答案
解:(1)
①+②×3,得
2x=2n+3,
解得x=
,
把x=
代入①,得3y=-3n+15,
y=-n+5,
若x-y=
=
-(-n+5),
3=2n+3-10+2n,
∴n=
.
(2)∵2x+3y=18-n,
∴4x+6y=36-2n,
∵4x-y=5n+1,
∴4x=5n+y+1,
∴7y+7n=35,
y+n=5,
假设y=1,则n=4;假设y=2,则n=3;假设y=3,则n=2;假设y=4,则n=1.
那么x=5.5或x=4.5或x=3.5或x=2.5.
所以存在.即x=4.5,y=2,n=3或者x=3.5,y=3,n=2.
解:(1)
①+②×3,得
2x=2n+3,
解得x=
,
把x=
代入①,得3y=-3n+15,
y=-n+5,
若x-y=
=
-(-n+5),
3=2n+3-10+2n,
∴n=
.
(2)∵2x+3y=18-n,
∴4x+6y=36-2n,
∵4x-y=5n+1,
∴4x=5n+y+1,
∴7y+7n=35,
y+n=5,
假设y=1,则n=4;假设y=2,则n=3;假设y=3,则n=2;假设y=4,则n=1.
那么x=5.5或x=4.5或x=3.5或x=2.5.
所以存在.即x=4.5,y=2,n=3或者x=3.5,y=3,n=2.