find the new origin on the x-axis so that the equation ax+by+c=0 reduce to the form ax+by=0

Find the point to which the origin should be shifted so that the equation 3y^(2)+6y-5x-7=0 is reduced to the form y^(2)=ax .

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.

If the axes are transferred to parallel axes throught the point (0-4) , then the equation 4x+3y+12=0 reduces to the form -

The equation of the straight line ax+by+c=0 is reducible to the form y= mx +k when-

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

Find two sets of solutions of the equation ax+by+c=0.

If the roots of the equation ax^2+bx+c=0(a!=0) be equal then

Find the value of a if 1 is a root of the equation x^(2)+ax+3=0 .

If the two roots of the equation ax^2 + bx + c = 0 are distinct and real then

The roots of the equation ax^2+bx+c=0 are equal when-