For an instance, A,B,C,D,E,F represent the students, and ABC must be seated together. Use factorial of 4 (4!). Why 4? Because we have 4 different positions. ABC together, and D, E, F who can be seated separately. 4! = 4 × 3 × 2 × 1 4! = 24
After that, multiply the result of the factorial above by 6. Why 6? Because ABC could have different order: ABC, ACB, BAC, BCA, CAB, CBA, as long as they are together. Therefore, number of ways = 24 × 6 number of ways = 144
Students : A B C D E F 3 of them (A, B, & C) must be seated together
options:: A B C D E F ..... D E F A B C ..... D A B C E F ..... D E A B C F A B C D F E ..... D F E A B C ..... D A B C F E ..... D F A B C E A B C E F D ..... E F D A B C ..... E A B C F D ..... E F A B C D A B C E D F ..... E D F A B C ..... E A B C D F ..... E D A B C F A B C F E D ..... F E D A B C ..... F A B C E D ..... F E A B C D A B C F D E ..... F D E A B C ..... F A B C D E ..... F D A B C E
