COORDINATE GEOMETRY | INTRODUCTION, DIST...

COORDINATE GEOMETRY | INTRODUCTION, DISTANCE B/W TWO POINTS | What is co-ordinate geometry ?, Regular coordinate axes, Cartesian coordinate of a point, Quadrant, Some Important points, Theorem: The distance between two points `P(x_1;y_1)` and `Q(x_2;y_2)` is given by sqrt((x_2-x_1)^2+(y_2-y_1)^2), If the point (x;y) is equidistant from the points `(a+b;b-a)` and `(a-b;a+b)` prove that `bx=ay`, Some Useful Points

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If the point P(x,y) is equidistant from the points A(a+b,b-a) and B(a-b,a+b). Prove that bx=ay.

If the point (x,y) be equidistant from the points (a+b,b-a) and (a-b,a+b) , prove that bx =ay .

If the points (x,y) are equidistant from the points (a+b,b-a) and (a-b,a+b),prove that bx = ay.

If the point (x, y) is equidistant from the points (a+b, b-a) and (a-b, a+b), then prove that bx=ay.

If the point (x , y) is equidistant from the points (a+b , b-a) and (a-b , a+b) , prove that b x=a y

If the point P(x,y) be equidistant from the points A(a+b,b-a) and B(a-b,a+b), then prove that bx=ay

If the point (x,y) be equidistant from the points ( a+b, b-a) and (a-b, a+b) then prove that bx=ay.

If the point P(x, y) is equidistant from the points A(a + b, b-a) and B(a-b, a + b). Prove that bx = ay.

The distance between two points p(x_(1),y_(1)) and q(x_(2),y_(2)) is given be :