Let
F
k
(
n
,
m
)
F_k(n,m)
be a random
k
k
-CNF formula formed by selecting uniformly and independently
m
m
out of all possible
k
k
-clauses on
n
n
variables. It is well known that if
r
≥
2
k
log
2
r \geq 2^k \log 2
, then
F
k
(
n
,
r
n
)
F_k(n,rn)
is unsatisfiable with probability that tends to 1 as
n
→
∞
n \to \infty
. We prove that if
r
≤
2
k
log
2
−
t
k
r \leq 2^k \log 2 - t_k
, where
t
k
=
O
(
k
)
t_k = O(k)
, then
F
k
(
n
,
r
n
)
F_k(n,rn)
is satisfiable with probability that tends to 1 as
n
→
∞
n \to \infty
. Our technique, in fact, yields an explicit lower bound for the random
k
k
-SAT threshold for every
k
k
. For
k
≥
4
k \geq 4
our bounds improve all previously known such bounds.