The iccompanying histogram shows the number of runs soored by baseball teams for three seasons. The distribution is roughly unimodal and symmetric, with a mean of 689 and a standare deviation of 68 runs. An interval one standard deviabon above and below the mean is marked on the histogram. Assume the values in a bin are diatribued unifomiy. For example, if the leftr is at the midpoint, then half of that biris values are below the line and half are above. Complete parts (a) through (c) below. Elick the icon to view the histogram. a. According to the Empirical Rule, approximately what percent of the data should fall in the inferval from 621 to 757 (that is, one standard deviation above and below the mean)? Approximatoly % of the data should fall in the interval from 621 to 757. b. Use the histogram to estimate the actua percent of leams that fall in this interval. How did your estimate compare to the value prediclod by the Empirical fule? A. 68% of the data talls in the interval from 621 to 757 . The estimate is very doso to the value predicted by the Empirical Rule. B. 94% of the data falls in the interval from 621 to 757 . The estimate is very close to the value predicted by the Empirical Aule. C. 50% of the data talis in the interval from 621 to 757 . The estirate is not close to the valuo predicted by the Empincal Rule. D. 63% of the data falls in the interval from 621 to 757. The estimate is not dose to the value predicted by the Empical Rule. c. Beteeen what twe values would you expect to find about 95% of the teams? You expect to find about 95% of the teams between the two values and. (Bimplity your answers. Use ascending order).

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