In a quadrilateral ABCD, AB = CD and ∠B = ∠C. Prove that: (i) AC = DB, (ii) AD is parallel to BC.

(i) Given: In a quadrilateral ABCD, AB = CD and ∠B = ∠C. To prove: AC = DB Construction: Join diagonals AC and BD. Proof: Consider the triangles ABC and DBC, AB = CD (Given) ∠ABC = ∠BCD (Given) BC = BC (Common Side) Using SAS congruency criterion, Δ ABC ≅ Δ DBC By corresponding parts of congruent triangles, Hence, AC = BD. (ii) To prove: AD is parallel to BC. Proof: Consider the triangles ABD and ADC, AB = CD (Given) AC = DB (Proved above) DA = DA (Common Side) Using SSS congruency criterion, Δ ABD ≅ Δ ADC By corresponding parts of congruent triangles, ∠A = ∠D As we know that sum of all angles of quadrilateral is 360°. ⇒ ∠A + ∠B + ∠C + ∠D = 360° ⇒ ∠D + ∠B + ∠B + ∠D = 360° [∠A = ∠D and ∠B = ∠C] ⇒ 2∠D + 2∠B = 360° ⇒ ∠D + ∠B = ⇒ ∠D + ∠B = 180° Since, opposite angles formed between the transversal AC are supplementary. Hence, AD is parallel to BC.

If the difference between an interior angle of a regular polygon of (n + 1) sides and an interior angle of a regular polygon of n sides is 4°; find the value of n.
Also, state the difference between their exterior angles.

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In a quadrilateral ABCD; angles A, B, C and D are in the ratio 3 : 2 : 1 : 4. Prove that AD is parallel to BC.

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In the diagram below; P and Q are midpoints of sides BC and AD respectively of the parallelogram ABCD. If side AB = diagonal BD; prove that the quadrilateral BPDQ is a rectangle.

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ABCD is a parallelogram. If AB = 2AD and P is the mid-point of CD; prove that : ∠APB = 90°.

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Mathematics

In a quadrilateral ABCD, AB = CD and ∠B = ∠C. Prove that:
(i) AC = DB,
(ii) AD is parallel to BC.

Rectilinear Figures

Related Questions

If the difference between an interior angle of a regular polygon of (n + 1) sides and an interior angle of a regular polygon of n sides is 4°; find the value of n.
Also, state the difference between their exterior angles.

In a quadrilateral ABCD; angles A, B, C and D are in the ratio 3 : 2 : 1 : 4. Prove that AD is parallel to BC.

In the diagram below; P and Q are midpoints of sides BC and AD respectively of the parallelogram ABCD. If side AB = diagonal BD; prove that the quadrilateral BPDQ is a rectangle.

ABCD is a parallelogram. If AB = 2AD and P is the mid-point of CD; prove that : ∠APB = 90°.

Mathematics

In a quadrilateral ABCD, AB = CD and ∠B = ∠C. Prove that:(i) AC = DB,(ii) AD is parallel to BC.

Rectilinear Figures

Related Questions

If the difference between an interior angle of a regular polygon of (n + 1) sides and an interior angle of a regular polygon of n sides is 4°; find the value of n.Also, state the difference between their exterior angles.

In a quadrilateral ABCD; angles A, B, C and D are in the ratio 3 : 2 : 1 : 4. Prove that AD is parallel to BC.

In the diagram below; P and Q are midpoints of sides BC and AD respectively of the parallelogram ABCD. If side AB = diagonal BD; prove that the quadrilateral BPDQ is a rectangle.

ABCD is a parallelogram. If AB = 2AD and P is the mid-point of CD; prove that : ∠APB = 90°.

In a quadrilateral ABCD, AB = CD and ∠B = ∠C. Prove that:
(i) AC = DB,
(ii) AD is parallel to BC.

If the difference between an interior angle of a regular polygon of (n + 1) sides and an interior angle of a regular polygon of n sides is 4°; find the value of n.
Also, state the difference between their exterior angles.