Value Questions

MCQ - 3-3979

Question:

What is the average of a list of n consecutive integers?

(1) The smallest number in the list is 5.

(2) n = 8

Statement (1) ALONE is sufficient, but statement (2) alone is not sufficient.
Statement (2) ALONE is sufficient, but statement (1) alone is not sufficient.
BOTH statements TOGETHER are sufficient, but NEITHER statement ALONE is sufficient.
Statement (2) ALONE is sufficient, but statement (1) alone is not sufficient.
Statements (1) and (2) TOGETHER are NOT sufficient.

Correct Answer: C

Explanation:

Statement (1) tells us the smallest number, but not how many numbers are in the list. It is not sufficient. Cross off A and D.

Statement (2) tells us the value of n, so the question becomes: What is the average of a list of 8 consecutive integers? Since those integers can be large, small, or even negative, we have no way to tell what the average is. Statement (2) is not sufficient, so we can eliminate B.

Now let’s put the two statements together. If we know that 5 is the smallest number in a list of 8 consecutive numbers, then we can easily reconstruct the list and find the average. So the statements are sufficient when put together, and the answer is C.

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Record Performance

34 MCQ for effective preparation of the test of Value Questions of Data Sufficiency section.

Read the MCQ statement: What is the average of a list of n consecutive integers? (1) The smallest number in the list is 5. (2) n = 8, keenly and apply the method you have learn through the video lessons for Value Questions to give the answer. Record your answer and check its correct answer and video explanation for MCQ No. 3-3979.

How to Answer

Solve the question for MCQ No. and decide which option (A through D/E) is the best choice to answer the MCQ, then click/tap the blue button to view the correct answer and it explanation.

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