If the origin shifted to another point without changing the directions of axis then the transformation is called

Origin shifted to the point (2,-3) without changing the direction of the axes then (-1,2) is transformed as

If the origin is shifted to ( h,k ) without changing the direction of the axes is called

If the origin is shifted (1, 2, -3) without changing the directions of the axis, then find the new coordinates of the point (0, 4, 5) with respect to new frame.

If the axes are rotated through an angle theta without changing the position of the origin,then the transformation is called.

Origin is shifted to the point P without changing the directions of the axes.If the coordinates of Q with respect to the old axes,new axes are (2,-1,4) and (3,1,2) respectively,then P_(x)+P_(y)+P_(z)=

When origin is shifted to the point (4, 5) without changing the direction of the coordinate axes, the equation x^(2)+y^(2)-8x-10y+5=0 is tranformed to the equation x^(2)+y^(2)=K^(2) . Value of |K| is

when the origin is shifted to a point P,the point (1,-3) changed to (4,-7), then P:

If the origin is shifted to (h,k) and the axes are rotated through an angle theta ,then the co-ordinates of a point P(x,y) are transformed as P(X,Y)=

If the origin is shifted to the point O(2,3) the axes remaining parallel to the original axes the new co-ordinate of the point A (1,3) is ….