Question

Let *x* be a random variable representing dividend yield
of bank stocks. We may assume that *x* has a normal
distribution with *σ* = 3.3%. A random sample of 10 bank
stocks gave the following yields (in percents).

5.7 | 4.8 | 6.0 | 4.9 | 4.0 | 3.4 | 6.5 | 7.1 | 5.3 | 6.1 |

The sample mean is *x* = 5.38%. Suppose that for the
entire stock market, the mean dividend yield is *μ* = 4.8%.
Do these data indicate that the dividend yield of all bank stocks
is higher than 4.8%? Use *α* = 0.01.

(a) What is the level of significance?

(b)State the null and alternate hypotheses. Will you use a
left-tailed, right-tailed, or two-tailed test?

*H*_{0}: μ = 4.8%;
*H*_{1}: μ ≠ 4.8%; two-tailed

*H*_{0}: μ = 4.8%;
*H*_{1}: μ > 4.8%;
right-tailed

*H*_{0}: μ = 4.8%;
*H*_{1}: μ < 4.8%; left-tailed

*H*_{0}: μ > 4.8%;
*H*_{1}: μ = 4.8%; right-tailed

(c) What sampling distribution will you use? Explain the rationale for your choice of sampling distribution.

The standard normal, since we assume that *x* has a
normal distribution with unknown σ.

The standard normal, since we assume that *x* has a
normal distribution with known σ.

The Student's *t*, since we assume that *x* has a
normal distribution with known σ.

The Student's *t*, since *n* is large with unknown
σ.

(d)What is the value of the sample test statistic? (Round your
answer to two decimal places.)

(e) Find (or estimate) the *P*-value. (Round your answer to
four decimal places.)

(f)Sketch the sampling distribution and show the area corresponding
to the *P*-value.

(g) Based on your answers in parts (a) to (e), will you reject or fail to reject the null hypothesis? Are the data statistically significant at level α?

At the α = 0.01 level, we reject the null hypothesis and conclude the data are statistically significant.

At the α = 0.01 level, we reject the null hypothesis and conclude the data are not statistically significant.

At the α = 0.01 level, we fail to reject the null hypothesis and conclude the data are statistically significant.

At the α = 0.01 level, we fail to reject the null hypothesis and conclude the data are not statistically significant.

(h) State your conclusion in the context of the application.

There is sufficient evidence at the 0.01 level to conclude that the average yield for bank stocks is higher than that of the entire stock market.

There is insufficient evidence at the 0.01 level to conclude that the average yield for bank stocks is higher than that of the entire stock market.

Answer #1

Part a)

*α* = 0.01.

part b)

*H*_{0}: μ = 4.8%;
*H*_{1}: μ > 4.8%;
right-tailed

Part c)

The standard normal, since we assume that *x* has a
normal distribution with known σ.

Part d)

Test Statistic :-

**Z = 0.56**

Test Criteria :-

Reject null hypothesis if

Result :- Fail to reject null hypothesis

P ( Z > 0.56 ) = 1 - P ( X < 0.56 ) = 0.2892

At the α = 0.01 level, we fail to reject the null hypothesis and conclude the data are not statistically significant.

There is insufficient evidence at the 0.01 level to conclude that the average yield for bank stocks is higher than that of the entire stock market.

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of bank stocks. We may assume that x has a normal
distribution with σ = 2.8%. A random sample of 10 bank
stocks gave the following yields (in percents).
5.7
4.8
6.0
4.9
4.0
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distribution with σ = 3.2%. A random sample of 10 bank
stocks gave the following yields (in percents).
5.7
4.8
6.0
4.9
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3.4
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entire stock market, the mean dividend yield is μ = 4.5%.
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distribution with σ = 2.7%. A random sample of 10 bank
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4.8
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6.5
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stocks gave the following yields (in percents).
5.7
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3.4
6.5
7.1
5.3
6.1
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entire stock market, the mean dividend yield is μ = 4.4%.
Do these data indicate that the dividend yield of all bank stocks...

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