Okay let's try again, first divide the 12 balls into 3 groups.....let's name them AAAA, BBBB & CCCC
6 G0 E4 Y- h$ ?' R5.39.217.77TVBNOW 含有熱門話題,最新最快電視,軟體,遊戲,電影,動漫及日常生活及興趣交流等資訊。5 ]; T0 I. W- [& B( p8 P. V6 ?
First weight....AAAA ^ BBBB, if balance, then problem in C balls, see my post above. If not balance, continue below.
3 c& u* V$ @' \. L& z& _ w8 D' ]tvb now,tvbnow,bttvb% `1 T* ^7 y5 t
From the first weight, let's say AAAA is heavier then BBBB, then either the problem ball is heavier among AAAA, or lighter among BBBB, but all C balls are normal.TVBNOW 含有熱門話題,最新最快電視,軟體,遊戲,電影,動漫及日常生活及興趣交流等資訊。* c' `8 w0 u0 ?7 J h( U
0 K- t5 s) }. M {5.39.217.772nd weight....AAAB ^ ACCC, there will be 3 scenarios:
9 F& ]5 h2 y' e0 D(1) if AAAB is heavier then ACCC, for sure the problem ball is a heavier ball and it's among AAA. Take 2 of these and weight against each other, the heavier ball is the problem, if balance then it's the remaining ball.
2 x4 l. t: q" B$ X, x* Ytvb now,tvbnow,bttvb(2) if ACCC is heavier then AAAB then weight the A ball in ACCC against a normal C ball, if balance then the problem ball is the B ball in AAAB and it's a lighter ball. If heavier then this is the problem ball. (note it cannot be lighter)
: ]. m* S+ }. t(3) if balance then the problem ball is one of the 3 B balls not touched in the 2nd weight and it's a lighter ball. Take 2 of these B balls and weight against each other. If balance then the other B ball is the problem. If not balance then the lighter ball is the problem. |
發表於 2006-12-5 06:25 PM
| 