Find the values of b for which the points `(2b+3, b^(2))` lies above of the line 3x-4y-a(a-2) = 0 `AA a in R`.

The maximum negative integral value of b for which the point (2b+3, b^(2)) lies above the line 3x-4y-a(a-2)=0, AA ain R is

The maximum negative integral value of b for which the point (2b+3, b^(2)) lies above the line 3x-4y-a(a-2)=0, AA ain R is

Find the set of values of lambda , for which the point (sqrt(4-lambda^2),lambda) lies outside the triangle formed by the lines (y-3)^2=3x^2 and y+sqrt3=0

Two point (b+3,b+k) and (2,b) are on the line x-2y+9=0 find k

If the point (3, 4) lies on the locus of the point of intersection of the lines x cos alpha + y sin alpha = a and x sin alpha - y cos alpha = b ( alpha is a variable), the point (a, b) lies on the line 3x-4y=0 then |a+b| is equal to

The set of values of b for which the origin and the point (1,1) lie on the same side of the straight line,a^(2)x+aby+1=0AA a in R,b>0 are(A) b in(2,4)(B)b in(0,2)(C)b in[0,2](D)(2,oo)

If the point (3,4) lies on the locus of the point of intersection of the lines x cos alpha+y sin alpha=a and x sin alpha-y cos alpha=b ( alpha is a variable) ,the point (a, b) lies on the line 3x-4y=0 then |a+b| is equal to

If the point P(a, b) lies on the line 3 x+2 y=13 and the point Q(b, a) lies on the line 4 x-y=5 , then the equation of the line P Q is

Let L be the line belonging to the family of straight lines (a+2b)x+(a-3b)y+a-8b=0 a,b in R , which is the farthest from the point (2,2) If L is concurrent with lines x-2y+1=0 and 3x-4y+lambda =0 , then the value of lambda is

If the point (3, 4) lies on the locus of the point of intersection of the lines x cos alpha + y sin alpha =a and x sin alpha - y cos alpha =b ( alpha is a variable), the point (a, b) lies on the line 3x-4y=0 then (a^(2)-b^(2))/2 is equal to