If p is the length of perpendicular from A to BC in a `DeltaABC,` then:

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

If p is the 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) .

If p is the length of the perpendicular from the origin on the line whose intercepts on the axes are a and b, then

If p and q are the lengths of perpendicular from the origin to the lines x cos theta-y sin theta=k cos 2theta and x sec theta+y "cosec" theta=k respectively, prove that p^(2)+4q^(2)=k^(2) .

P is the point of contact of the tangent from the orign to the curve y=log_(e)^(x ). the length of the perpendicular drawn from the origin to the normal at P is

ABC is a right triangle right angled at C. Let BC = a, CA = b, AB = c and let p be the length of perpendicular from C on AB. Prove that (i) pc = ab (ii) (1)/(p^(2)) = (1)/(a^(2)) + (1)/(b^(2)) .

A straight line passes through the points (5, 0) and (0, 3). The length of perpendicular from the point (4, 4) on the line is :

A straight line passes through the points (5, 0) and (0, 3). The length of perpendicular from the point (4, 4) on the line is