From the relation ` ax + by + c = 0 [ b ne 0]`, from a differential equation elimenting a, b, c .

The roots of the same quadratic equation ax^2 + 2bx + c = 0 (a ne 0) are real and equal then b^2 = _______

Show that the differential equation x (yy_(2) + y_(1)^(2)) = yy_(1) is formed by eliminating a, b and c from the relation ax^(2) + by^(2) + c = 0 . Justify why the eliminate is of the second order although the given relation involves three constants a, b and c .

If in a quadratic equation ax^2 + bx + c = 0 (a le 0) b^2 = 4ac , then the roots of the equation will be real and _________.

Let a, b , c and d be nonzero number . If the point of intersection of the lines 4ax + 2ay + c = 0 and 5 b x + 2 by + d = 0 lies in the fouth quadrant and is eqaidistant from the two axes , then _

(viii) The graph of the equation cx+d=0 ( c and d are constant and c ne 0 ) will be the equation of the y-axis when

The order of the differential equation obtained by the elimination of arbitrary constants a,b,c from the equation ax + by + c = 0 is -

If sin theta and cos theta are the roots of the equation ax^2 - bx + c =0 , then a, b and c satisfy the relation

Solve the equation |[a-x, c, b], [ c, b-x, a], [b, a, c-x]|=0 where a+b+c!=0.

Show that the differential equation (dy)/(dx) = y is formed by eliminating a and b from the relation y = ae^(b + x) .

Find Delta(Delta(ax^2 + bx + c)) , (a ne 0) .