Prove that the medians corresponding to equal sides of an isosceles triangle are equal.

In ∆ ABC, ⇒ AB = AC (Since, ABC is an isosceles triangle) ⇒ ∠C = ∠B (Angles opposite to equal sides are equal) From figure, BD and CE are medians of triangle. As, ⇒ AB = AC Dividing both sides of the equation by 2, we get : ⇒ ⇒ BE = CD In Δ EBC and Δ DCB, ⇒ ∠B = ∠C (Proved above) ⇒ BC = BC (Common side) ⇒ BE = CD (Proved above) ∴ Δ EBC ≅ Δ DCB (By S.A.S. axiom) We know that, Corresponding sides of congruent triangles are equal. ∴ BD = CE Hence, proved that medians bisecting the equal sides of an isosceles triangle are also equal.

In quadrilateral ABCD, side AB is the longest and side DC is the shortest. Prove that :
(i) ∠C > ∠A
(ii) ∠D > ∠B

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In triangle ABC, side AC is greater than side AB. If the internal bisector of angle A meets the opposite side at point D, prove that : ∠ADC is greater than ∠ADB.

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In isosceles triangle ABC, sides AB and AC are equal. If point D lies in base BC and point E lies on BC produced (BC being produced through vertex C), prove that :
(i) AC > AD
(ii) AE > AC
(iii) AE > AD

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Given : ED = EC
Prove : AB + AD > BC.

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Mathematics

Prove that the medians corresponding to equal sides of an isosceles triangle are equal.

Triangles

Related Questions

In quadrilateral ABCD, side AB is the longest and side DC is the shortest. Prove that :
(i) ∠C > ∠A
(ii) ∠D > ∠B

In triangle ABC, side AC is greater than side AB. If the internal bisector of angle A meets the opposite side at point D, prove that : ∠ADC is greater than ∠ADB.

In isosceles triangle ABC, sides AB and AC are equal. If point D lies in base BC and point E lies on BC produced (BC being produced through vertex C), prove that :
(i) AC > AD
(ii) AE > AC
(iii) AE > AD

Given : ED = EC
Prove : AB + AD > BC.

Mathematics

Prove that the medians corresponding to equal sides of an isosceles triangle are equal.

Triangles

Related Questions

In quadrilateral ABCD, side AB is the longest and side DC is the shortest. Prove that :(i) ∠C > ∠A(ii) ∠D > ∠B

In triangle ABC, side AC is greater than side AB. If the internal bisector of angle A meets the opposite side at point D, prove that : ∠ADC is greater than ∠ADB.

In isosceles triangle ABC, sides AB and AC are equal. If point D lies in base BC and point E lies on BC produced (BC being produced through vertex C), prove that :(i) AC > AD(ii) AE > AC(iii) AE > AD

Given : ED = ECProve : AB + AD > BC.

In quadrilateral ABCD, side AB is the longest and side DC is the shortest. Prove that :
(i) ∠C > ∠A
(ii) ∠D > ∠B

In isosceles triangle ABC, sides AB and AC are equal. If point D lies in base BC and point E lies on BC produced (BC being produced through vertex C), prove that :
(i) AC > AD
(ii) AE > AC
(iii) AE > AD

Given : ED = EC
Prove : AB + AD > BC.