If the point `P((3a)/(2),1)` lies between the two different lines `x+y=a` and `x+y=2a`, then the least integral value of `|a|` is equal to

The point (-2,a) lies in the interior of the triangle formed by the lines y=x,y=-x and 2x+3y=6 the integral value of a is

If the point (a^2,a+1) lies in the angle between the lines 3x-y+1=0 and x+2y-5=0 containing the origin, then find the value of adot

If the point (a^2,a+1) lies in the angle between the lines 3x-y+1=0 and x+2y-5=0 containing the origin, then find the value of adot

If the point (k+1,k) lies inside the region bound by the curve x=sqrt(25-y^2) and the y-axis, then the integral value of k is/are

If the point P(a^2,a) lies in the region corresponding to the acute angle between the lines 2y=x and 4y=x , then find the values of adot

If the point P(a^2,a) lies in the region corresponding to the acute angle between the lines 2y=x and 4y=x , then find the values of adot

Value of lamda so that point (lamda,lamda^(2)) lies between the lines |x+2y|=3 is

If (h,k) is a point on the axis of the parabola 2{(x-1)^2 + (y-1)^2} = (x+y)^2 from where three distinct normal can be drawn, then the least integral value of h is :

If the line y=mx meets the lines x+2y-1=0 and 2x-y+3=0 at the same point, then m is equal to

If point P(alpha, alpha^2-2) lies inside the triangle formed by the lines x + y=1 , y=x + 1 and y=-1 then alpha in