The slope of line which belongs to family (1+ l) x + (l-1)y + 2(1-l) = 0 and makes shortest intercept on `x^2 = 4y - 4`

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 the lines x-2y+1=0 and 3x-4y+ lambda=0 , then the value of lambda is

Let l_(1) and l_(2) be the two lines which are normal to y^(2)=4x and tangent to x^(2)=-12y respectively (where, l_(1) and l_(2) are not the x - axis). Then, the product of the slopes of l_(1)and l_(2) is

Let two parallel lines L_1 and L_2 with positive slope are tangent to the circle C_1 : x^2 + y^2 -2x 16y + 64 = 0 . If L_1 is also tangent to the circle C_2 : x^2 + y^2 - 2x + 2y -2 = 0 and the equation of L_2 is asqrta x - by + c - a sqrta = 0 where a,b,c in N. then find the value of (a+b+c)/7

Length of the shortest chord of the parabola y^2=4x+8 , which belongs to the family of lines (1+lambda)y+(lambda-1)x+2(1-lambda)=0 is

If L_1 is the line of intersection of the planes 2x-2y+3z-2=0 x-y+z+1=0 and L_2 is the line of the intersection of the planes x+2y-z-3=0 3x-y+2z-1=0 then the distance of the origin from the plane containing the lines L_1 and L_2 is

Find the slope and the y- intercept of the line: (2x) /( 5)+(3y)/(4) = 1

Equation of a line in the plane pi-=2x-y+z-4=0 which is perpendicular to the line l whse equation is (x-2)/1=(y-2)/(-1)=(z-3)/(-2) and which passes through the point of intersection of l and pi is

The family of lines (l+3m) x + 2(l+m) y= (m-l) , where l!=0 passes through a fixed point having coordinates (A) (2, -1) (B) (0, 1) (C) (1, -1) (D) (2, 3)

The graph of line l in the xy-plane passes through the points (2, 5) and (4, 11) . The graph of line m has a slope of -2 and an x-intercept of 2. If point (x, y) is the point of intersection of line l and m, what is the value of y?

Let L_1 be a straight line passing through the origin and L_2 be the straight line x + y = 1 if the intercepts made by the circle x^2 + y^2-x+ 3y = 0 on L_1 and L_2 are equal, then which of the following equations can represent L_1 ?