If `a` and `b` are intercept made by the straight line on the coordinate axes `(1)/(a)+(1)/(b)=(1)/(c)` such that then the line passes through the point

If a and b are the intercepts made by the straight line on the coordinate axes such that (1)/(a)+(1)/(b)=(1)/(c) then the line passes through point (A) (1,1) (B) (c,c) (C) ((1)/(c),(1)/(c))

The length intercepted by the straight line y =mx + c between the coordinate axes is

If the sum of the reciprocals of the intercepts made by a line on the coordinate axes is 7 ,then the line always passes through

. If the sum of the reciprocals of the intercepts made by the plane ax +by+cz=1 on the three axes is 1 then the plane always passes through the point:

A straight line cuts intercepts from the coordinate axes sum of whose reciprocals is (1)/(p). It passses through a fixed point

The algebraic sum of distances of the line ax + by + 2 = 0 from (1,2), (2,1) and (3,5) is zero and the lines bx - ay + 4 = 0 and 3x + 4y + 5=0 cut the coordinate axes at concyclic points. Then (a) a+b=-2/7 (b) area of triangle formed by the line ax+by+2=0 with coordinate axes is 14/5 (c) line ax+by+3=0 always passes through the point (-1,1) (d) max {a,b}=5/7

k is a nonzero constant.If k=(a+b)/(ab) then the straight line (x)/(a)+(y)/(b)=1 passes through the point

Find the equation of a line that cuts off equal intercepts on the coordinate axes and passes through the point (2,3) .