The difference between the squares of two consecutive odd integers is always divisible by:
3
6
7
8
Quiz Recommendation System API Link - https://fresherbell-quiz-api.herokuapp.com/fresherbell_quiz_api
# | Quiz |
---|---|
1
Discuss
|
A six-digit number is formed by repeating a three-digit number; for example, 256256 or 678678 etc. Any number of this form is always exactly divisible by :
Solution |
2
Discuss
|
The Unit digit in the product (784 X 618 X 917 X463)
Solution4 X 8 X 7 X 3 |
3
Discuss
|
If the number 481 * 673 is completely divisible by 9, then the smallest whole number in place of * will be:
Solution |
4
Discuss
|
Which of the following number should be added to 11158 to make it exactly divisible by 77?
Solution |
5
Discuss
|
1397 x 1397 = ?
Solution |
6
Discuss
|
If p and q are the two digits of the number 653pq such that this number is divisible by 80, then p+q is equal to :
Solution |
7
Discuss
|
Find the last 2 digit of 7^85 (Using Euler Theorem)
Solution |
8
Discuss
|
The digit in unit’s place of the product 71 × 72 × ..... × 79 is
Solution |
9
Discuss
|
Find the last unit digit of 55^5 ( Using Euler Theorem)
Solution |
10
Discuss
|
The difference between the place value and the face value of 6 in the numeral 856973 is
SolutionPlace Value - Face Value = 6000-6 = 5994 |
# | Quiz |
Copyright © 2020 Inovatik - All rights reserved