If the circle `x^(2)+y^(2)=a^(2)` intersects the hyperbola `xy=c^(2)` in four points `P(x_(1),y_(1)),Q(x_(2),y_(2)),R(x_(3),y_(3))` and `S(x_(4),y_(4))` then

The circle x^2+y^2 =4x+8y+5 intersects the line 3x-4y=m at two distinct points if :

If x_(1), x_(2), x_(3) as well as y_(1), y_(2), y_(3) are in G.P. with the same common ratio, then the points (x_(1), y_(1)), (x_(2), y_(2)) and (x_(3), y_(3)) :

The circles x^2+y^2=r^2 and x^2+y^2-10x+16=0 intersect each other in distinct points if:

The circleS x^(2)+y^(2)-10 x+16=0 and x^(2)+y^(2)=r^(2) intersect each other in distinct points, if

The line 3 x+4 y+5=0 is a tangent to the hyperbola x^(2)-4 y^(2)=5 at

The circles x^2+y^2+x+y=0 and x^2+y^2+x-y=0 intersect at an angle :

If the tangents at (x_(1),y_(1)) and (x_(2),y_(2)) to the parabola y^(2)=4ax meet at (x_(3),y_(3)) then

The distance between two points p(x_(1),y_(1)) and q(x_(2),y_(2)) is given be :