No.1275
K.Seetharaman (India)&
Jacques Rotenberg (Israel)

Original Fairy problems
JF-10/2017-3/2018:
October’2017 – March’2018


Definition: (click to show/hide)


No.1275 K.Seetharaman
India

original – 18.02.2018

Solutions: (click to show/hide)

white Kg4 Ra6 Pd7e7 black Ke6 Bc6c8 Rf8h8 Sf7 Pf6h6h7

h#2              2 solutions            (4+9)
Take&Make


No.1275.1 K.Seetharaman & Jacques Rotenberg
India / Israel

version of No.1275 – 30.04.2018

Solutions: (click to show/hide)

white Ke8 Rc6 Pd5e3 black Kh6 Qh5 Rd3 Se7g6 Be6g3 Pc7g4g5h3h4

h#2              2 solutions          (4+12)
Take&Make


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Jacques Rotenberg
Jacques Rotenberg
2 years ago

nicely motivated under-promotions
seems to have been done for the last wcct

seetharaman
seetharaman
2 years ago

Thanks Jacques. Yes it was started for the last wcct. But we could not make the Q promotion solution fully thematic.

seetharaman
seetharaman
2 years ago

A version suggested by Jacques saves a pawn and has a neat tempo move for black. But I prefer the black rook moves of my version.

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[/img]
H#2 Two Sols. Take&Make
1.Sf7-d6 e7*f8-h8=Q 2.Bc6-d5 Qh8*d8-e8 #
1.Rd8-e8 d7*e8-d8=R 2.Bc8-b7 e7*f8-e8=R #

Seetharaman
Seetharaman
2 years ago

Thanks Julia for accepting our new version. Two sets of underpromotions make the problem complete!

Jacques Rotenberg
Jacques Rotenberg
2 years ago

There is also a kind of exchange of places:

The rook goes to d4 and then to f4
The bishop passes through f4 to reach d4

https://www.youtube.com/watch?v=tSWf_yIV-d4&app=desktop