Which statement is always true for positive integers aaa and bbb?
lcm(a,b)<a⋅b\text{lcm}(a, b) < a \cdot blcm(a,b)<a⋅b
lcm(a,b)≥max(a,b)\text{lcm}(a, b) \geq \max(a, b)lcm(a,b)≥max(a,b)
lcm(a,b)≤min(a,b)\text{lcm}(a, b) \leq \min(a, b)lcm(a,b)≤min(a,b)
gcd(a,b)>lcm(a,b)\gcd(a, b) > \text{lcm}(a, b)gcd(a,b)>lcm(a,b)