Let be the set of all the words that can be formed by arranging all the letters of the word GARDEN. From the set , one word is selected at random. The probability that the selected word will NOT have vowels in alphabetical order is:
- A
- B
- C
- D
Let be the set of all the words that can be formed by arranging all the letters of the word GARDEN. From the set , one word is selected at random. The probability that the selected word will NOT have vowels in alphabetical order is:
Correct answer:D
Complementary Probability Method
Given: The word GARDEN has distinct letters, with vowels and .
Find: The probability that a randomly selected arrangement does NOT have vowels in alphabetical order.
Total number of arrangements is
To count arrangements where the vowels are in alphabetical order, choose positions for and and then arrange the remaining consonants:
So,
Therefore,
Hence, the correct option is D.
Symmetry of Relative Order
Given: The vowels are and in all arrangements of GARDEN.
Find: The probability that they are NOT in alphabetical order.
For any arrangement, the relative order of and is equally likely to be before or before . Since these two possibilities are symmetric,
Alphabetical order means comes before , so not being in alphabetical order means comes before .
Therefore, the required probability is , so the correct option is D.
Counting all arrangements with vowels in order as is incorrect because alphabetical order is a restriction on the relative positions of and . Only half of the total arrangements satisfy before .
Using only as the favorable count is wrong because that arranges only the consonants. You must also choose the positions occupied by the vowels, giving .
Forgetting to take the complement leads to the wrong event. The solution first finds the probability that vowels are in alphabetical order, then subtracts from to get the probability that they are NOT in alphabetical order.
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