If a line outside a plane is parallel to a line in the plane, then the line is parallel to the plane.

a⊄α, b⊂α, a∥b⇒a∥α

A straight line is parallel to a plane. If a plane passing through the straight line intersects the plane, then the straight line is parallel to the intersection line.

a∥α, a⊂β, α∩β=b⇒a∥b

If two intersecting lines in one plane are parallel to another plane, then the two planes are parallel.

a⊂β, b⊂β, a∩b＝P, a∥α, b∥α⇒β∥α.

Two planes are parallel, and if another plane intersects these two planes, then the two intersection lines are parallel.

α∥β, α∩γ=a, β∩γ=b⇒a∥b.

If two planes are parallel, then any straight line in one plane is parallel to the other plane.

α∥β, b ⊂β ⇒b∥α.

If a line is perpendicular to a plane, it is perpendicular to all lines in the plane.

l⊥α, a⊂α⇒l⊥a

If a line is perpendicular to two intersecting lines in a plane, then the line is perpendicular to that plane.

l⊥a, l⊥b, a⊂α, b⊂α, a∩b＝P⇒l⊥α

Two straight lines perpendicular to the same plane are parallel.

a⊥α, b⊥α⇒a∥b

If one plane passes through the perpendicular to the other plane, then the two planes are perpendicular.

l⊥α, l⊂β⇒α⊥β

Two planes are perpendicular. If there is a straight line in one plane perpendicular to the intersection of the two planes, then this straight line is perpendicular to the other plane.

α⊥β,α∩β=m,l⊂β,l⊥m⇒l⊥α