let K, M, N be Cardinal; :: thesis: K *` (M +` N) = (K *` M) +` (K *` N)
A1: [:(card [:K,M:]),{0}:],[:[:K,M:],{0}:] are_equipotent by Th6;
M,[:M,{0}:] are_equipotent by CARD_1:69;
then A2: [:K,M:],[:K,[:M,{0}:]:] are_equipotent by Th7;
[:[:K,M:],{0}:],[:K,M:] are_equipotent by CARD_1:69;
then [:[:K,M:],{0}:],[:K,[:M,{0}:]:] are_equipotent by A2, WELLORD2:15;
then A3: [:(card [:K,M:]),{0}:],[:K,[:M,{0}:]:] are_equipotent by A1, WELLORD2:15;
A4: [:(card [:K,N:]),{1}:],[:[:K,N:],{1}:] are_equipotent by Th6;
[:M,{0}:] misses [:N,{1}:] by Lm4;
then A5: [:K,[:M,{0}:]:] misses [:K,[:N,{1}:]:] by ZFMISC_1:104;
N,[:N,{1}:] are_equipotent by CARD_1:69;
then A6: [:K,N:],[:K,[:N,{1}:]:] are_equipotent by Th7;
A7: K *` (M +` N) = card [:K,(card H<sub>3</sub>(M,N)):] by Th9
.= card [:K,H<sub>3</sub>(M,N):] by Th6
.= card ([:K,[:M,{0}:]:] \/ [:K,[:N,{1}:]:]) by ZFMISC_1:97 ;
[:[:K,N:],{1}:],[:K,N:] are_equipotent by CARD_1:69;
then [:[:K,N:],{1}:],[:K,[:N,{1}:]:] are_equipotent by A6, WELLORD2:15;
then A8: [:(card [:K,N:]),{1}:],[:K,[:N,{1}:]:] are_equipotent by A4, WELLORD2:15;
[:(card [:K,M:]),{0}:] misses [:(card [:K,N:]),{1}:] by Lm4;
then [:(card [:K,M:]),{0}:] \/ [:(card [:K,N:]),{1}:],[:K,[:M,{0}:]:] \/ [:K,[:N,{1}:]:] are_equipotent by A3, A8, A5, CARD_1:31;
hence K *` (M +` N) = card ([:(card [:K,M:]),{0}:] \/ [:(card [:K,N:]),{1}:]) by A7, CARD_1:5
.= (K *` M) +` (K *` N) by Th9 ;
:: thesis: verum