Logarithms

[Acnhduy]

log₅2 (x-3) = x


One of my friends came up with this equation and asked me to graph it. I haven't seen an equation like this, and do not know how to graph using mapping notation or any other methods. Is it possible to graph this?

Looking at the equation, I would assume that there can only be one answer to this because

log₅2 can only have one answer since this means that 5^x = 2

Can someone please point me in the right direction?

Thanks you

[EdEarl]

Divide both sides of the equation by (x-3) and solve.

[Acnhduy]

How would I go about graphing it?

log₅2 (x-3) = x

 

log₅2 = x (x-3)

log₅2 = x² - 3x

 

what do I do after this

????

 

thanks.

[studiot]

 

log₅2 (x-3) = x

 

log₅2 = x (x-3)

log₅2 = x² - 3x

 

How is this dividing by x-3?

 

What exactly do you mean by the left hand side of the original equation?

 

What happened in your other thread this morning?

Edited October 3, 2013 by studiot

[overtone]

my guess is that maybe some teacher wants the guy to graph the function "log₅2(x-3)" and the function "x" on the same axes, notice the intersection point(s), and recognize the solution .

[Acnhduy]

Oh,

log₅2 (x-3) = x

log₅2 = x / (x-3)

Do I use the definition of the log?

5^x/(x-3) = 2

I am really confused as to what I am doing.

[EdEarl]

log₅2 is a constant.

 

I was not sure whether the problem is log₅(2 (x-3)) = x or as you have done the division as (x-3)log₅2 = x.

 

Overtone is probably right.

 

my guess is that maybe some teacher wants the guy to graph the function "log₅2(x-3)" and the function "x" on the same axes, notice the intersection point(s), and recognize the solution .

But, solving algebraically is a good check to see that the graphic solution is correct.

[Acnhduy]

How would I actually graph it though?

[EdEarl]

How would I actually graph it though?

Each side of the equation, can be graphed.

 

f(x) = x

f(x) = log₅2 (x-3)

Edited October 4, 2013 by EdEarl

[Acnhduy]

Oh I see, so they are both linear functions and I am looking for the point of intersection.