The greatest number which on dividing 1657 and 2037 leaves remainders 6 and 5 respectively, is:

Correct Answer: 40

Explanation:

Let the numbers be 3x, 4x and 5x.

 

Then, their L.C.M. = 60x.

 

So, 60x = 2400 or x = 40.

 

 The numbers are (3 x 40), (4 x 40) and (5 x 40).

 

Hence, required H.C.F. = 40.

Correct Answer: 3/4

Correct Answer: 9/2

Correct Answer: 9/2

Correct Answer: 23/43

Correct Answer: 2

Explanation:

Let the numbers 13a and 13b.

Then, 13a x 13b = 2028

=>ab = 12.

Now, the co-primes with product 12 are (1, 12) and (3, 4).

[Note: Two integers a and b are said to be coprime or relatively prime if they have no common positive factor other than 1 or, equivalently, if their greatest common divisor is 1 ]

So, the required numbers are (13 x 1, 13 x 12) and (13 x 3, 13 x 4).

Clearly, there are 2 such pairs.

Correct Answer: 21 cms

Explanation:

3.78 meters =378 cm = 2 × 3 × 3 × 3 × 7

5.25 meters=525 cm = 5 × 5 × 3 × 7

Hence common factors are 3 and 7

Hence LCM = 3 × 7 = 21

Hence largest size of square tiles that can be paved exactly with square tiles is 21 cm.

Correct Answer: 5940

Explanation:

 22 = 2 x 11

 54 = 2 × 3 3

108 =  2 2 × 3 3

135 =  3 3 × 5 

198 =  2 × 3 2 × 11

  ? L . C . M = 2 2 × 3 3 × 5 × 11 = 5940

Correct Answer: 10

Explanation:

Let the numbers be x and (100-x).

 

Then, x 100 - x = 5 * 495

 

 =>   x 2 - 100 x + 2475 = 0

 

 =>  (x-55) (x-45) = 0

 

 =>  x = 55 or x = 45

 

  The numbers are 45 and 55

 

Required difference = (55-45) = 10

Correct Answer: 4

Explanation:

Let the required numbers be 33a and 33b. 

 

Then 33a +33b= 528   =>   a+b = 16.

 

Now, co-primes with sum 16 are (1,15) , (3,13) , (5,11) and (7,9).

 

Therefore, Required numbers are  ( 33 x 1, 33 x 15), (33 x 3, 33 x 13), (33 x 5, 33 x 11), (33 x 7, 33 x 9)

 

The number of such pairs is 4