From 6 different novels and 3 different dictionaries, 4 novels and 1 dictionary are to be selected and arranged in a row on a shelf so that the dictionary is always in the middle. Then the number of such arrangement is :
A.
at least 500 but less than 750
B.
at least 750 but less than 1000
C.
at least 1000
D.
less than 500
Answer :
at least 1000
Solution :
4 novels, out of 6 novels and 1 dictionary out of 3 can be selected in $$^6{C_4} \times {\,^3}{C_1}{\text{ ways}}{\text{.}}$$
Then 4 novels with one dictionary in the middle can be arranged in $$4!$$ ways.
$$\therefore $$ Total ways of arrangement
$$ = {\,^6}{C_4} \times {\,^3}{C_1} \times 4! = 1080.$$
Releted MCQ Question on Algebra >> Permutation and Combination
Releted Question 1
$$^n{C_{r - 1}} = 36,{\,^n}{C_r} = 84$$ and $$^n{C_{r + 1}} = 126,$$ then $$r$$ is:
Ten different letters of an alphabet are given. Words with five letters are formed from these given letters. Then the number of words which have at least one letter repeated are
Eight chairs are numbered 1 to 8. Two women and three men wish to occupy one chair each. First the women choose the chairs from amongst the chairs marked 1 to 4 ; and then the men select the chairs from amongst the remaining. The number of possible arrangements is