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03 Mar 2021, 05:45
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
40% (02:31) correct
60%
(03:06)
wrong
based on 94
sessions
History
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How many arrangements can be made by the letters of word DEFINITION if the letters I do not occupy the first or last place?
A. 20,160
B. 40,320
C. 70,560
D. 141,120
E. 282,240
Are You Up For the Challenge: 700 Level Questions: 700 Level Questions
A. 20,160
B. 40,320
C. 70,560
D. 141,120
E. 282,240
Are You Up For the Challenge: 700 Level Questions: 700 Level Questions
27 Jun 2021, 08:58
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Bunuel
How many arrangements can be made by the letters of word DEFINITION if the letters I do not occupy the first or last place?
A. 20,160
B. 40,320
C. 70,560
D. 141,120
E. 282,240
Are You Up For the Challenge: 700 Level Questions: 700 Level Questions
A. 20,160
B. 40,320
C. 70,560
D. 141,120
E. 282,240
Are You Up For the Challenge: 700 Level Questions: 700 Level Questions
These questions require us to first analyse the letters.
I:3
N:2
D,E,F,T,O: 1 each
Total ways without any restrictions = \(\frac{10!}{3!2!}=10*9*8*7*6*5*2=302400\)
Now, let us check for the ways with restrictions
I at first spot: The remaining 9 can be put in \(\frac{9!}{2!2!}=90720\)
Similarly for I at last spot: 90720.
However the ways when I is at both first and the last spot is being subtracted twice, once in each case. We will, therefore, have to add these back once.
I at the first and the last spot: Remaining 8 can be placed in \(\frac{8!}{2!}=20160\)
So 2*90720-20160=161280
Total ways with restrictions = 302400-161280=141120
D
rvgmat12
General Discussion
03 Mar 2021, 05:54
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Number of words where I is not in the 1st or last = Total words - Words where I occupies the 1st and last place
DEFINITION has 10 letters with 3 I's, 2 N's and 1 each of D, E, F, T and O.
Total words = 10! / 3!2!
Words where I comes in the 1st and the last place.
2 I's can be placed in these 2 positions in 1 way. The remaining 8 letters can be arranged in 8!/2! ways (these contain 2 N's)
Therefore Total number of words = \(\frac{10!}{3!2!} - \frac{8!}{2!} = \frac{10 * 9 * 8!}{6 * 2} - \frac{8!}{2} = \frac{8!}{2}(15 - 1)\)
= 40320 * 7 = 282240
Option E
Arun Kumar
DEFINITION has 10 letters with 3 I's, 2 N's and 1 each of D, E, F, T and O.
Total words = 10! / 3!2!
Words where I comes in the 1st and the last place.
2 I's can be placed in these 2 positions in 1 way. The remaining 8 letters can be arranged in 8!/2! ways (these contain 2 N's)
Therefore Total number of words = \(\frac{10!}{3!2!} - \frac{8!}{2!} = \frac{10 * 9 * 8!}{6 * 2} - \frac{8!}{2} = \frac{8!}{2}(15 - 1)\)
= 40320 * 7 = 282240
Option E
Arun Kumar
