Using the properties logb(1/m)=−logbm and logb(m/n)=logbm−logbn , how can ln11−3lnp be condensed?(1 point) Responses ln(113p) l n left parenthesis Start Fraction 11 over 3 p End Fraction right parenthesis ln(11−3p) l n left parenthesis 11 minus 3 p right parenthesis ln(11−p3) l n left parenthesis 11 minus p cubed right parenthesis ln(11p3)

Question

Using the properties logb(1/m)=−logbm and logb(m/n)=logbm−logbn , how can ln11−3lnp be condensed?(1 point) Responses ln(113p) l n left parenthesis Start Fraction 11 over 3 p End Fraction right parenthesis ln(11−3p) l n left parenthesis 11 minus 3 p right parenthesis ln(11−p3) l n left parenthesis 11 minus p cubed right parenthesis ln(11p3)

Answer 1

To condense ln11−3lnp using the given properties, we can rewrite it as ln(11) - ln(p^3).

Next, we can use the property logb(m/n) = logb(m) - logb(n) to combine the logarithms. Therefore, ln(11) - ln(p^3) can be written as ln(11/p^3).

So, the condensed form of ln11−3lnp is ln(11/p^3).