Letxbe a random variable that represents the weights in kilograms (kg) of healthy adult female deer (does) in December in a national park. Thenxhas a distribution that is approximately normal with mean?=58.0kgand standard deviation?=6.4kg.Suppose a doe that weighs less than49kgis considered undernourished.

This is a Central Limit Theorem equation and these are problems that I struggle with due to the calculations and confusing steps at times. So can someone help me by showing me the proper steps and formulas in order to solve this equation.

*1? G a..." 69% I 2:46 PM Let X be a random variable that represents the weights in kilograms (kg) of healthy adult female deer (does) in December in a national park. Then}: has a distribution that is approximately normal with mean )1 = 58.0 kg and standard deviation 0 = 6.4 kg. Suppose a doe that weighs less than 49 kg is considered undernourished. (a) What is the probability that a single doe captured (weighed and released) at random in December is undernourished? (Round your answer to four decimal places.) I (b) If the park has about 2500 does, what number do you expect to be undernourished in December? (Round your answer to the nearest whole number.) :I does (0) To estimate the health of the December doe population, park rangers use the rule that the average weight of n = 40 does should be more than 55 kg. If the average weight is less than 55 kg, it is thought that the entire population of does might be undernourished. What is the probability that the average weight ; for a random sampie of 40 does is less than 55 kg (assuming a healthy population)? (Round your answer to four decimal places.) I (d) Compute the probability that ;