Question

How do you find the domain and range of `1/sqrt(8-t)`?

Answer 1

Domain: All `x` values`< 8`; `\quad[\infty,8)`

Range: All `y` values`>0`; `\quad(0,\infty]`

Explanation:

The domain is simply the values `x`, or in this case `t`, can have that will make the function defined.

For the above function, dividing by `0` will be undefined, so `t\ne 8`.

We can express that in interval notation as `[\infty,8)`, which means the domain is all values of `t` less than `8`.

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As for the range, we can plot the graph and find it from that.

We can see the graph starts just above `0`, and continues toward `\infty` upward.

So we can express the range as `(0,\infty]`, meaning all `y>0`.