The distance of a point from the x-axis in the positive direction is 5 and from the y-axis in the positive direction is 7. Find the co-ordinates of the point.

(xvi) The distance of a point from the x-axis is 7 units on the negative directions and the distance from the y-axis is 8 units on the positive direction. Find the co-ordinates or the point.

(xvii) The distance of the point (-7,-9) from the x-axis is

A circle of radius 5 units touches co-ordinates axes the first quadrant. If the circle makes one complete roll on axis along the positive direction of x-axis along the positive direction of x-axis, find its equation in the new position.

The distance of the line 2x-3y=4 from the point (1,1) in the direction of the line x+y=1 is

The distance of the point (2, 3, 4) from the x-axis is K units. Find the value of K.

The magnitude of the angle which the line y=-x makes with the positive direction of the x axis is -

The perpendicular distance of the point (1,2,3) from the x-axis is -

The perpendicula distance of the points (1,1,1) from the x-axis is -

on a cartesian plane, draw a line segment XY parallel to x -axis at a distance of 5 units from x -axis and a line segment PQ parallel to y -axis at a distance of 3 units from y -axis .write the co-ordinates of their point of intersection.

The cross-section of a reflecting surface is represented by the equation x^2 + y^2 = R^2 as shown in the figure. A ray travelling in the positive x direction is directed toward positive y direction after reflection from the surface at point M. The coordinate of the point Mon the reflecting surface is