I need to answer letter F but I have been unable to solve please help

The reading speed of second grade students in a large city is approximately normal, with a mean of 88 words per minute (wpm) and a standard deviation of 10 wpm. Complete parts (a) through (f). O A. Increasing the sample size increases the probability because o; increases as n increases. B. Increasing the sample size decreases the probability because of decreases as n increases O C. Increasing the sample size decreases the probability because of increases as n increases O D. Increasing the sample size increases the probability because of decreases as n increases. (e) A teacher instituted a new reading program at school. After 10 weeks in the program, it was found that the mean reading speed of a random sample of 22 second grade students was 90.3 wpm. What might you conclude based on this result? Select the correct choice below and fill in the answer boxes within your choice. (Type integers or decimals rounded to four decimal places as needed.) O A. A mean reading rate of 90.3 wpm is unusual since the probability of obtaining a result of 90.3 wpm or more is . This means that we would expect a mean reading rate of 90.3 or higher from a population whose mean reading rate is 88 in of every 100 random samples of size n = 22 students. The new program is abundantly more effective than the old program. B. A mean reading rate of 90.3 wpm is not unusual since the probability of obtaining a result of 90.3 wpm or more is 0.1401 . This means that we would expect a mean reading rate of 90.3 or higher from a population whose mean reading rate is 88 in 14 of every 100 random samples of size n = 22 students. The new program is not abundantly more effective than the old program. (f) There is a 5% chance that the mean reading speed of a random sample of 24 second grade students will exceed what value? There is a 5% chance that the mean reading speed of a random sample of 24 second grade students will exceed wpm. (Round to two decimal places as needed.)