Answer:
480 Ways
Explanation:
Let z represent they must not sit together
z = (7-1) factorial ways
z = 6 factorial ways
Let x = the no. of ways the two children can be seated in 7 seats without seating next to each other
x = 2*5 factorial ways
Let y = no of ways the children can be seated on 7 seats, if the must not seat next to each other
z = x + y
y = z -x
y = 6 factorial minus 2*5 factorial
y = 6*5 factorial minus 2*5 factorial
y = 5 factorial (6-2)
y = 5 factorial times 4
y = 5*4*3*2*1*4
y = 480 ways.
