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 line passing through the point (2, 2) encloses an area of 4 sq. units with coordinate axes. The sum of intercepts made by the line on the x and y axis is equal to

A line passing through the point (2, 2) encloses an area of 4 sq. units with coordinate axes. The sum of intercepts made by the line on the x and y axis is equal to

Find the equation of the circle drawn on the intercept made by the line 2x+3y=6 between the coordinate axes as diameter.

A straight line passing through the point (2,2) and the axes enclose an area lamda . The intercepts on the axes made by the line are given by the two roots of:

A straight line through the point (h,k) where hgt0 and kgt0, makes positive intercepts on the coordinate axes. Then the minimum length of line intercepted between the coordinate axes is

A staright line x/(a)-y/(b)=1 passes through the point (8, 6) and cuts off a triangle of area 12 units from the axes of co-ordinates. Find the equations of the straight line.

Write the equation of the plane whose intercepts on the coordinate axes are 2, -3 and 4.

A curve y=f(x) passes through the origin. Through any point (x,y) on the curve, lines are drawn parallel to the coordinate axes. If the curve divides the area formed by these lines and coordinates axes in the ratio m : n , find the curve.

A straight line is drawn through the point P(1,4) Find the least value of the sum of intercepts made by line on the coordinates axes. Also find the equation of the line.

A line passes through the point (3,-2). Find the locus of the middle point of the portion the line intercepted between the axes.