The length of perpendicular form the origin to the line `(x)/(3)-(y)/(4)=1` is

If p is the length of the perpendicular from the origin to the line whose intercepts will the coordinate axes are (1)/(3) and (1)/(4) then the value of p is

If the length of the perpendicular from the origin to the plane 2x+3y+lambdaz=1,lambdagt0" is "(1)/(5)" then the value of is "lambda" is "

The length of bot from the origin to the line x/3-y/4=1 is

The length of the perpendicular from origin to line is sqrt3x-y+24=0 is:

If p is length of perpendicular from the origin to the line whose intercepts on the axes are a and b, then show that 1/p^(2)=1/a^(2)+1/b^(2) .

The length of the perpendicular drawn from the origin to a line is 6 and makes an angle of 135^(@) with positive x axis. Find the equation of the line.

Find the equation of the line which has the length of the perpendicular from origin to the line as 4 units and the perpendicular segment on the line I makes an angle of 120^(@) with the positive direction of x-axis.

The equation of a straight line on which the length of perpendicular from the origin is four units and the line makes an angle of 120^0 with the x-axis is (A) xsqrt(3)+y+8=0 (B) xsqrt(3)-y=8 (C) xsqrt(3)-y=8 (D) x-sqrt(3)y+8=0