Question

What is the domain of defination of `y= log_10 (1- log_10 (x^2 -5x +16))`?

If possible ,please solve without using limits.

Answer 1

The domain is the interval `(2, 3)`

Explanation:

Given:

`y = log_10(1-log_10(x^2-5x+16))`

Assume that we want to deal with this as a real valued function of real numbers.

Then `log_10(t)` is well defined if and only if `t > 0`

Note that:

`x^2-5x+16 = (x-5/2)^2+39/4 > 0`

for all real values of `x`

So:

`log_10(x^2-5x+16)`

is well defined for all real values of `x`.

In order that `log_10(1-log_10(x^2-5x+16))` be defined, it is necessary and sufficient that:

`1 - log_10(x^2-5x+16) > 0`

Hence:

`log_10(x^2-5x+16) < 1`

Taking exponents of both sides (a monotonically increasing function) we get:

`x^2-5x+16 < 10`

That is:

`x^2-5x+6 < 0`

which factors as:

`(x-2)(x-3) < 0`

The left hand side is `0` when `x=2` or `x=3` and negative in between.

So the domain is `(2, 3)`