let k be Nat; Catalan (k + 1) = ((2 * k) !) / ((k !) * ((k + 1) !))
reconsider l = (2 * k) - k as Nat ;
( l = k & 1 * k <= 2 * k )
by XREAL_1:64;
then A1:
(2 * k) choose k = ((2 * k) !) / ((k !) * (k !))
by NEWTON:def 3;
( ((2 * k) + 2) -' 2 = 2 * k & (k + 1) -' 1 = k )
by NAT_D:34;
then Catalan (k + 1) =
((2 * k) !) / (((k !) * (k !)) * (k + 1))
by A1, XCMPLX_1:78
.=
((2 * k) !) / ((k !) * ((k !) * (k + 1)))
.=
((2 * k) !) / ((k !) * ((k + 1) !))
by NEWTON:15
;
hence
Catalan (k + 1) = ((2 * k) !) / ((k !) * ((k + 1) !))
; verum