set f = AffineMap a,0 ,c,0 ;
hereby TOPREAL9:def 4 AffineMap a,0 ,c,0 is additive
let r be
real number ;
for x being Point of (TOP-REAL 2) holds (AffineMap a,0 ,c,0 ) . (r * x) = r * ((AffineMap a,0 ,c,0 ) . x)let x be
Point of
(TOP-REAL 2);
(AffineMap a,0 ,c,0 ) . (r * x) = r * ((AffineMap a,0 ,c,0 ) . x)A1:
(
(r * x) `1 = r * (x `1 ) &
(r * x) `2 = r * (x `2 ) )
by TOPREAL3:9;
thus (AffineMap a,0 ,c,0 ) . (r * x) =
|[((a * ((r * x) `1 )) + 0 ),((c * ((r * x) `2 )) + 0 )]|
by JGRAPH_2:def 2
.=
|[(r * (a * (x `1 ))),(r * (c * (x `2 )))]|
by A1
.=
r * |[((a * (x `1 )) + 0 ),((c * (x `2 )) + 0 )]|
by EUCLID:62
.=
r * ((AffineMap a,0 ,c,0 ) . x)
by JGRAPH_2:def 2
;
verum
end;
let x, y be Point of (TOP-REAL 2); TOPREAL9:def 5 (AffineMap a,0 ,c,0 ) . (x + y) = ((AffineMap a,0 ,c,0 ) . x) + ((AffineMap a,0 ,c,0 ) . y)
A2:
( (x + y) `1 = (x `1 ) + (y `1 ) & (x + y) `2 = (x `2 ) + (y `2 ) )
by TOPREAL3:7;
thus (AffineMap a,0 ,c,0 ) . (x + y) =
|[((a * ((x + y) `1 )) + 0 ),((c * ((x + y) `2 )) + 0 )]|
by JGRAPH_2:def 2
.=
|[((a * (x `1 )) + (a * (y `1 ))),((c * (x `2 )) + (c * (y `2 )))]|
by A2
.=
|[((a * (x `1 )) + 0 ),((c * (x `2 )) + 0 )]| + |[(a * (y `1 )),(c * (y `2 ))]|
by EUCLID:60
.=
((AffineMap a,0 ,c,0 ) . x) + |[((a * (y `1 )) + 0 ),((c * (y `2 )) + 0 )]|
by JGRAPH_2:def 2
.=
((AffineMap a,0 ,c,0 ) . x) + ((AffineMap a,0 ,c,0 ) . y)
by JGRAPH_2:def 2
; verum