What is the domain and range of #y=sqrt((x+5) (x-5))#?
1 Answer
Domain:
Range:
Explanation:
The domain of the function will include all the values that
In this case, the fact that you're dealing with a square root tells you that the expression that's under the square root sign must be positive. That is the case because when working with real numbers, you can only take the square root of a positive number.
This means that you must have
#(x + 5)(x - 5) >=0#
Now, you know that for
#(x+5)(x - 5) = 0#
In order to determine the values of
#(x+5)(x-5) > 0#
you need to look at two possible scenarios.
#x+5 > 0 " " ul(and) " " x-5 > 0# In this case, you must have
#x + 5 > 0 implies x > - 5# and
# x - 5 > 0 implies x > 5# The solution interval will be
#(-5, + oo) nn (5, + oo) = (5, + oo)#
#x + 5 < 0 " " ul(and) " " x- 5 < 0# This time, you must have
#x + 5 < 0 implies x < -5# and
# x - 5 < 0 implies x < 5# The solution interval will be
#(-oo, - 5) nn (-oo, 5) = (-oo, - 5)#
You can thus say that the domain of the function will be--do not forget that
#"domain: " color(darkgreen)(ul(color(black)(x in (-oo, - 5] uu [5, + oo)#
For the range of the function, you need to find the values that
You know that for real numbers, taking the square root of a positive number will produce a positive number, so you can say that
#y >= 0 " "(AA)color(white)(.) x in (-oo, -5] uu [5, + oo)#
Now, you know that when
#y = sqrt((-5 + 5)(-5 - 5)) = 0" " and " " y = sqrt((5 + 5)(5 - 5)) = 0#
Moreover, for every value of
#y >= 0#
This means that the range of the function will be
#"range: " color(darkgreen)(ul(color(black)(y in (-oo"," + oo)))#
graph{sqrt((x+5)(x-5)) [-20, 20, -10, 10]}
