What is the domain and range of #1/(x-7)#?
1 Answer
Domain: all real numbers x such that
Range: all real numbers.
Explanation:
The domain is the set of all values of x such that the function is defined.
For this function, that's every value of x, with the exception of exactly 7, since that would lead to a division by zero.
The range is the set of all values y that can be produced by the function.
In this case, it's the set of all real numbers.
Mental experiment time:
Let x be just a TINY bit greater than 7. The denominator of your function is 7 minus that number, or just the tiny number.
1 divided by a tiny number is a BIG number. So you can make y = f(x) be a big as you want by choosing an input number x that is close to 7, but just a tiny bit greater than 7.
Now, make x be just a tiny bit LESS than 7. Now you have y equal to 1 divided by a very tiny NEGATIVE number. The result is a very large negative number. In fact you can make y = f(x) be as big a NEGATIVE number as you want by choosing an input number x that is close to 7, but just a tiny bit less.
Here's another sanity check: Graph the function... graph{1/(x-7) [-20, 20, -10, 10]}
