Reduce the equation `5x^(2)-2y^(2)-30x+8y=0` to the form `ax^(2)+by^(2)=1` by proper translation of axes without rotation .

Reduce the equation x+y+5=0 andx-2y+2=0 to the form ax+by =0 by proper choice of the origin and find this new origin.

If thte equation 3y^(2)+6y-5x-7=0 reduces to the form y ^(2) =ax when the origin is shifted to the point (h,k) without ration, then the value of (h, k) is-

The equation. y^2+2ax+2by+c=0 represent the conic

What does the equation (a-b)(x^(2)+y^(2))-2abx=0 become when the origin is shifted to the point ((ab)/(a-b),0) without rotation of axes ?

If the equation (3x-1)^(2)+2(x-3)=0 is expressed in the form ax^(2)+bx+c=0(ane0) , then the value of a is ______.

Choose a new origin (h,k) (retaining the directions of axes) so that the equation 5xy+y^(2)+25x-5y-65=0 is reduced to the form Ax'y'+By'^2 =1 . Also find the actual values of A and B.

Transform the equation 3x^(2)+2y^(2)-4x+3y=0 to parallel axes through the point (1,-2).

The equation of the tangent to the conic x^(2)-y^(2)-8x+2y+11=0 at (2,1) is

Reduce the equation of line x-y+2z=5 and 3x+y+z=6 in symmetrical form.

What does the equation 2x^2+4x y-5y^2+20 x-22 y-14=0 become when referred to the rectangular axes through the point (-2,-3) , the new axes being inclined at an angle at 45^0 with the old axes?