Question

How do you find the domain, x intercept and vertical asymptotes of `y=-log_3x+2`?

Answer 1

Domain: `(0, oo)` `x-`intercept: `(9,0)` Vertical asymptote: `x=0`

Explanation:

Recalling that the logarithmic function (in this case `log_3x`) does not exist for negative `x` or `x=0`, the domain is all `x>0,` or `(0, oo)`

The vertical asymptote will be at `x=0`, as the function is never truly defined for this value, but gets infinitely close to it.

The `x-`intercept can be found by setting the function equal to zero and solving for `x.`

`-log_3x+2=0`

`log_3x=2`

Recalling that `log_ab=ln(b)/ln(a)`, we rewrite as

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

`ln(x)=2ln3`

`2ln(3)=ln(3^2)=ln(9)`

So,

`ln(x)=ln(9)`

`x=9`

The `x-`intercept is `(9, 0)`