logarithms

[Deleted member 4993]

If log(a)x=2, log(b)x=3 and log(c)x=6 then how much is log(abc)x going to be?

\(\displaystyle Log_{abc}x = \frac{1}{Log_x(abc)} \ \ = \frac{1}{Log_x(a) + Log_x(b) + Log_x(c)}\)

continue....

 

[Deleted member 4993]

11x is my guess

Why not 42?

 

[Albi]

I think i found the answer and it is 11

 

[Dr.Peterson]

I think i found the answer and it is 11

No. Please show your work so we can see what you did. (Or maybe you didn't mean to type 11?)

In the work you did show, you didn't write equations at all!

If [MATH]\log_a(x) = 2[/MATH], then [MATH]\frac{1}{\log_x(a)} = 2[/MATH], so [MATH]\log_x(a) = 1/2[/MATH]. Do that for the other three expressions, and proceed.

 

[Albi]

No. Please show your work so we can see what you did. (Or maybe you didn't mean to type 11?)

In the work you did show, you didn't write equations at all!

If [MATH]\log_a(x) = 2[/MATH], then [MATH]\frac{1}{\log_x(a)} = 2[/MATH], so [MATH]\log_x(a) = 1/2[/MATH]. Do that for the other three expressions, and proceed.

Is it correct?

 

[Dr.Peterson]

Yes.

 

[Albi]

Yes.

I can't thank you enough for this

 

[HallsofIvy]

I'm sure Dr. Peterson would accept cash.

 

[Cubist]

Well done for solving this! In case you want to see an alternative method (not a better method, just different)...

Don't we just need to extend @pka 's post#8 a bit by writing...

[math]x = a^2 = b^3 = c^6 = (abc)^y[/math] and then find y (which is the answer)

Start by writing "a" and "b" in terms of c, then you can substitute these values into [math](abc)^y = c^6[/math] to find y

Note that a, b, and c are real and +ve since they are used as log bases. Using the post above...

[math]a^2=c^6 ⇒ a=c^3[/math]
[math]b^3=c^6 ⇒ b=c^2[/math]
Sub the above values for "a" and "b" into [math]c^6=(abc)^y[/math]
[math]= \left(c^3 \cdot c^2 \cdot c\right)^y[/math]
[math]=\left(c^6\right)^y[/math]
And since [math]c^6=\left(c^6\right)^y[/math] we can conclude that [math]y=1[/math]