# Statistics Problems

One of the best ways to learn statistics is to solve practice problems. These problems test your understanding of statistics terminology and your ability to solve common statistics problems. Each problem includes a step-by-step explanation of the solution.

- Use the dropdown boxes to describe the type of problem you want to work on.
- click the
**Submit**button to see problems and solutions.

Main topic:

Sub-topic:

Problem description:

## Problem 1

In one state, 52% of the voters are Republicans, and 48% are Democrats. In a second state, 47% of the voters are Republicans, and 53% are Democrats. Suppose a simple random sample of 100 voters are surveyed from each state.

What is the probability that the survey will show a greater percentage of Republican voters in the second state than in the first state?

(A) 0.04

(B) 0.05

(C) 0.24

(D) 0.71

(E) 0.76

## Solution

The correct answer is C. For this analysis, let P_{1} = the proportion of Republican voters in the first state,
P_{2} = the proportion of Republican voters in the second state, p_{1} = the proportion of Republican voters in
the sample from the first state, and p_{2} = the proportion of Republican voters in the sample from the second state.
The number of voters sampled from the first state (n_{1}) = 100, and the number of voters sampled from the
second state (n_{2}) = 100.

The solution involves four steps.

- Make sure the sample size is big enough to model differences with a normal population.
Because n
_{1}P_{1}= 100 * 0.52 = 52, n_{1}(1 - P_{1}) = 100 * 0.48 = 48, n_{2}P_{2}= 100 * 0.47 = 47, and n_{2}(1 - P_{2}) = 100 * 0.53 = 53 are each greater than 10, the sample size is large enough. - Find the mean of the difference in sample proportions: E(p
_{1}- p_{2}) = P_{1}- P_{2}= 0.52 - 0.47 = 0.05. - Find the standard deviation of the difference.
σ

_{d}= sqrt{ [ P1(_{1}- P_{1}) / n_{1}] + [ P_{2}(1 - P_{2}) / n_{2}] }σ

_{d}= sqrt{ [ (0.52)(0.48) / 100 ] + [ (0.47)(0.53) / 100 ] }σ

_{d}= sqrt (0.002496 + 0.002491) = sqrt(0.004987) = 0.0706 - Find the probability. This problem requires us to find the probability that p1 is less than p
_{2}. This is equivalent to finding the probability that p_{1}- p_{2}is less than zero. To find this probability, we need to transform the random variable (p_{1}- p_{2}) into a z-score. That transformation appears below.z

_{p1 - p2}= (x - μ_{p1 - p2}) / σ_{d}= (0 - 0.05)/0.0706 = -0.7082Using Stat Trek's Normal Distribution Calculator, we find that the probability of a z-score being -0.7082 or less is 0.24.

Therefore, the probability that the survey will show a greater percentage of Republican voters in the second state than in the first state is 0.24.

**See also:** Difference Between Proportions