Given A = {(1, 3)(-1, 5)(6, 4)}, B = {(2, 0)(4, 6)(-4, 5)(0, 0)} and C = {(1, 1)(0, 2)(0, 3)(0, 4)(-3, 5)}, answer the following multiple choice question:
From the list of sets A, B, and C, state the domain of set B.
Set B does not have a domain
Domain of set B: {0, 6, 5}
Domain of set B: {2, 4, -4, 0}
Domain of set B: {2, 4, -4, 0}
To determine the domain of set B, we need to examine the x-coordinates of the points in the set.
Set B = {(2, 0), (4, 6), (-4, 5), (0, 0)}
The domain of a set refers to the set of all possible x-values. So in this case, the domain of set B is the set of x-coordinates from each point in set B.
The x-coordinates in set B are: 2, 4, -4, 0
Therefore, the correct answer is: Domain of set B: {2, 4, -4, 0}
To determine the domain of a set, we need to consider the first element of each ordered pair in the set. In this case, let's analyze set B = {(2, 0)(4, 6)(-4, 5)(0, 0)}.
The domain of set B is the set of all possible x-coordinates (first elements) of the ordered pairs in set B.
By observing set B, the x-coordinates are 2, 4, -4, and 0. Thus, the domain of set B is {2, 4, -4, 0}.
Therefore, the correct answer is:
Domain of set B: {2, 4, -4, 0}.