00:01
So we have 3 times the natural log of x plus the natural log of 24 equals the natural log of 3.
00:09
So to solve our variable, we need to have one singular log on our left side and one single log on our right side.
00:15
So basically we need to combine everything.
00:18
So to combine, first we need to look at this first one here.
00:23
We have a coefficient.
00:25
So if you remember, one of the natural log properties is natural log of x to the y power is y times the natural log of x.
00:34
So we're going to undo that.
00:38
So we're going to move our coefficient to our exponent.
00:40
We're just going to do it in reverse.
00:42
So it just becomes the natural log of x cubed.
00:46
And the rest of the problem stays the same.
00:51
So now we want to look at our addition property, the natural log of x.
00:58
What is originally the natural log of x times y becomes the natural log of x plus the natural log of y.
01:06
So because we have addition here, we're just going to have to do that in reverse and turn our addition.
01:10
Into multiplication.
01:13
So this becomes the natural log of x cubed times 24.
01:19
We just do it in reverse equals the natural log of 3.
01:24
So now because we have a singular natural log here and here, we can get rid of those.
01:28
They have just eliminate themselves.
01:30
So we have 24x cubed equals 3...