Question

How do you solve `7^ { x } - 2\cdot 3^ { x } = 0`?

Answer 1

`x = frac(ln(2))(ln(7) - ln(3))`

Explanation:

We have: `7^(x) - 2 cdot 3^(x) = 0`

`Rightarrow 2 cdot 3^(x) = 7^(x)`

Let's apply `ln` to both sides of the equation:

`Rightarrow ln(2 cdot 3^(x)) = ln(7^(x))`

Using the laws of logarithms:

`Rightarrow ln(2) + x ln(3) = x ln(7)`

`Rightarrow x ln(7) - x ln(3) = ln(2)`

`Rightarrow x (ln(7) - ln(3)) = ln(2)`

`therefore x = frac(ln(2))(ln(7) - ln(3))`

Answer 2

I got: `x=ln(2)/ln(7/3)=0.81807`

Explanation:

I would first write it as:

`7^x=2*3^x`

and then:

`7^x/3^x=2`

`(7/3)^x=2`

and then apply the natural log on both sides:

`ln(7/3)^x=ln(2)`

`xln(7/3)=ln(2)`

and:

`x=ln(2)/ln(7/3)=0.81807`