Find the equations to the straight lines passing through the following pairs of points.
`(a t_(1)^(2), 2 a t_(1)) and (a t_(2)^(2), 2 a t_(2))`

Find the equation of the straight lines passing through the following pair of point: (at_(1),a/t_(1)) and (at_(2),a/t_(2))

Find the equation of the straight lines passing through the following pair of point: (0,-a) and (at_(2),a/t_(2))

Find the equations t the straight lines passing through the point (2,3) and inclined at an angle of 45^0 to the line \ 3x+y-5=0.

Find the distances between the following pairs of points (t_(1)^(2),2t_(1)) and (t,@2,2t_(2),),t_(1) and t_(2) are the roots of x^(2)-2sqrt(3)x+2=0

If t_(1) and t_(2) are roots of the equation t^(2)+lambda t+1=0 where lambda is an arbitrary constant.Then the line joining the points ((at_(1))^(2),2at_(1)) and (a(t_(2))^(2),2at_(2)) always passes through a fixed point then find that point.

The three distinct point A(t_(1)^(2),2t_(1)),B(t_(2)^(2),2t_(2)) and C(0,1) are collinear,if

Find the coordinates o the vertices of a triangle,the equations of whose sides are: y(t_(1)+t_(2))=2x+2at_(1)at_(2),y(t_(2)+t_(3))=2x+2at_(2)t_(3) and ,y(t_(3)+t_(1))=2x+2at_(1)t_(3)

Two bodies are projected from the same point with same speed in the directions making an angle alpha_(1) and alpha_(2) with the horizontal and strike at same point in the horizontal plane through a point of projection. If t_(1) and t_(2) are their time of flights.Then (t_(1)^(2)-t_(2)^(2))/(t_(1)^(2)+t_(2)^(2))

If x=t^(2) and y=2t then equation of the normal at t=1 is