The line `2x-y = 5` turns about the point on it, whose ordinate and abscissae are through an angle of `45^@` in the anti-clockwise direction. Find the equation of the line in the new position.

The line 2x-y=5 turns about the point on it,whose ordinate and abscissae are thhough an angle of 45^(@) in the anti-clockwise direction. Find the equation of the line in the new position.

The line 3x-4y+7=0 is rotated through an angle (pi)/(4) in the clockwise direction about the point (-1,1). The equation of the line in its new position is

The line 2x-y=3 is rotated through an angle (pi)/(4) in anticlockwise direction about the point (2,1) ,then equation of line in its new position

The line joining the points A(2,0) and B(3,1) is rotated through an angle of 45^@ about A in the anticlock- wise direction The coordinates of B in the new position

If a line joining two points A(2,0) and B(3,1) is rotated about A in anti-clockwise direction 15^(@) ,then the equation of the line in the new position is

If the axes are rotated through an angle of 45^(@) in the anti clockwise direction then the equation of rectangular hyperbola x^(2)-y^(2)=a^(2) changes to

If the axes are rotated through an angle of 45^(@) in the clockwise direction, the coordinates of a point in the new systeme are (0,-2) then its original coordinates are

If the line x-y-2=0 is rotated through an angle (pi)/(12) in the clockwise direction about point P(5,3) and equation of line in new position is x-sqrt(3)y+k=0 ,then k is

A line passing through the point A(3,0) makes 30^(0) angle with the positive direction of x- axis.If this line is rotated through an angle of 15^(0) in clockwise direction,find its equation in new position.