Question Bank - Number Theory - Shashank Prabhu, CAT 100 Percentiler
Q84) a and b are two positive numbers such that their sum is less than their product. The product of these two numbers would always be more than?
Q89) The largest possible number divides four numbers, 5688, 6552, 7848 and 8712 to leave the same remainder in each case. What is the remainder?
Q92) How many numbers less than 1000 have their sum of digits as 12?
shashank_prabhu last edited by zabeer
Q100) What is the remainder when the sum of all the terms in the 1024th row of the pascal triangle is divided by 1000.
Q4) How many numbers greater than 13000 can be formed using the digits 5, 0, 8, 1 and 7 such that each digit is used exactly once?
Q20) The sum of a two-digit number and the number formed by interchanging the two digits is 45 more than twice the original number. If the sum of the digits of the number is 9, what is the original number?
Q21) A six-digit number is formed by writing 3 consecutive two-digit number side by side in ascending order. If the number so formed is divisible by 2,3,4,5,6,8, then what is the hundreds digit of the number?
Q29) What is the digit at the hundredths place of the number N = 45^36 ?
Q36) What is the value of expression 1/2! + 2/3! + 3/4! + ... + 7/8!
[OA: 1 - (1/8!)]
Q59) What is the sum of factors of each factor of 1024?
Q70) A set N is formed by selecting some of the numbers from the first 110 natural numbers such that the GCD of any two numbers in the set is 5. What is the maximum number of elements that set N can have?
Q72) The number of 6-digit numbers of the form ababab (where a and b are distinct, non-negative integers) each of which is a product of exactly 6 district primes is
d. None of these
[OA: Option a]
Q75) Find the sum of the series 6/6 + 12/15 + 12/35 + 24/77 + 12/143 + 24/221 + 12/323 + 24/437 + 36/667 + 12/899
shashank_prabhu last edited by shashank_prabhu
Q80) There is a set of numbers S, which contains all the numbers from 1 to 50. What is the minimum number of numbers you need to choose from S such that there are at least two numbers with a common divisor greater than 1 in those numbers always ?
Q93) A, B, C, D, E and F are six single-digit non-negative integers such that A < B < C < D < E < F. Three-digit number CFC is a perfect square, BE is a two-digit prime number and A + D + F = B + C + E.
1 - What is the value of D?
d. Cannot be determined
2 - The four-digit natural number BEFC is definitely not divisible by which of the following two-digit numbers?
[OA: Option d, Option d]
Q95) There are 5 distinct real numbers out of which all possible triplets are selected and for each triplet the three numbers are added. The different sums that are generated are:
(– 8, 1, 3, 5, 7, 8, 10, 16, 19 and 23).
1 - The smallest among the 5 numbers is
a. – 6
b. – 9
c. – 8
d. – 7
2 - The third largest number is
a. – 1
[OA: Option a, Option b]
[OA: Option 4]
Q13) N is an eight digit number and S(N) is the sum of the digits of N. If N + S(N) = 100,000,000 what would be N?
Q22) N represents a series in which all the terms are consecutive integers and the sum of all the terms of N is 100. If the number of terms of N is greater than one, find the difference between the maximum and the minimum possible number of terms.