MBA Exam

Let n! = 1 × 2 × 3 × … × n for integer n ≥ 1. If p = 1! + (2 × 2!) + (3 × 3!) + … + (10 × 10!), then p+2 when divided by 11! leaves a remainder of ....

1) 10
2) 0
3) 7
4) 1

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MBA Other Question
The equations of two sides AB and AC of an isosceles triangle ABC are x + y =5 and 7x - y = 3 respectively. What will be the length of the intercept cut by the side BC on the y-axis?

1) 9/5
2) 8
3) 1.5
4) No unique solution
 Find the remainder when the sum 2^100+2^200+2^300..+...+..2^10000 is divided by 7

1) 0
2) 2
3) 1
4) 6
5) None of these.