Data on salaries in the public school system are published annually by a teachers' association. The mean annual salary of (public) classroom teachers is $58.2 thousand. Assume a standard deviation of $8.8 thousand. Complete parts (a) through (e) below. 3. Determine the sampling distribution of the sample mean for samples of size 64 . The mean of the sample mean is μx​=$ (Type an integer or a decimal. Do not round.) The standard deviation of the sample mean is σx˙​=$ (Type an integer or a decimat. Do not round.) b. Determine the sampling distribution of the sample mean for samples of size 256 . Data on salaries in the public school system are published annually by a teachers' association. The mean annual salary of (public) classroom teachers is $58.2 thousand. Assume a standard deviation of $8.8 thousand. Complete parts (a) through (e) below. b. Determine the sampling distribution of the sample mean for samples of size 256 . The mean of the sample mean is μ−​=$ (Type an integer or a decimal. Do not round.) The standard deviation of the sample mean is σxˉ​=$ (Type an integer or a decimk. Do not round.) c. Do you need to assume that classroom teacher salaries are normally distributed to answer parts (a) and (b)? Explain your answer. Data on salaries in the public school system are published annually by a teachers' association. The mean annual salary of (public) classroom c. Do you need to assume that classroom teacher salaries are normally distributed to answer parts (a) and (b)? Explain your answer. A. Yes, because x is only nomally distributed if x is normally distributed. B. Yes, because the sample sizes are not sufficiently large so that x will be approximately normally distributed, regardless of the distribution of x. C. No, because If x is normally distributed, then x must be normally distributed D. No, because the sample sizes are sufficiently large so that xˉ will be approximately normally distributed, regardiess of the distribution