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Class Discussion: Numbers

Cd Numbers

MODULES

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Number Theory: 1 to 8
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Factors & Remainders: 1 to 8
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Factors & Remainders: 9 to 16
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Divisibility: 1 to 8
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Divisibility: 9 to 16
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Number Systems: 1 to 8
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Surds & Indices: 1 to 8
ALL MODULES

CAT 2025 Lesson : Class Discussion: Numbers - Number Theory: 1 to 8

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Class Discussion - Number Theory

Question 1

A set contains 7 real numbers such that the sum of any three of them is always greater than the sum of the other 4 numbers. Which of the following is definitely true?

All the numbers can be positive and not necessarily equal
All the numbers are positive and equal
All the numbers can be negative and not necessarily equal
All the numbers are negative and equal
Such a set does not exist

Question 2

Let xxx, yyy and zzz be distinct integers, that are odd and positive. Which one of the following statements cannot be true?
[CAT 2000]

xyz2xyz^2xyz2 is odd.
(x−y)2z(x - y)^2 z(x−y)2z is even.
(x+y−z)2(x+y)(x + y - z)^2 (x + y)(x+y−z)2(x+y) is even.
(x−y)(y+z)(x+y−z)(x - y) (y + z) (x + y - z)(x−y)(y+z)(x+y−z) is odd.

Question 3

How many 2 digit numbers exist such that we get a larger number when their digits are reversed?

Answer: 36

Question 4

In a tournament, there are nnn teams T1_11​ , T2_22​....., Tn_nn​ with n>5n > 5n>5. Each team consists of kkk players, k>3k > 3k>3. The following pairs of teams have one player in common: T1_11​ & T2_22​ , T2_22​ & T3_33​ ,......, Tn−1_{n - 1}n−1​ & Tn_nn​ , and Tn_nn​ & T1_11​. No other pair of teams has any player in common. How many players are participating in the tournament, considering all the nnn teams together?
[CAT 2007]

n(k−1)n(k - 1)n(k−1)
k(n−1)k(n - 1)k(n−1)
n(k−2)n(k - 2)n(k−2)
k(k−2)k(k - 2)k(k−2)
(n−1)(k−1)(n - 1)(k - 1)(n−1)(k−1)

Question 5

A number is interesting if on adding the sum of the digits of the number and the product of the digits of the number, the result is equal to the number. What fraction of numbers between 10 and 100 (both 10 and 100 included) is interesting?
[XAT 2013]

0.1
0.11
0.16
0.22
None of the above

Question 6

Eight variables −-− a,b,c,d,e,f,ga, b, c, d, e, f, ga,b,c,d,e,f,g and hhh −-− are equal to a different number between 1 and 8 (both inclusive). None of the variables are equal to a value which is the same as their position in the alphabet [e.g. a≠1a \neq 1a=1, b≠2b \neq 2b=2, etc.]. The values of any two variables which are adjacent letters in the alphabet, do not have consecutive numbers as values. If a>f>h>ba > f > h > ba>f>h>b and d>e>gd > e > gd>e>g, and g is a prime number. If c+e+g=7c + e + g = 7c+e+g=7, what is the value of hhh? (Fill 0 if hhh cannot be determined)

Answer: 5

Question 7

When (3−x)7(3 - x)^7(3−x)7 is expanded, what is the sum of the coefficients of x5x^5x5, x6x^6x6 and x7x^7x7?

-69
-139
169
None of these

Question 8

What is the remainder when 323+333+...+74332^3 + 33^3 + ... + 74^3323+333+...+743 is divided by 105105105?

29
57
73
91
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