Question:
In a testing of hypothesis problem, which one of the following statements is true?
In a testing of hypothesis problem, which one of the following statements is true?
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A Type-I error is rejecting a true null hypothesis, while a Type-II error is accepting a false null hypothesis.
Updated On: Feb 8, 2026
- The probability of the Type-I error cannot be higher than the probability of the Type-II error
- Type-II error occurs if the test accepts the null hypothesis when the null hypothesis is actually false
- Type-I error occurs if the test rejects the null hypothesis when the null hypothesis is actually false
- The sum of the probability of the Type-I error and the probability of the Type-II error should be 1
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The Correct Option is B
Solution and Explanation
Step 1: Understanding Type-I and Type-II errors.
In hypothesis testing, a **Type-I error** occurs when the null hypothesis is rejected when it is actually true. In contrast, a **Type-II error** occurs when the null hypothesis is accepted when it is actually false. Therefore, the correct statement will describe the correct definition of these errors.
Step 2: Analyzing the options.
(A) The probability of the Type-I error cannot be higher than the probability of the Type-II error:
This is not true. The probabilities of Type-I and Type-II errors are independent of each other, and neither is bound to be greater than the other. The likelihood of each error depends on the test's significance level (\(\alpha\)) and the power of the test.
(B) Type-II error occurs if the test accepts the null hypothesis when the null hypothesis is actually false:
Correct — this is the definition of a Type-II error. A Type-II error happens when the null hypothesis is incorrectly accepted when it should be rejected because it is actually false.
(C) Type-I error occurs if the test rejects the null hypothesis when the null hypothesis is actually false:
This is incorrect. A Type-I error occurs when the null hypothesis is rejected when it is actually true, not false.
(D) The sum of the probability of the Type-I error and the probability of the Type-II error should be 1:
This is incorrect. The sum of the probabilities of Type-I and Type-II errors is not necessarily 1. They are independent of each other and depend on various factors such as the significance level (\(\alpha\)) and the power of the test.
Step 3: Conclusion.
The correct statement is (B), which accurately describes the Type-II error.
In hypothesis testing, a **Type-I error** occurs when the null hypothesis is rejected when it is actually true. In contrast, a **Type-II error** occurs when the null hypothesis is accepted when it is actually false. Therefore, the correct statement will describe the correct definition of these errors.
Step 2: Analyzing the options.
(A) The probability of the Type-I error cannot be higher than the probability of the Type-II error:
This is not true. The probabilities of Type-I and Type-II errors are independent of each other, and neither is bound to be greater than the other. The likelihood of each error depends on the test's significance level (\(\alpha\)) and the power of the test.
(B) Type-II error occurs if the test accepts the null hypothesis when the null hypothesis is actually false:
Correct — this is the definition of a Type-II error. A Type-II error happens when the null hypothesis is incorrectly accepted when it should be rejected because it is actually false.
(C) Type-I error occurs if the test rejects the null hypothesis when the null hypothesis is actually false:
This is incorrect. A Type-I error occurs when the null hypothesis is rejected when it is actually true, not false.
(D) The sum of the probability of the Type-I error and the probability of the Type-II error should be 1:
This is incorrect. The sum of the probabilities of Type-I and Type-II errors is not necessarily 1. They are independent of each other and depend on various factors such as the significance level (\(\alpha\)) and the power of the test.
Step 3: Conclusion.
The correct statement is (B), which accurately describes the Type-II error.
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