PPPPz-Feeds
PPPPz - 77772 can feed several different period 5 patterns with two passes, essentially all patterns that are compatible with Why Not:
4 clubs
- Inverted Parsnip
- based on this, the Inverted Zapnips
6 clubs
- Why Not
- Jim's 2-count (preferrably with flips for good timing)
- Not Why
- Not Likely
8 clubs
- 97978
- 99697
- 99994
- a7797
For all of these, the feeder can either do the role with straight or with crossing passes. The patterns in which the feeder does straight passes are probably easier, because then the feeder does not need to do supercrossing passes (from the feeders right hand to the outside far left hand)
Also, each fedee can do any of the above patterns - independent of the numbers of clubs in the pattern.
PPPPz Base Pattern
A 1|2: P P z P P B 1|2: P P P P z
Method
To find the start into the sequence, you take the role of the juggler who we are turning into two feedee roles and match up passes there with the two fedees.
Inverted Parsnip
Inverted Parsnip base pattern:
A 1|1: P z z P z B 1|1: P z P z z
P = Pass z = zip
- B0: juggler B of PPPPz
- B1, B2: juggler B of PzzPz
B0 1|2: P P P P z B1 1|1: P z P Z z B2 1|1: z P z P z
Now you can see, that everyone does a zip on the last beat and that all other passes of the original B0 sequence are done in turn by the two fedees.
Resulting feed:
A 1|2: P P z P P B 1|1: P z P z z C 1|1: z P z P z
Why Not
For Why Not, we can now just switch PzPzz vs PSPHz
A 1|2: P P z P P B 1|1: P S P H z C 1|1: z P S P H
H = Heff
Not Why
For Why Not, we can now just switch PzPzz vs PHPSz
A 1|2: P P z P P B 1|1: P H P S z C 1|1: z P H P S
Jim's 2-count
A 1|2: P P z P P B 1|1: P S P F S C 1|1: S P S P F
F = Flip
Inverted Zapnips
PzFZz
z = zip
Z = Zap
A 1|2: P P z P P B 1|1: P z F Z z C 1|1: z P z F Z
