Q.7 From the set of 10 numbers {1, 2,...,10} three numbers are selected at random without replacement. The probability that the sum of these selected numbers is 9, is (A) 1/40 (B) 1/20 (C) 3/10 (D) 3/80

Q.7 From the set of 10 numbers {1, 2,…,10} three numbers are selected at random without replacement. The probability that the sum of these selected numbers is 9, is

  • (A) 1/40
  • (B) 1/20
  • (C) 3/10
  • (D) 3/80

 

The probability that three numbers selected at random without replacement from {1, 2, …, 10} sum to 9 is 3/120 = 1/40.

Total Outcomes

The total number of ways to choose 3 distinct numbers from 10 is the combination C(10,3) = 10!/(3!(10-3)!) = (10×9×8)/(3×2×1) = 120.

Favorable Outcomes

The only combinations summing to 9 are (1,2,6), (1,3,5), and (2,3,4).

No other sets of three distinct numbers from 1 to 10 sum exactly to 9, as larger numbers exceed the target when paired with smaller ones.

Probability Calculation

Probability equals favorable outcomes divided by total outcomes: 3/120 = 1/40.

Option Analysis

Option Value Reason
(A) 1/40 Correct Matches 3/120
(B) 1/20 Incorrect Equals 6/120, overcounts favorable cases
(C) 3/10 Incorrect Far too high (36/120), ignores combinations
(D) 3/80 Incorrect Assumes smaller sample space like C(8,3)=56, but total is 120

CSIR NET Exam Context

The probability three numbers from 1 to 10 sum to 9 is a classic combinations problem for CSIR NET Life Sciences and math competitive exams. Selecting three distinct numbers without replacement from the set {1, 2, …, 10} requires computing favorable outcomes over total possibilities.

Step-by-Step Solution

  • Total ways: C(10,3) = 120
  • Favorable: Only (1,2,6), (1,3,5), (2,3,4) sum to 9
  • Thus, P = 3/120 = 1/40, option (A)

This reinforces combination formulas essential for competitive exams like CSIR NET.

 

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