theorem Th13:
for
n being
Nat for
K being
Field for
M being
Matrix of
n,
K for
i,
j being
Nat st
i in Seg n &
j in Seg n holds
for
k,
m being
Nat st
k in Seg (n -' 1) &
m in Seg (n -' 1) holds
( (
k < i &
m < j implies
(Delete (M,i,j)) * (
k,
m)
= M * (
k,
m) ) & (
k < i &
m >= j implies
(Delete (M,i,j)) * (
k,
m)
= M * (
k,
(m + 1)) ) & (
k >= i &
m < j implies
(Delete (M,i,j)) * (
k,
m)
= M * (
(k + 1),
m) ) & (
k >= i &
m >= j implies
(Delete (M,i,j)) * (
k,
m)
= M * (
(k + 1),
(m + 1)) ) )