = 13e = 14
Notice all odd throws cross and all even throws return to the same hand.
22 33 44 55 66 77
Cards are colour-coded according to number of
objectsSITESWAP CARDSD E F I N I T I O N S
G E N E R A L G U I D E L I N E S
COPYRIGHT © 2004 GANDINI JUGGLING
For more information, see www.gandinijuggling.com & www.mediacircus.biz Layout and Design:
Beinn Muir & Marylis Ramos
For more information, see www.gandinijuggling.com & www.mediacircus.biz Layout and Design:
Beinn Muir & Marylis Ramos
For more information, see www.gandinijuggling.com & www.mediacircus.biz Layout and Design:
Beinn Muir & Marylis Ramos
For more information, see www.gandinijuggling.com & www.mediacircus.biz Layout and Design:
Beinn Muir & Marylis Ramos
For more information, see www.gandinijuggling.com & www.mediacircus.biz Layout and Design:
Beinn Muir & Marylis Ramos
