The heights of adult females are normally distributed. If you were to construct a histogram of 40 randomly selected women, what
shape would the histogram of those heights have and what pattern would you expect in a normal quantile plot of these data? a. The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be bell-shaped.
b. The histogram would by non-symmetric, and the normal quantile plot would have data points that would be non- linear.
c. The histogram would by approximately bell-shaped, and the normal quantile plot would have data points that would be non-linear.
d. The histogram would be approximately bell-shaped, and the normal quantile plot would have data points have follow a straight-line pattern.
d. The histogram would be approximately bell-shaped, and the normal quantile plot would have data points have follow a straight-line pattern.
Step-by-step explanation:
Since the variable is normally distributed, the histogram of women's height should be approximately bell shaped (if the data was obtained form a random sample).
Again, the variable is normally distributed, therefore, the quantile plot should follow a straight line pattern (a diagonal line to be more precise).
So 1 pound is 16 so u can do 16/3 but it will give u a number like this 5.3333333 so what i did was 15/3 that got me 5 so each friend will get 5 and it will be one left
