If x is a positive integer, is `x^(2)+6x+10` odd?
(1) `x^(2)+4x+5` odd .
(2) `x^(2)+5x+4` is even.

Is the integer x odd? (1) 2(y+x) is an odd integer. (2) 2y is an odd integer.

If m is a positive integer then the solutions of x^((2)/(m))-5x^((1)/(m))+4=0 are

If x, y and z are integers, is x even? (1) 10^(x)=(4^(y))(5^(z)) (2) 3^(x+5)=27^(y+1)

Find the roots of the following quadratic equations i) 6sqrt5 x^(2) – 9x -3sqrt5 = 0 ii) x^(2) - x - 12 = 0 iii) 2x^(2) - 6x + 7 = 0 iv) 4x^(2) - 4x+17 = 3x^(2) -10x-17 v) x^(2) + 6x + 34 = 0 vi) 3x^(2) + 2x - 5 = 0

Using remainder theorem, find the remainder when : (i) x^(3)+5x^(2)-3 is divided by (x-1) " " (ii) x^(4)-3x^(2)+2 is divided by (x-2) (iii)2x^(3)+3x^(2)-5x+2 is divided by (x+3) " " (iv) x^(3)+2x^(2)-x+1 is divided by (x+2) (v) x^(3)+3x^(2)-5x+4 is divided by (2x-1) " " (vi) 3x^(3)+6x^(2)-15x+2 is divided by (3x-1)

For what values of x in R , the following expressions are negative i) -6x^(2)+2x -3 ii) 15+4x-3x^(2) iii) 2x^(2)+5x -3 iv) x^(2)-7x+10

Let f (x)=|x-2|+|x - 3|+|x-4| and g(x) = f(x+1) . Then 1. g(x) is an even function 2. g(x) is an odd function 3. g(x) is neither even nor odd 4. g(x) is periodic

Factorise : 3x^5 - 6x^4 - 2x^3 + 4x^2 + x-2

Let f : R to R is a function defined as f(x) where = {(|x-[x]| ,:[x] "is odd"),(|x - [x + 1]| ,:[x] "is even"):} [.] denotes the greatest integer function, then int_(-2)^(4) dx is equal to

If n is odd, then Coefficient of x^n in (1+ (x^2)/(2!) +x^4/(4!) + ....oo)^2 =