Question 6
A diagonal of a parallelogram bisects one of its angles. Show that it is a rhombus.

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Solution

Given Let ABCD is a parallelogram and diagonal AC bisects the angle A.

$∴ ∠ C A B = ∠ C A D$ . . . . . . . (i)

To show ABCD is a rhombus.

Proof Since, ABCD is a parallelogram, therefore AB || CD and AC is a transversal.

$∴ ∠ C A B = ∠ A C D$ [alternate interior angles]

Again, AD || BC and AC is a transversal.

$∴ ∠ C A D = ∠ A C B$ [alternate interior angles]

So, $∠ A C D = ∠ A C B$ [ $∵ ∠ C A B = ∠ C A D$ given] . . . . (ii)

Also, $∠ A = ∠ C$ [opposite angles of parallelogram are equal]

$\Rightarrow \frac{1}{2} ∠ A = \frac{1}{2} ∠ C$ [dividing both sides by 2]

$\Rightarrow ∠ D A C = ∠ D C A$ [from Eqs. (i) and (ii)]

$\Rightarrow C D = A D$

[sides opposite to the equal angles are equal]

But AB = CD and AD = BC

[opposite sides of parallelogram are equal]

$∵ A B = B C = C D = A D$

Thus, all sides are equal. So, ABCD is a rhombus. Hence proved.

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