619 views
5 votes
Help please

Condense to a single logarithm is possible

In(6x^9)-In(x^2)

User Zvjezdan
by
7.7k points

1 Answer

4 votes

The condensed form of the expression is:

In[(6x^9)/(x^2)] = In[6x^7]

Step-by-step explanation:

We can use the quotient rule of logarithms, which states that ln(a) - ln(b) = ln(a/b). Applying this rule, we get:

In(6x^9) - In(x^2) = In[(6x^9)/(x^2)]

Simplifying the expression inside the logarithm by dividing 6x^9 by x^2, we get:

In[(6x^9)/(x^2)] = In[6x^7]

User Vasekt
by
8.4k points

Related questions

asked Sep 19, 2024 102k views
Rajakvk asked Sep 19, 2024
by Rajakvk
7.9k points
1 answer
5 votes
102k views
asked Feb 10, 2024 209k views
Steve Pettifer asked Feb 10, 2024
by Steve Pettifer
8.3k points
1 answer
3 votes
209k views