Log problem: Solve 25^x - 8*15^x - 9^{x+1} = 0

[bobrossu]

Problem:

Find all real numbers x such that 25^x-8*15^x-9^x+1=0

Not sure how to start.

Steps would be helpful.

 

[mmm4444bot]

Is this homework?

 

[bobrossu]

Is this homework?

No, just practice for me.

 

[lookagain]

Problem:

Find all real numbers x such that 25^x-8*15^x-9^x+1=0

Not sure how to start.

Steps would be helpful.

\(\displaystyle 25^x - 8*15^x - 9^{x + 1} \ = \ 0\)

\(\displaystyle 25^x - 8*(5*3)^x - 9*9^x \ = \ 0\)

\(\displaystyle (5^2)^x - 8*(5^x)(3^x) - 9(3^2)^x \ = \ 0\)

\(\displaystyle (5^x)^2 - 8*(5^x)(3^x) - 9(3^x)^2 \ = \ 0\)


Pick two variables other than x, such as r and t.

Let r = \(\displaystyle \ 5^x\).

Let t = \(\displaystyle \ 3^x\).


\(\displaystyle r^2 - 8rt - 9t^2 \ = \ 0\)


Factor that trinomial, set each factor equal to zero, substitute back for what r and t equal in terms of x, and solve for any real values of x.

 

[mmm4444bot]

… just practice for me.

Are you practicing for an upcoming math-placement test?