For ` a gt b gt c gt 0` if the distance between (1,1) and the point of intersection of the lines ax + by +c=0 and bx + ay+c=0 is less than `2sqrt2` then

For a>b>c>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 2sqrt(2) then,(A)a+b-c>0(B)a-b+c 0(D)a+b-c<0

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 shortest distance between the point (0, 1/2) and the curve x = sqrt(y) , (y gt 0 ) , is:

If a lt 0, b gt 0 and c lt 0 , then the point P(a, b, -c) lies in the octant

If the roots of ax^(2) + bx + c = 0 (a gt 0) be each greater than unity, then