what is the intersection of sets A= (3,4,6-,14,19) and b equals (1, 3, 6, 8, 14)?

Question

what is the intersection of sets A= (3,4,6-,14,19) and b equals (1, 3, 6, 8, 14)?

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  1. Charlotte
    0
    2021-10-14T01:45:28+00:00

    Answer. Intersection of the sets A and B: A ∩ B={3,6,14}

    Solution:

    A={3,4,6,14,19}

    B={1,3,6,8,14}

    The intersection between two sets is the set formed by the common elements. The common elements of the sets A and B are 3, 6, and 14, then the intersection of the sets A and B is:

    A∩B={3,6,14}

    0
    2021-10-14T01:45:38+00:00

    Answer:

    A∩B = (3, 6, 14)

    Step-by-step explanation:

    The intersection of the two sets A and B, which is represented by A∩B, is a set which contains all the common elements that belong to both set A and set B.

    Here, we are given that set A = (3, 4, 6, 14, 19) and set B = (1, 3, 6, 8, 14). So we will look for the elements that are common in both the sets A and B.

    3, 4 and 6 are the elements found in both the sets, therefore the intersection A∩B = (3, 6, 14)

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