Which logarithmic expression is equivalent to the difference logb(M)−logb(N)\log_{b}(M) - \log_{b}(N)logb(M)−logb(N)?
logb(M−N)\log_{b}(M - N)logb(M−N)
logb(M÷N)\log_{b}(M \div N)logb(M÷N)
logb(M)÷logb(N)\log_{b}(M) \div \log_{b}(N)logb(M)÷logb(N)
logb(MN)\log_{b}(M^N)logb(MN)