Answer:
The standard deviation is [tex]\hat p_{R} -\hat p_{S} = \sqrt{\frac{\hat p_{R}(1-\hat p_{R})}{50} + \frac{\hat p_{S}(1-\hat p_{S})}{100} }[/tex]
Step-by-step explanation:
The standard deviation of a sampling distribution is the standard error or a valuation of the standard deviation. Where statistic parameter is the mean it is referred to as the standard error of the mean.
The formula for standard deviation of a sampling distribution is as follows;
[tex]\hat p_{R} -\hat p_{S} = \sqrt{\frac{\hat p_{R}(1-\hat p_{R})}{n_R} + \frac{\hat p_{S}(1-\hat p_{S})}{n_S} }[/tex]
Where;
[tex]{\hat p_{R}}[/tex] = Sample proportion of rabbits with white markings from R
[tex]{\hat p_{S}}[/tex] = Sample proportion of rabbits with white markings from S
[tex]n_R[/tex] = Number of from R = 50
[tex]n_S[/tex] = Number of from S = 100
Therefore, the standard deviation of the sampling distribution is given as follows;
[tex]\hat p_{R} -\hat p_{S} = \sqrt{\frac{\hat p_{R}(1-\hat p_{R})}{50} + \frac{\hat p_{S}(1-\hat p_{S})}{100} }[/tex].
