[tex]\log_630\approx1.898\\\\\log_62\approx0.387\\\\\log_615=\log_6\dfrac{30}{2}=\log_630-\log_62\approx1.898-0.387=1.511\\\\Used:\\\\\log_ab-\log_ac=\log_a\dfrac{b}{c}[/tex]
Answer:
The value of [tex]log_6{15}[/tex] is 1.511.
Step-by-step explanation:
It is given that [tex]log_6{30}\approx 1.898[/tex] and [tex]log_6{2}\approx 0.387[/tex].
We have to find the value of [tex]log_6{15}[/tex].
It can be written as
[tex]log_6{15}=log_6\frac{30}{2}[/tex]
Using property of lo, we get
[tex]log_6{15}=log_630-log_62[/tex] [tex]log_m\frac{a}{b}=log_ma-log_mb[/tex]
Substitute [tex]log_6{30}\approx 1.898[/tex] and [tex]log_6{2}\approx 0.387[/tex] in the above equation.
[tex]log_6{15}=1.898-0.387[/tex]
[tex]log_6{15}=1.511[/tex]
Therefore the value of [tex]log_6{15}[/tex] is 1.511.
