Two straight lines are perpendicular to ...

Two straight lines are perpendicular to each other. One of them touches the parabola `y^2=4a(x+a)` and the other touches `y^2=4b(x+b)` . Their point of intersection lies on the line. `x-a+b=0` (b) `x+a-b=0` `x+a+b=0` (d) `x-a-b=0`

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Two straight lines are perpendicular to each other. One of them touches the parabola y^2=4a(x+a) and the other touches y^2=4b(x+b) . Their point of intersection lies on the line. (a) x-a+b=0 (b) x+a-b=0 (c) x+a+b=0 (d) x-a-b=0

Two straight lines are perpendicular to each other. One of them touches the parabola y^2=4a(x+a) and the other touches y^2=4b(x+b) . Their point of intersection lies on the line. (a) x-a+b=0 (b) x+a-b=0 (c) x+a+b=0 (d) x-a-b=0

Two straight lines are perpendicular to each other. One of them touches the parabola y^2=4a(x+a) and the other touches y^2=4b(x+b) . Their point of intersection lies on the line. (a) x-a+b=0 (b) x+a-b=0 (c) x+a+b=0 (d) x-a-b=0

Two straight lines are perpendicular to each other. One of them touches the parabola y^2=4a(x+a) and the other touches y^2=4b(x+b) . Their point of intersection lies on the line. (a) x-a+b=0 (b) x+a-b=0 (c) x+a+b=0 (d) x-a-b=0

Two straight lines are perpendicular to each other. One of them touches the parabola y^2=4a(x+a) and the other touches y^2=4b(x+b) . Their point of intersection lies on the line. (a) x-a+b=0 (b) x+a-b=0 (c) x+a+b=0 (d) x-a-b=0

Two straight lines are perpendicular to each other. One of them touches the parabola y^(2) =4a ( x+a) , and the other touches y^(2) =4b (x+ b) . Then locus of point of intersection of two lines is

If the line (x)/(l)+(y)/(m)=1 touches the parabola y^(2)=4a(x+b) then m^(2)(l+b)=

If the line x+by+c=0(bc!=0) touches both the parabolas y^(2)=4x and x^(2)=-32y then b+c=

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