Using the mean, median and mode we can assume that a good prediction for her height would be 55 inches.
In the given data ,
Range of the data is 10. So all the values are between 50 and 60.
mode of the data is 57 , and the mean is 55 and the median is 55
Therefore a random 6th grader can have any value between 50 and 60 since it is the range.
Now the mean and median of the function will be closest to a random value.
Hence of all the options 55 is the most efficient explanation of the central tendency of the dataset .
When the probability density function contains a large number of local maxima, the edge points of a continuous distribution are frequently referred to as the distribution's modes.
Any x value that causes the density function probability of a variate to reach a locally maximum value is often thought of as a mode, making any peak a mode.
The median is the value that divides the top and bottom halves of a large dataset, a demographic, or a probability distribution in statistics and probability theory.
Hence of all the options 55 is the most efficient explanation of the central tendency of the dataset .
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