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4. Two triangles \( A B C \) and \( P Q R \) in which \( A B = P Q , B C = Q R , \) median \( A M = m \) edian PN prove that triangle \( \mathrm { ABC } \) is congruent to triangle \( \mathrm { PQR } \)

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Similar Questions

Q1

In given figure two sides

A B, B C

and median

A M

of one triangle

A B C

are respectively equal to sides

P Q

and

Q R

and median

P N

of

△ P Q R

. Show that:

△ A B C ≅ △ P Q R

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Q2

Two sides AB and BC and median AN of one triangles ABCare respectively equal to sides PQ and QR and median PN of triangle PQR. show that

(i) triangle ABM Congruent to Triangle PQN

(ii)triangle ABC Congruent to Triangle PQR

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Q3

Two sides AB and BC and median AM of one triangle ABC are respectively equal to sides PQ and QR and median PN of $$\triangle PQR$$. Show that :
(i) $$\triangle ABM \cong \triangle PQN$$
(ii) $$\triangle ABC \cong \triangle PQR$$

View Solution

Q4

Two sides

A B, B C

and medium

A M

of

△ A B C

are congruent to the two sides and the median of

△ P Q R

. Prove

△ A B C ≅ △ P Q R

View Solution

Q5

In

△ A B C, A D

is the median to

B C

and in

△ P Q R

,

P M

is the median to

Q R

. If

\frac{A B}{P Q} = \frac{B C}{Q R} = \frac{A D}{P M}

. Prove that

△ A B C \sim △ P Q R

.

View Solution