On dividing 2272 as well as 875 by 3-digit number N, we get the same remainder. The sum of the digits of N is:

Correct Answer: 324

Explanation:

Given Exp.	= a2 + b2 - 2ab, where a = 287 and b = 269
	= (a - b)2 = (287 - 269)2
	= (182)
	= 324

Correct Answer: 3

Explanation:

Let x = 6 q + 3.

Then, x² = (6q + 3)²

   = 36q² + 36q + 9

   = 6(6q² + 6q + 1) + 3

Thus, when x² is divided by 6, then remainder = 3.

Correct Answer: 5526

Explanation:

Correct Answer: 385

Explanation:

We know that (12 + 22 + 32 + ... + n2) =	1	n(n + 1)(2n + 1)
	6

Putting n = 10, required sum =	❨	1	x 10 x 11 x 21	❩	= 385
		6

Correct Answer: 57.5

Explanation:

Given Exp. = 35 + 15 x	3	= 35 +	45	= 35 + 22.5   = 57.5
	2		2

Correct Answer: 4x - 9y

Explanation:

By hit and trial, we put x = 5 and y = 1 so that (3 x + 7 y ) = (3 x 5 + 7 x 1) = 22, which is divisible by 11.

∴ (4x + 6y) = ( 4 x 5 + 6 x 1) = 26, which is not divisible by 11;

(x + y + 4 ) = (5 + 1 + 4) = 10, which is not divisible by 11;

(9x + 4y) = (9 x 5 + 4 x 1) = 49, which is not divisible by 11;

(4x - 9y) = (4 x 5 - 9 x 1) = 11, which is divisible by 11.

Correct Answer: 2

Explanation:

The smallest prime number is 2.

Correct Answer: 8500

Explanation:

Correct Answer: 10

Explanation:

(4 ⁶¹ + 4 ⁶² + 4 ⁶³ + 4 ⁶⁴ ) = 4 ⁶¹ x (1 + 4 + 4 ² + 4 ³ ) = 4 ⁶¹ x 85

     = 4⁶⁰ x (4 x 85)

     = (4⁶⁰ x 340), which is divisible by 10.

Correct Answer: 24

Explanation:

This is an A.P. in which a = 6, d = 6 and S _n = 1800

Then,	n	[2a + (n - 1)d] = 1800
	2

⟹	n	[2 x 6 + (n - 1) x 6] = 1800
	2

⟹ 3n (n + 1) = 1800

⟹ n(n + 1) = 600

⟹ n² + n - 600 = 0

⟹ n² + 25n - 24n - 600 = 0

⟹ n(n + 25) - 24(n + 25) = 0

⟹ (n + 25)(n - 24) = 0

⟹ n = 24

Number of terms = 24.