If `x^(2)+6x-27 gt 0 and x^(2)-3x-4 lt 0` , then :

If x is an integer satisfying x^(2)-6x+5 le 0 " and " x^(2)-2x gt 0 , then the number of possible values of x, is

If x is real and x^(2) - 3x + 2 gt 0, x^(2)- 3x - 4 le 0, then which one of the following is correct?

If x is real and x^(2) - 3x + 2 gt 0, x^(2)- 3x - 4 le 0, then which one of the following is correct?

The set of solutions satisfying both x^(2)+5x+6 ge 0 and x^(2)+3x-4 lt 0 is

Let 2 sin^(2)x + 3 sin x -2 gt 0 and x^(2)-x -2 lt 0 ( x is measured in radian ) . Then 'x' lies in the internal .

If x^(2) - 4x - 32 gt 0 and |x - 2| lt 7 how many integer solutions of x exist ?

If (a,a^(2)) falls inside the angle made by the lines y=(x)/(2), x gt 0 and y=3x, x gt 0 , then a belongs to the interval

The range of values of x which satisfy 2x^(2) + 9x + 4 lt 0 and x^(2) - 5x + 6 lt 0 is

If A={x:x^(2)-2x+2gt0}andB={x:x^(2)-4x+3le0} A - B equals