A, B C and D are the points of intersection with the coordinate axes of the lines ax+by=ab and bx+ay=ab, then

ax + by = c bx+ ay =1 +c

The point of intersect of the coordinates axes is : (a) ordinate (b) abscissa (c) quadrant (d) origin

For a gt b gt c gt 0 , if the distance between (1,1) and the point of intersection of the line ax+by-c=0 and bx+ay+c=0 is less than 2sqrt2 then, (A) a+b-cgt0 (B) a-b+clt0 (C) a-b+cgt0 (D) a+b-clt0

Find the value of x and y: ax +by =a-b bx-ay =a+b

Let a,b, c and d be non-zero numbers. If the point of intersection of the lines 4ax + 2ay+c=0 and 5bx+2by +d=0 lies in the fourth quadrant and is equidistant from the two axes, then

The coordinates of the centriod of triangle ABC where A,B,C are the points of intersection of the plane 6x + 3y -2z =18 with the coordinate axes are :

If a line passes through the point (2,2) and encloses a triangle of area A square units with the coordinate axes , then the intercepts made by the line on the coordinate axes are the roots of the equations

A circle with center (2, 2) touches the coordinate axes and a straight line AB where A and B ie on direction of coordinate axes such that the lies between and the line AB be the origin then the locus of circumcenter of triangle OAB will be:

If the tangent drawn to the hyperbola 4y^2=x^2+1 intersect the co-ordinate axes at the distinct points A and B, then the locus of the mid-point of AB is:

If AB=4 and the ends A, B move on the coordinate axes, the locus of the mid-point of AB