How do you solve 4^x + 6(4^-x) = 54x+6(4x)=5?

1 Answer
Jim H
Aug 5, 2015

x=1/2" "x=12 or " "x=ln3/ln4 x=ln3ln4

Explanation:

Don't be too concerned about what you should do to solve the problem.
Focus on what you could do and on the question, "Would that help?"

4^x + 6(4^-x) = 54x+6(4x)=5

Well, perhaps I could write 6 as 4 to some power. But i can add 4 to a powe plus 4 to another power, so that doesn't seem helpful.

Think of something else we could do.
Negative exponents can be a nit trick, so let's rewrite:

4^x + 6/4^x = 54x+64x=5

I've had good luck in other problems with clearing fraction, so let's do that.

(4^x)^2 + 6 = 5 (4^x)(4x)2+6=5(4x)

Does that help? It's not really clear yet, but I do see a square, and a constant and a constant times the thing that is squared. That sound like a quadratic to me.

(4^x)^2 -5(4^x)+ 6 = 0" "(4x)25(4x)+6=0 Yes. We have:

u^2 - 5u+6=0" "u25u+6=0 with 4^x4x rather than uu.

(u-2)(u-3)= 0(u2)(u3)=0

u = 2" "u=2 or " "u=3 u=3

4^x = 2" "4x=2 or " "4^x=3 4x=3

x=1/2" "x=12 or hmmmm. The best I can do is something like

x=1/2" "x=12 or " "x=log_4 3 x=log43

If I'd rather have lnln than log_4log4, I'll write:

x=1/2" "x=12 or " "x=ln3/ln4 x=ln3ln4

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