Condense the expression 2logn(x)+13logn(y)−logn(z)2\log_n(x) + \frac{1}{3}\log_n(y) - \log_n(z)2logn(x)+31logn(y)−logn(z) into a single logarithm.
logn(x2y3z)\log_n\left(\frac{x^2 \sqrt[3]{y}}{z}\right)logn(zx23y)
logn(2x+y/3z)\log_n\left(\frac{2x + y/3}{z}\right)logn(z2x+y/3)
logn(x2+y1/3−z)\log_n(x^2 + y^{1/3} - z)logn(x2+y1/3−z)
logn(x2y3z)\log_n\left(\frac{x^2 y^3}{z}\right)logn(zx2y3)