(N-1)=(4-1)= N=3 l=0,1,2,3
Since there are no lists following, the answer must be "none of them!"
[ -2n ] is positive for all negative values of 'n' .
What are all the possible whole number values for 7
for a normal-shaped distribution with n=50 and siqma =8 : a- what proportion of the scores have values between 46 and 54? b- for samples of n= 4, what means have values what proportion of the sample mean have values between 46 and 54? c- for samples of n= 16, what means have values what proportion of the sample mean have values between 46 and 54?
45, 90, 180
4,3,2,1,0
(N-1)=(4-1)= N=3 l=0,1,2,3
45, 90, 180
n = 3/2, n = 2
4
Since there are no lists following, the answer must be "none of them!"
13
[ -2n ] is positive for all negative values of 'n' .
lab values for n is 135,lab values for k is 3.5 to 5.5.
Which region you shade depends on whether you are required to shade the possible values or the values that need t be rejected. In 2 or more dimensions, you would normally shade the regions to be rejected - values that are not solutions. With a set of inequalities, this will result in an unshaded region (if any) any point of which will satisfy all the equations.If the inequality is written in the form x < N where N is some given value, then the possible solutions are to the left of N and the rejected values are to the right. Whether the value N, itself, is shaded or not depends on whether the inequality is strict or not.
It is the mean or average value of the n values. [Σn xi]/n = xmean