SOLUTION: Solve for x: log(base 5)3x + log(base 5)(x-3) = 1
I see they both have a common base of 5. I'm not sure if I'm on the right track, but this is what I got so far:
log(base 5)[3
Algebra ->
Exponential-and-logarithmic-functions
-> SOLUTION: Solve for x: log(base 5)3x + log(base 5)(x-3) = 1
I see they both have a common base of 5. I'm not sure if I'm on the right track, but this is what I got so far:
log(base 5)[3
Log On
Question 80522: Solve for x: log(base 5)3x + log(base 5)(x-3) = 1
I see they both have a common base of 5. I'm not sure if I'm on the right track, but this is what I got so far:
log(base 5)[3x(x-3)] = 1
3x(x-3) = 5^1
3x^2 - 9x =5
3x^2 - 9x - 5 = 0
I then tried factoring it out, but I don't think it works.
I think that first 3 in the problem might be throwing me off for some reason. Any help with this is greatly appreciated. Thanks. Answer by Earlsdon(6294) (Show Source):
You can put this solution on YOUR website! Solve for x: Apply the product rule for logarithms. Simplify the left side. Rewrite in exponential form. Subtract 5 from both sides. Your work up to this point is commendable!...and you are correct, this quadratic equation is not factorable, so you can use the quadratic formula:
The exact answers are:
The approximate answers are: To the nearest hundredth. To the nearest hundredth.
(