Practice "sometimes, always, never"

if AB lies in plane m and CD lies in plane n, and m is parallel to n, then AB is parallel to CD

sometimes

if PQ is the perpendicular bisector of RS, the point P lies on RS

sometimes

if each of two lines is skew to a third lines, then they are skew to each other

sometimes

if line k is perpendicular to plane m, and line j is parallel to m, then line k is skew to line j

sometimes

if two circles intersect at points X and Y then XY is the perpendicular of the segment joining the centers of the circles

sometimes

if two planes are parallel to the same line, they are parallel to each other

sometimes

in a space, two lines perpendicular to the same line are parallel

sometimes

planes that contain two skew lines are parallel

sometimes

theorems and postulates are reversible

sometimes

If four points in a plane are equidistant from the endpoints of a line segment in the same plane, then the points are collinear

always

definitions are reversible

always

if A, B, C and D are non coplanar, and AB is perpendicular to BC, and AB perpendicular to BD, then AB is perpendicular to the plane determines by B, C, D

always

if a line if oblique to a plane, it is perpendicular to exactly one line in a plane

always

if a line is perpendicular to two sides of a triangle, it is perpendicular to the median drawn to the third side

always

if two planes are perpendicular to the same lines, they are parallel to each other

always

if two points A and B are each equidistant from the endpoints of XY, then the midpoint of AB is also equidistant from the endpoints of XY

always

if two points of a line lie on a plane, then the entire lines lies on the plane

always

in a plane, two lines perpendicular to the same line are parallel

always

lines that never intersect are parallel

always

the sets of points in the space equidistant from the endpoints of a line segment forms a plane

always

three parallel lines are coplanar

always

two lines perpendicular to the same plane are parallel

always

two parallel lines determine a plane

always

Three lines, each perpendicular to the other two, all lie in the same plane

never

if a plane is oblique to a second plane, it contains lines perpendicular to the second plane

never

the perpendicular bisector of a side of a scalene triangle passes through the opposite vertex

never

two congruent complementary angles are right angles

never

If AB is the perpendicular bisector of CD, then CD is the perpendicular bisector of AB

sometimes

If two isosceles triangles have the same segment as a base, then the segment joining the vertices of the vertex angles of the triangles intersects the common base at its midpoints

sometimes

a line perpendicular to one of two perpendicular planes is parallel to the other

sometimes