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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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14 Feb 2019, 08:42
# of ways in which I's are together: 4! (glue method). Usually with the glue method need to multiply by 2, but given I's are the same, don't need to. How many total ways can "digit" be arranged with no restriction? 5! = 120. Need to divide by 2! given the repetition. 6024 = 36



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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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15 Feb 2019, 00:47
chetan2uIn the 2nd case ie when the 2 Is are together why are we not dividing the 4! by 2!, as the interchange of the 2 Is when they are together will lead to double the number of arrangements... Please correct me... Thanks in advance



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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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10 Mar 2019, 20:45
The correct answer is Choice D. First, determine the total number of ways of rearranging the letters in DIGIT. 5! / 2! (accounts for the repetition of the 2 letter "I"s) = (5 x 4 x 3 x 2) / 2 = 120 / 2 = 60 Next, consider all the ways two letter "I"s can be adjacent within the word. They can either be in the 1/2 slot, the 2/3 slot, the 3/4 slot, or the 4/5 slot (4 locations), and for each of those 4 locations there are 3 x 2 x 1 = 6 other ways of rearranging the final 3 letters, so multiply 6 by 4 to get 24. Subtract those 24 instances from the total to get 60  24 = 36Brian
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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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04 Jun 2019, 19:23
total number of ways that the letters can be arranged is (5!/2!) =60
it is easiest to find how many ways the I's can be together.
First we can treat both I's as a single entity ( I &I ).
This essentially this means we are arranging four entities which becomes 4!.
Thus the answer to the question is (5!/2!) 4! = 36



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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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22 Jun 2019, 06:39
@ adiagr wrote: Bunuel wrote: The letters D, G, I, I , and T can be used to form 5letter strings as DIGIT or DGIIT. Using these letters, how many 5letter strings can be formed in which the two occurrences of the letter I are separated by at least one other letter?
A) 12 B) 18 C) 24 D) 36 E) 48 Let us calculate the total ways. Those would be (5!/2!) = 60. Now since the question says "at least" let us find the number of arrangements when both I's are together. (Tie them up). so we have 4! ways to arrange such that I's always come together. 4! = 24 60  24 = 36. D is the answer. I can never get this right! I always end up putting 4!*2! when i have to calculate ways of arranging DIGIT with both th I's combined, that because in my head i think both the I's can also be arranged in two ways. How do i get to correct this ! Bunuel Please help



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The letters D, G, I, I , and T can be used to form 5letter strings as
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Updated on: 07 Aug 2019, 22:03
We have letters: D, G, I, I, T We need to have at least one letter between both the "I"s. We can find the answer by finding: (Total Number of ways the 5 letters can be arranged)  (Number of ways the letters are arranged such that both the "I"s stay together) > (a)
Number of ways the 5 letters can be arranged is \(\frac{5!}{2!}\) = 60 ways
To calculate the number of ways the letters can be arranged such that both the "I"s stay together, we need to consider both "I"s as one element (can't be separated). Thus, we only have 4 elements to arrange now "D", "G", "II", "T". These 4 elements can be arranged in 4! ways = 24 ways [We do not have to worry about interchanging the two "I"s positions are they are not distinct elements].
Thus, From (a), the required number of arrangements = 60  24 = 36 ways.
Answer D
Originally posted by Sayon on 01 Aug 2019, 21:03.
Last edited by Sayon on 07 Aug 2019, 22:03, edited 1 time in total.



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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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04 Aug 2019, 21:55
one of the easiest. We need to remember that 'Not together' in Permutation and Combinations can be achieved by Total arrangements/combinations(Minus)together.
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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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17 Aug 2019, 00:19
varundixitmro2512 wrote: IMO 36
Total no of ways arranging 5 letter with one letter redundant is 5!/2!=60 No of ways two I's can be together 4!=24
no of ways at least one alpha is between two I's =6024=36 Why isn’t 4 factorial divided by 2 factorial? Posted from my mobile device



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Re: The letters D, G, I, I , and T can be used to form 5letter strings as
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17 Aug 2019, 01:17
Bunuel wrote: The letters D, G, I, I , and T can be used to form 5letter strings as DIGIT or DGIIT. Using these letters, how many 5letter strings can be formed in which the two occurrences of the letter I are separated by at least one other letter?
A) 12 B) 18 C) 24 D) 36 E) 48 Given: The letters D, G, I, I , and T can be used to form 5letter strings as DIGIT or DGIIT. Asked: Using these letters, how many 5letter strings can be formed in which the two occurrences of the letter I are separated by at least one other letter? Total 5letters strings that can be formed by using {D,G,I,I,T} = 5!/2! = 60 5letter strings that can be formed by using II together = 4! = 24 5letter strings can be formed in which the two occurrences of the letter I are separated by at least one other letter = 60 24 =36 IMO D
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The letters D, G, I, I , and T can be used to form 5letter strings as
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22 Sep 2019, 22:58
ScottTargetTestPrep wrote: Bunuel wrote: The letters D, G, I, I , and T can be used to form 5letter strings as DIGIT or DGIIT. Using these letters, how many 5letter strings can be formed in which the two occurrences of the letter I are separated by at least one other letter?
A) 12 B) 18 C) 24 D) 36 E) 48 This is a permutation problem because the order of the letters matters. Let’s first determine in how many ways we can arrange the letters. Since there are 2 repeating Is, we can arrange the letters in 5!/2! = 120/2 = 60 ways. We also have the following equation: 60 = (number of ways to arrange the letters with the Is together) + (number of ways without the Is together). Let’s determine the number of ways to arrange the letters with the Is together. We have: [II] [D] [G] [T] We see that with the Is together, we have 4! = 24 ways to arrange the letters. Thus, the number of ways to arrange the letters without the Is together (i.e., with the Is separated) is 60  24 = 36. Answer: D Hi, Scott, I do have a query regarding no. of ways to arrange I's together (I1 and I2). Why can not we write 4! * 2! as we can also arrange identical I's in two ways and that will give the option A (6048 = 12). Regards, Raxit.




The letters D, G, I, I , and T can be used to form 5letter strings as
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