Calculation:

It is given that the probability of getting correct answers for the sample of 50 multiple choice questions is 0.70.

Denote p as the sample proportion and it is given as 0.70.

Mean of the sampling distribution:

The mean of the distribution of the sample proportion will be equals to the proportion (p).

Thus, the mean of the distribution is 0.70.

Standard deviation of the sampling distribution:

Standard deviation=p(1−p)n.

Where, p be the sample proportion and n be the sample size.

Substitute the corresponding values to get standard deviation,

Standard deviation=0.70(1−0.70)50=0.70(1−0.70)50=0.70(0.30)50

                           =0.2150=0.0042≈0.0648

Thus, the standard deviation of the sampling distribution is 0.0648.

Calculation:

Verify the condition:

For the large sample size n, the binomial distribution is approximately normal, only if the following conditions are satisfied. That is, np≥15 and n(1−p)≥15.

Requirement check:

Substitute the corresponding values to check the requirements,

np=50(0.70)≈35≥15

n(1−p)=50(1−0.7)=50(0.30)≈15≥15

Here, the conditions for the normality assumption have been satisfied. Thus, the shape of the distribution is assumed to be symmetric or bell-shaped.

Calculation:

The z-score:

The z-score of an observation is obtained by subtracting the mean value from the observation and dividing the difference by the corresponding standard deviation. It measures the number of standard deviations that an observation is away from its mean. A positive z-score indicates that the observation lies above the mean, whereas a negative z-score indicates that the observation lies below the mean. The formula for the z-score is:

z=observation−meanstandard deviation.

Here, mean(p)=0.60, standard deviation=0.0648.

For this sample proportion, observation=0.60.

Thus, the z-score for sample proportion is:

z=observation−meanstandard deviation=0.60−0.700.0648=−0.100.0648≈−1.54

Thus, the z-score for sample proportion of 0.60 is –1.54.

Use Table A in Appendix A: Standard Normal Cumulative Probabilities to find the z value.

Procedure:

For z at –1.54,

• Locate 1.50 in the left column of the table.
• Obtain the value in the corresponding row below 0.04.

That is, P(z<−1.54)=0.063

Thus, the probability of the sample proportion almost 0.60 is 0.063.

However, the probability of 0.063 is very low, so, it would not be surprising if the proportion of getting correct answers is only 60%.