If possible, find the largest and smallest possible values of the variable under study. Then the range = Largest Value minus Smallest Value.
You find the the smallest and largest values. The interval is the largest minus the smallest.
well u have to find out the values of x and y first to answer it! =)
Find the maximum and minimum values that the function can take over all the values in the domain for the input. The range is the maximum minus the minimum.
It helps to find a common denominator and multiply both sides of the inequality by this common denominator. That way, you have an inequality without fractions.
Find the possible values of r in the inequality 5 > r - 3.Answer: r < 8
If possible, find the largest and smallest possible values of the variable under study. Then the range = Largest Value minus Smallest Value.
n > -27
You find the the smallest and largest values. The interval is the largest minus the smallest.
that would be limited to 3 and -3 for values of x
2
well u have to find out the values of x and y first to answer it! =)
Find the maximum and minimum values that the function can take over all the values in the domain for the input. The range is the maximum minus the minimum.
-4
depends on what the problem is
Given a situation, what are the possible values of X is what it is asking.
Find all possible "x" and "y" values for domain and range. Then put it in inequality form. For example the domain and range for the equation 2x-3/x-5 would be: Domain: All Reals; x>5 Range: All Reals