let a, b, c, d, e, f, g, h, i be Element of F_Real; for M being Matrix of 3,F_Real st a = 1 & b = 0 & c = 0 & d = 0 & e = 1 & f = 0 & M = <*<*a,b,c*>,<*d,e,f*>,<*g,h,i*>*> holds
Det M = i
let M be Matrix of 3,F_Real; ( a = 1 & b = 0 & c = 0 & d = 0 & e = 1 & f = 0 & M = <*<*a,b,c*>,<*d,e,f*>,<*g,h,i*>*> implies Det M = i )
assume that
A1:
( a = 1 & b = 0 & c = 0 & d = 0 & e = 1 & f = 0 )
and
A2:
M = <*<*a,b,c*>,<*d,e,f*>,<*g,h,i*>*>
; Det M = i
Det M =
((((((a * e) * i) - ((c * e) * g)) - ((a * f) * h)) + ((b * f) * g)) - ((b * d) * i)) + ((c * d) * h)
by A2, MATRIX_9:46
.=
i
by A1
;
hence
Det M = i
; verum