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? Joaquin won because the median of his scores is 73. 5 and the median of Trisha’s scores is 83. Joaquin won because the median of his scores is 83 and the median of Trisha’s scores is 73. 5. Trisha won because the median of her scores is 73. 5 and the median of Joaquin’s scores is 83. Trisha won because the median of her scores is 83 and the median of Joaquin’s scores is 73. 5.

In a data set involving an array of numbers, the median is usually the middle number after the data sets are arranged in order of magnitude from the lowest to the highest.

From the given information:

Joaquin’s scores: 75, 72, 85, 62, 58, 91

Trisha’s scores: 92, 90, 55, 76, 91, 74

Now, by rearranging the array of numbers, we have:

Joaquin’s scores: 58, 62, 72, 75, 85, 91

Trisha’s scores: 55, 74, 76, 90, 91, 92

The median score of Joaquin is = (72 + 75)/2 = 73.5

The median score of Trisha is = (76 + 90)/2 = 83

Therefore, we can conclude that Joaquin won because the median of his scores is 73.5 and the median of Trisha’s scores is 83.

Learn more about the median of a data set here:

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