OVE XPYQ is a rectangle. Paned as in (ti...

OVE XPYQ is a rectangle. Paned as in (til) OAB, CD are two parallel lines and a transversal I intersects AB at X and CD at that the bisectors of the interior angles form a parallelogram, with all its angles right sely. The bisectors of interior angles intersect in Pand Q. INCERTI AB, CD are two parallel lines which are cut by a transversal lin points X and Y it is a rectangle. X A B P D Fig. 13.50 them

Similar Questions

Explore conceptually related problems

AB,CD are two parallel lines and a transversal l intersects AB at X and CD at Y Prove that the bisectors of the interior angles form a parallelogram,with all its angles right angles i.e.,it is a rectangle.

A B ,C D are two parallel lines and a transversal l intersects A B at X and C D at Y Prove that the bisectors of the interior angles form a parallelogram, with all its angles right angles i.e., it is a rectangle.

bar(AB) and bar(DC) are two parallel lines and a transversal l ,intersects bar(AB) at P and bar(DC) at R . Prove that the bisectors of the interior angles form a rectangle .

AB and CD are two parallel lines and a transversal 'l' intersects these lines at X and Y respectively Prove that the bisectors of interior angles from a parallelogram whose each angle is 90^(@).

If two parallel lines are intersected by a transversal then prove that the bisectors of any pair of alternate interior angles are parallel.

If two parallel lines intersected by a transversal; prove that the bisectors of the two pairs of interior angle encloses a rectangle.

Similar Questions

Recommended Questions