Math, asked by phanindrakoka, 10 months ago

6 cubical boxes A, B, C, D, E and F are arranged one above the other vertically. The boxes are arranged subject to following conditions:
(i) The number of boxes above F is the same as the number of boxes below C.
(ii) E is the only box below B.
(iii) A is not the top-most box.
In how many ways can the boxes be arranges ?

Answers

Answered by nuuk
1

Answer:one way

Step-by-step explanation:

Given

there are 6 cubical boxes

no of boxes above F and no of boxes below c is same therefore F and C are at 3 rd and 4 th position From Top.

E is the only box below B thus E is at bottom

A is not at top most

thus A is at 2nd position

thus order of box is

D A F C B E

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