# Fundamentals Multiplication

Exam Name | Fundamentals Multiplication |
---|---|

Description | Fundamental Multiplication |

Exam Type | PUBLIC |

Authenticity | 0 |

creator | harenddk(309) |

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Question:

**What is the largest possible two digit number by which 2179782 can be divided?**Answer:

Question:

**The greatest integer that divides 358,376,232 leaving the same remainder in each case is:**Answer:

Question:

**If x and y are positive real number, then:**Answer:

Question:

**At least which number must be subtracted from 9999999 so that it will become the multiple of 125?**Answer:

Question:

**A number of the form 〖10〗^n-1 is always divisible by 11 for every n is a natural number, when:**Answer:

Question:

**Out of the following numbers which is divisible by 132?**Answer:

Question:

**If 653xy is divisible by 80 then the value of x+y is :**Answer:

Question:

**The value of k if k35624 is divisible by 11:**Answer:

Question:

**If 42573k is divisible by 72 then the value of k is:**Answer:

Question:

**How many numbers between 1 and 1000 are divisible by 7?**Answer:

Question:

**How many numbers between 55 and 555 including both the extreme values are divisible by 5?**Answer:

Question:

**How many numbers are there from 100 to 200?**Answer:

Question:

**How many numbers are divisible by 3 in the set of numbers 300,301,302,----499,500?**Answer:

Question:

**How many numbers are there between 200 and 800 which are divisible by both 5 and 7 ?**Answer:

Question:

**In the above question total numbers in the set of number S=(200,201----800) which are either divisible by 5 or by 7 is:**Answer:

Question:

**How many numbers are there in the set S=(200,2201,---800) which are divisible by neither of 5 or 7?**Answer:

Question:

**Total numbers of numbers lying in the range of 1331 and 3113 which are neither divisible by 2,3 or 5 is:**Answer:

Question:

**Atleast what number must be subtracted from 434079 so that it becomes divisible by 137?**Answer:

Question:

**In the above question, at least what number be added to 434079, so that it will become divisible by (or multiple of) 137?**Answer:

Question:

**which one number is closest to 193 which is divisible by 18 is:**Answer: