A (1,3) and B(7,5) are two points on `xy` plane .Find the equation of `AB`

If A (11,9) and B(5,7) are two points on a line. Find the coordinates of the points which are at a distance 10 units from the mid points of AB on the y-axis.

A(1,2) and B(7,10) are two given points on the xy plane, for a point P(x,y) in the xy - plane such that angleAPB=60^(@) , area of the triangle APB is maximum , then P is lying on-

A(1,2) and B (5,-2) are two given point on the xy-plane, on which C is such a moving point, that the numerical value of the area of Delta CAB IS 12 square unit. Find the equation to the locus of C.

From a points P(a,b,c) prependiculars PL,PM and PN are drown to xy,yz and zx planes. Find the equation of the plane passing through L,M and N.

Prove that the points (3,1), (5,-5) and (-1,13) are collinear . Find the equation of the straight line on which the points lie.

If the middle points of the sides B C ,C A , and A B of triangle A B C are (1,3),(5,7), and (-5,7), respectively, then find the equation of the side A Bdot

A and B are two points in xy-plane, which are 2sqrt2 units distance apart and subtend and angle of 90^@ at the point C(1, 2) on the x - y + 1= 0 which is larger than any angle subtended by the line segment AB at any other point on the line. Find the equation(s) of the circle through the points A, B and C

A(2,5) and B(-3,-4) are two fixed points , the point P divides the line -segment overline(AB) internally in the ratio k:1 . Find the coordinates of P . Hence find the equation of the line joining A and B.

Find the equation of the line passing through the points A(0,6,-9) and B(-3,-6,3). If D is the foot of the perpendicular drawn a point C(7,4,-1) on the line AB, then find the coordinates of the point D and the equation of line CD.

A line 4x + y = 1 passes through the point A (2,-7) meets the line BC whose equation is 3x-4y + 1 =0,at the point B. If AB = AC, find the equation of AC.