We compute the Green ring of the Taft algebra
H
n
(
q
)
H_n(q)
, where
n
n
is a positive integer greater than 1 and
q
q
is an
n
n
-th root of unity. It turns out that the Green ring
r
(
H
n
(
q
)
)
r(H_n(q))
of the Taft algebra
H
n
(
q
)
H_n(q)
is a commutative ring generated by two elements subject to certain relations defined recursively. Concrete examples for
n
=
2
,
3
,
.
.
.
,
8
n=2,3, ... , 8
are given.