Let
K
K
be a knot in the
3
3
-sphere
S
3
S^{3}
, and
D
D
a disc in
S
3
S^{3}
meeting
K
K
transversely more than once in the interior. For non-triviality we assume that
|
K
∩
D
|
≥
2
\vert K \cap D \vert \ge 2
over all isotopy of
K
K
. Let
K
n
K_{n}
(
⊂
S
3
\subset S^{3}
) be a knot obtained from
K
K
by cutting and
n
n
-twisting along the disc
D
D
(or equivalently, performing
1
/
n
1/n
-Dehn surgery on
∂
D
\partial D
). Then we prove the following: (1) If
K
K
is a trivial knot and
K
n
K_{n}
is a composite knot, then
|
n
|
≤
1
\vert n \vert \le 1
; (2) if
K
K
is a composite knot without locally knotted arc in
S
3
−
∂
D
S^{3} - \partial D
and
K
n
K_{n}
is also a composite knot, then
|
n
|
≤
2
\vert n \vert \le 2
. We exhibit some examples which demonstrate that both results are sharp. Independently Chaim Goodman-Strauss has obtained similar results in a quite different method.