5,016 Spliced Surprise Maximus (2–10 methods)

Donald F Morrison (no. 1594)
               Arrangement A (2m)     Arrangement B (3m)     Arrangement C (4m)
234567890ET    X Little               X Little               X Little
35T604827E9    Cambridge              Yorkshire              Cambridge
64523ET9078    Cambridge              Yorkshire              Yorkshire
2E49675830T    Cambridge              Cambridge              Lincolnshire
97E8204T635    Cambridge              Yorkshire              Yorkshire
807T93E5264    Cambridge              Cambridge              Lincolnshire
T305867492E    Cambridge              Cambridge              Cambridge
5634T20E897    Cambridge              Yorkshire              Yorkshire
426E5937T80    Cambridge              Cambridge              Lincolnshire
E92748605T3    Cambridge              Yorkshire              Cambridge
7890ET23456
Repeat ten times.

               Arrangement D (5m)     Arrangement E (6m)     Arrangement F (7m)
234567890ET    X Little               X Little               X Little
35T604827E9    Yorkshire              Pudsey                 Pudsey
64523ET9078    Cambridge              Yorkshire              Yorkshire
2E49675830T    Lincolnshire           Lincolnshire           Lincolnshire
97E8204T635    Superlative            Superlative            Superlative
807T93E5264    Lincolnshire           Lincolnshire           Lincolnshire
T305867492E    Yorkshire              Cambridge              Cambridge
5634T20E897    Superlative            Superlative            Superlative
426E5937T80    Cambridge              Yorkshire              Yorkshire
E92748605T3    Yorkshire              Pudsey                 Prittlewell
7890ET23456
Repeat ten times.

               Arrangement G (8m)     Arrangement H (9m)     Arrangement I (10m)
234567890ET    X Little               X Little               X Little
35T604827E9    Pudsey                 Pudsey                 Pudsey
64523ET9078    Yorkshire              Yorkshire              Cambridge
2E49675830T    Swindon                Tantun                 Swindon
97E8204T635    Superlative            Superlative            Yorkshire
807T93E5264    Lincolnshire           Swindon                Tantun
T305867492E    Cambridge              Cambridge              Merseyside
5634T20E897    Superlative            Superlative            Superlative
426E5937T80    Yorkshire              Lincolnshire           Lincolnshire
E92748605T3    Prittlewell            Prittlewell            Prittlewell
7890ET23456
Repeat ten times.

               Arrangement J (4m)     Arrangement K (5m)     Arrangement L (6m)
234567890ET    X Little               X Little               X Little
35T604827E9    Yorkshire              Pudsey                 Pudsey
64523ET9078    Cambridge              Cambridge              Yorkshire
2E49675830T    Yorkshire              Cambridge              Cambridge
97E8204T635    Superlative            Superlative            Superlative
807T93E5264    Cambridge              Cambridge              Yorkshire
T305867492E    Superlative            Yorkshire              Cambridge
5634T20E897    Superlative            Superlative            Superlative
426E5937T80    Cambridge              Pudsey                 Pudsey
E92748605T3    Yorkshire              Yorkshire              Prittlewell
7890ET23456
Repeat ten times.

               Arrangement M (7m)     Arrangment N (8m)
234567890ET    X Little               X Little
35T604827E9    Pudsey                 Pudsey
64523ET9078    Yorkshire              Yorkshire
2E49675830T    Tantun                 Tantun
97E8204T635    Superlative            Superlative
807T93E5264    Tantun                 Tantun
T305867492E    Cambridge              Merseyside
5634T20E897    Superlative            Superlative
426E5937T80    Pudsey                 Prittlewell
E92748605T3    Prittlewell            Cambridge
7890ET23456
Repeat ten times.
 

In all arrangements X Little is the as yet unnamed, asymmetric little surprise method with the place notation x3x456x789x3x47x2369x27x30x569x456x3x2 (this method has three hunt bells, the 8 and E being hunt bells with paths unrelated to the treble).

Arrangement A (2 methods) contains 4,752 Cambridge and 264 X Little, with 21 changes of method, all the work of both methods for every bell, and no backstroke TEs. If preferred, in arrangement A either Superlative or Pudsey may be rung instead of Cambridge throughout (if Superlative is rung, contains 17 backstroke TEs).

Arrangement B (3 methods) contains 2,640 Yorkshire, 2,112 Cambridge and 264 X Little, with 87 changes of method, all the work of every method for every bell, and no backstroke TEs. If preferred, in arrangement B Superlative may be rung instead of Yorkshire throughout (in which case it contains 9 backstroke TEs).

Arrangement C (4 methods) contains 1,584 each Cambridge, Lincolnshire and Yorkshire, and 264 X Little, with 109 changes of method all all the work of every method for every bell, and no backstroke TEs. If preferred, in arrangement C Superlative may be rung instead of Yorkshire throughout (in which case it contains 3 backstroke TEs).

Arrangement D (5 methods) contains 1,584 Yorkshire, 1,056 each Cambridge, Lincolnshire and Superlative, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement E (6 methods) contains 1,056 each Lincolnshire, Pudsey, Superlative and Yorkshire, 528 Cambridge, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement F (7 methods) contains 1,056 each Lincolnshire, Superlative and Yorkshire, 528 each Cambridge, Prittlewell and Pudsey, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement G (8 methods) contains 1,056 each Superlative and Yorkshire, 528 each Cambridge, Lincolnshire, Prittlewell, Pudsey and Swindon, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement H (9 methods) contains 1,056 each Superlative, 528 each Cambridge, Lincolnshire, Prittlewell, Pudsey, Swindon, Tantun and Yorkshire, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrange I (10 methods) contains 528 each Cambridge, Lincolnshire, Merseyside, Prittlewell, Pudsey, Superlative, Swindon, Tantun and Yorkshire, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement J (4 methods) contains 1,584 each Cambridge, Superlative and Yorkshire, and 264 X Little, with 98 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement K (5 methods) contains 1,584 Cambridge, 1,056 each Pudsey, Superlative and Yorkshire, and 264 X Little, with 98 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement L (6 methods) contains 1,056 each Cambridge, Pudsey, Superlative and Yorkshire, 528 Prittlewell, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement M (7 methods) contains 1,056 each Superlative, Tantun and Yorkshire, 528 each Cambridge, Prittlewell and Pudsey, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.

Arrangement N (8 methods) contains 1,056 each Superlative and Tantun, 528 each Cambridge, Merseyside, Prittlewell, Pudsey and Yorkshire, and 264 X Little, with 109 changes of method, all the work of every method for every bell, and no backstroke TEs.