If the sum of the distances of a moving point in a plane from the axes is `1,` then find the locus of the point.

If the sum of the squares of the distance of a point from the three coordinate axes is 36, then find its distance from the origin.

If the sum of the squares of the distance of a point from the three coordinate axes is 36, then find its distance from the origin.

If the sum of the distances of a moving point from two fixed points (ae, 0) and (-ae, 0) be 2a , prove that the locus of the point is: x^2/a^2+ y^2/(a^2 (1-e^2) =1

Find the distance of the point (2, 3, 5) from the xy-plane.

If the sum of the distances of a point from two perpendicular lines in a plane is 1, then its locus is (a)a square (b) a circle (c) a straight line (d) two intersecting lines

If the sum of the distances of a point from two perpendicular lines in a plane is 1, then its locus is(A) a square (b) a circle (C) a straight line (d) two intersecting lines

A point moves such that the sum of the squares of its distances from the two sides of length ‘a’ of a rectangle is twice the sum of the squares of its distances from the other two sides of length b. The locus of the point can be:

The difference of the distances of variable point from two given points (3,0) and (-3,0) is 4. Find the locus of the point.

The sum of the squares of the distances of a moving point from two fixed points (a,0) and (-a ,0) is equal to a constant quantity 2c^2dot Find the equation to its locus.

The sum of the squares of the distances of a moving point from two fixed points (a,0) and (-a ,0) is equal to a constant quantity 2c dot Find the equation to its locus.