Joaquin and Trisha are playing a game in which the lower median wins the game. Their scores are shown below. Joaquin’s scores: 75, 72, 85, 6

Question

Joaquin and Trisha are playing a game in which the lower median wins the game. Their scores are shown below. Joaquin’s scores: 75, 72, 85, 62, 58, 91 Trisha’s scores: 92, 90, 55, 76, 91, 74 Which supports the conclusion that Joaquin won the game?

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Madeline 3 weeks 2021-10-08T03:58:54+00:00 2 Answers 0

Answers ( )

    0
    2021-10-08T04:00:08+00:00

    Answer:

    the answer is A)

    Step-by-step explanation:

    took the test and got a 90

    0
    2021-10-08T04:00:32+00:00

    Answer:

    Step-by-step explanation:

    Given

    Joaquin’s score is 75,72,85,62,58,91

    and Trisha’s score is 92,90,55,76,91,74

    Arranging score in order of value we get

    Joaquin’s : 58,62,72,75,85,91

    Trisha’s : 55,74,76,90,91,92

    as no of values is even therefore their median is

    Joaquin’s=\frac{72+75}{2}=73.5

    Trisha’s =\frac{76+90}{2}=83

    Therefore median of Joaquin’s is lower

    Thus Joaquin wins the game

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45:7+7-4:2-5:5*4+35:2 =? ( )