SMARANDACHE IRRATIONAL AND TRANSCENDENTAL NUMBERS Let a(n) be a smarandache sequence {different from u(n) = 1...1, where 1 is repeated p(n) times, p(n) is the n-th prime}. Then we conjecture that the concatenation: 1) 0.a(1)a(2)...a(n)... is an irrational number. 2) Even more: 0.a(1)a(2)...a(n)... is a transcendental number.