Find the angle through which the axes may be turned so that the equation `Ax+By+C=0` may reduce to the form x = constant, and determine the value of this constant.

Prove that if the axes be turned through (pi)/(4) the equation x^(2)-y^(2)=a^(2) is transformed to the form xy = lambda . Find the value of lambda .

Though what angle should the axes be rotated so that the equation 9x^2 -2sqrt3xy+7y^2=10 may be changed to 3x^2 +5y^2=5 ?

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

On which point we shift origin so that new transformed form of the equation y^(2) + 4y + 8x-2 =0 does not contain constant term and term does not contain y ?

If the graph of equation ax+by=c passes through the origin, what is the value of c ?

Find the equation of a circle which touches both the axes and the line 3x - 4y + 8 = 0 and lies in the third quadrant.

Reduce the equation sqrt(3) x + y- 8=0 into normal form. Find the value of p and omega .

If theta is an angle by which axes are rotated about origin and equation ax^2+2hxy+by^2=0 does not contain xy term in the new system, then prove that tan2theta=(2h)/(a-b) .

The equation ax^2+4xy+y^2+ax+3y+2=0 represents a parabola, then find the value of a.