PQRS is a parallelogram. L and M are points on PQ and SR respectively such that PL = MR. Show that LM and QS bisect each other.

Parallelogram PQRS is shown in the figure below: We know that, Opposite angles of a parallelogram are equal. ∠Q = ∠S = x (let). Diagonals of a parallelogram bisect the interior angles. ∴ QS bisects interior angles Q and S. ∴ ∠LQN = and ∠NSM = . ∴ ∠LQN = ∠NSM. We know that, Opposite sides of a parallelogram are equal. ∴ PQ = SR = a (let) Given, ⇒ PL = MR = b (let) From figure, ⇒ LQ = PQ - PL = a - b ⇒ MS = SR - MR = a - b ∴ LQ = MS. In △ LNQ and △ MNS, ⇒ ∠LNQ = ∠MNS (Vertically opposite angles are equal) ⇒ LQ = MS (Proved above) ⇒ ∠LQN = ∠NSM (Proved above) ∴ △ LNQ ≅ △ MNS (By A.A.S. axiom). We know that, Corresponding parts of congruent triangles are equal. ∴ QN = NS and LN = NM. Hence, proved that LM and QS bisect each other at point of intersection.

ABCD is a parallelogram. The sides AB and AD are produced to E and F respectively such that AB = BE and AD = DF. Prove that :
△ BEC ≅ △ DCF

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In the following figure, ABC is an equilateral triangle in which QP is parallel to AC. Side AC is produced upto point R so that CR = BP.
Prove that QR bisects PC.

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In the given figure, AB = PQ, BC = QR and median AM = median PN, then :
AC ≠ PR
BM ≠ QN
△ ABM ≅ △ PQN
△ ABC ≅ △ PQR

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In triangles ABC and DEF, AB = DE and AC = EF, then to make these two triangles congruent, we must have :
BC = DF
∠A = ∠E
any of (1) and (2)
none of (1) and (2)

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Mathematics

PQRS is a parallelogram. L and M are points on PQ and SR respectively such that PL = MR. Show that LM and QS bisect each other.

Triangles

Related Questions

ABCD is a parallelogram. The sides AB and AD are produced to E and F respectively such that AB = BE and AD = DF. Prove that :
△ BEC ≅ △ DCF

In the following figure, ABC is an equilateral triangle in which QP is parallel to AC. Side AC is produced upto point R so that CR = BP.
Prove that QR bisects PC.

In the given figure, AB = PQ, BC = QR and median AM = median PN, then :
AC ≠ PR
BM ≠ QN
△ ABM ≅ △ PQN
△ ABC ≅ △ PQR

In triangles ABC and DEF, AB = DE and AC = EF, then to make these two triangles congruent, we must have :
BC = DF
∠A = ∠E
any of (1) and (2)
none of (1) and (2)

Mathematics

PQRS is a parallelogram. L and M are points on PQ and SR respectively such that PL = MR. Show that LM and QS bisect each other.

Triangles

Related Questions

ABCD is a parallelogram. The sides AB and AD are produced to E and F respectively such that AB = BE and AD = DF. Prove that :△ BEC ≅ △ DCF

In the following figure, ABC is an equilateral triangle in which QP is parallel to AC. Side AC is produced upto point R so that CR = BP.Prove that QR bisects PC.

In the given figure, AB = PQ, BC = QR and median AM = median PN, then :AC ≠ PRBM ≠ QN△ ABM ≅ △ PQN△ ABC ≅ △ PQR

In triangles ABC and DEF, AB = DE and AC = EF, then to make these two triangles congruent, we must have :BC = DF∠A = ∠Eany of (1) and (2)none of (1) and (2)

ABCD is a parallelogram. The sides AB and AD are produced to E and F respectively such that AB = BE and AD = DF. Prove that :
△ BEC ≅ △ DCF

In the following figure, ABC is an equilateral triangle in which QP is parallel to AC. Side AC is produced upto point R so that CR = BP.
Prove that QR bisects PC.

In the given figure, AB = PQ, BC = QR and median AM = median PN, then :
AC ≠ PR
BM ≠ QN
△ ABM ≅ △ PQN
△ ABC ≅ △ PQR

In triangles ABC and DEF, AB = DE and AC = EF, then to make these two triangles congruent, we must have :
BC = DF
∠A = ∠E
any of (1) and (2)
none of (1) and (2)