`" When the origin is shifted to "(h,k)" ,the equation "(x)/(a)+(y)/(b)=2" is changed to "(x)/(a)+(y)/(b)=0" ,then "(h)/(a)+k/b`

When the origin is shifted to (h,k) ,then the equation (x)/(a)+(y)/(b)=2 is changed to (X)/(a)+(Y)/(b)=0, then (h)/(a)+(k)/(b)=

When the origin is shifted to (h,k) ,then the equation (x)/(a)+(y)/(b)=2 is changed to (X)/(a)+(Y)/(b)=0 then (h)/(a)+(k)/(b) = a) 1 b)-1 c)2 d) - 2

The origin is shifted to (1,2), the equation y^(2)-8x-4y+12=0 changes to Y^(2)+4aX=0 then a=

When the origin is translated to (h,k) then the equation of transformation are

When the origin is shifted to (2,3) then the original equation of x^(2)+y^(2)+4x+6y+12=0 is

The origin shifted to (-5,3) then the equation y^(2)-12x+6y+69=0 changes as y^(2)=4ax then a

Origin is shifted to (1,2) then the equation y^(2)-8x-4y+12-0 changes as y^(2)=4ax .Then a=

If the origin is shifted to ( h,k ) without changing the direction of the axes is called

If (x)/(a)+(y)/(b)=1 is a tangent to the curve x=Kt,y=(K)/(t),K>0 then :