If a=15a = 15a=15 and b=20b = 20b=20, what is the relationship between GCD(a,b)⋅LCM(a,b)\text{GCD}(a, b) \cdot \text{LCM}(a, b)GCD(a,b)⋅LCM(a,b) and the product a⋅ba \cdot ba⋅b?
GCD⋅LCM<a⋅b\text{GCD} \cdot \text{LCM} < a \cdot bGCD⋅LCM<a⋅b
GCD⋅LCM=a⋅b\text{GCD} \cdot \text{LCM} = a \cdot bGCD⋅LCM=a⋅b
GCD⋅LCM>a⋅b\text{GCD} \cdot \text{LCM} > a \cdot bGCD⋅LCM>a⋅b
No specific relationship