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Test: Divisibility - 1 - GMAT MCQ


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10 Questions MCQ Test Quantitative for GMAT - Test: Divisibility - 1

Test: Divisibility - 1 for GMAT 2024 is part of Quantitative for GMAT preparation. The Test: Divisibility - 1 questions and answers have been prepared according to the GMAT exam syllabus.The Test: Divisibility - 1 MCQs are made for GMAT 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Divisibility - 1 below.
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Test: Divisibility - 1 - Question 1

Which of the following is a multiple of 6?

Detailed Solution for Test: Divisibility - 1 - Question 1

no must be divisible by 2 and 3

Test: Divisibility - 1 - Question 2

How many multiples of 7 are there between 14 and 140, inclusive?

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Test: Divisibility - 1 - Question 3

How many positive integer values of N are possible if 21 is divisible by N?

Test: Divisibility - 1 - Question 4

If a number N is divisible by both 2 and 8, then which of the following statements must be true?

I.           N is divisible by 4

II.         N is divisible by 6

III.      N is divisible by 16

Test: Divisibility - 1 - Question 5

N = abc where a, b and c are the hundreds, tens and units digit respectively. If a, b and c are non-zero consecutive numbers such that a < b < c, then which of the following must be true?

        I.            N is always divisible by 2

      II.            N is always divisible by 3

    III.            N is divisible by 6 only if b is odd.

Test: Divisibility - 1 - Question 6

If t is a positive integer and 8t is divisible by 96, what will be the remainder when t3 is divided by 108?

Detailed Solution for Test: Divisibility - 1 - Question 6

Given: 108 = 22 × 33

Since 8t is divisible by 96, we may write

8t = 96k, where k is a positive integer

  • 23t = 25 × 3× k
  • t = 22 × 3× k
  • t3 = 26 × 33 × k3
  • t3 = ( 22 × 33 )( 24  × k3)
  • t3 = 108( 24  × k3)

This shows that t3 is completely divisible by 108, implying that the remainder is 0.

Answer: Option (A)

Test: Divisibility - 1 - Question 7

If 32455 × 3145208 × K2 is divisible by 3, which of the following could be the value of K?

Detailed Solution for Test: Divisibility - 1 - Question 7

Step 1: Question statement and Inferences

32455 × 3145208 × K2 is divisible by 3

  • Either 32455 or 3145208 or K2 must be divisible by 3

Step 2: Finding required values

Given:

A number is divisible by 3 when sum of its digits are divisible by 3

  • Sum of the digits of 32455 = 3+2+4+5+5 = 19 not divisible by 3
  • Sum of the digits of 3145208 = 3+1+4+5+2+0+8 = 23 not divisible by 3
  • Therefore 32455 and 3145208 are not divisible by 3.

Hence, K2 should be divisible by 3

  • K should be divisible by 3 (3 is prime, Kn and K will have same prime factors)

Step 3: Calculating the final answer

Checking for all the options:

  • Sum of the digits of 6000209 = 6+0+0+0+2+0+9 = 17, not divisible by 3
  • Sum of the digits of 6111209 = 6+1+1+1+2+0+9 = 20, not divisible by 3
  • Sum of the digits of 6111309 = 6+1+1+1+3+0+9 = 21, divisible by 3
  • Sum of the digits of 6111109 = 6+1+1+1+1+0+9 = 19, not divisible by 3
  • Sum of the digits of 6111809 = 6+1+1+1+8+0+9 = 26, not divisible by 3

Only 6111309 is divisible by 3

Answer: Option (C)

Test: Divisibility - 1 - Question 8

n = 234yzn

is a positive integer whose tens and units digits are y and z respectively. It is given that n is divisible by 4, 5 and 9. Find n.

Test: Divisibility - 1 - Question 9

What is the remainder when the positive three-digit number 1yz is divided by 7?

(1)  y + z = 7

(2)  y -2 is a non-zero positive number divisible by 3 

Test: Divisibility - 1 - Question 10

If t is a positive integer, can t2 + 1 be evenly divided by 10?

(1)  916 × t leaves a remainder of 1 when divided by 2

(2)  916 × t leaves a remainder of 2 when divided by 5

Detailed Solution for Test: Divisibility - 1 - Question 10

Steps 1 & 2: Understand Question and Draw Inferences

t2 + 1 can be evenly divided by 10 if t2 + 1 = 10 *k, where k is a positive integer

  • We need to check if the last digit of t2 + 1 is 0

Step 3: Analyze Statement 1

916 × t leaves a remainder of 1 when divided by 2

  • t is odd
  • last digit of t can be 1, 3, 5, 7 or 9

Not Sufficient.

Step 4: Analyze Statement 2

916 × t leaves a remainder of 2 when divided by 5

  • last digit of 916 × t can be 2 or 7
  • last digit of t can be 2 or 7

Not Sufficient

Step 5: Analyze Both Statements Together (if needed)

Inference from statement 1: last digit of t can be 1, 3, 5, 7 or 9

Inference from statement 2: last digit of t can be 2 or 7

Inference from statement 1 and statement 2: last digit of t can be 7

--> Last digit of t2 + 1 = Last digit of (9 + 1) = 0

Hence, t2 + 1 can be evenly divided by 10

Statement 1 and Statement 2 together are sufficient to answer the question.

 Answer: Option (C)

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