Identify the number of triangles similar to $△$ ABC if B is a right angle, and BD is perpendicular to AC and DE is perpendicular to BC.

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Open in App

Solution

The correct option is C
4

BD is the perpendicular drawn to the hypotenuse.
In $△ A B D$ and $△ B D C$
$∠ A D B = ∠ B D C = 90^{\circ}$
$∠ A = ∠ D B C$ [Since, in $△ B D C, ∠ D B C = 90^{\circ} - ∠ C = ∠ A$ and in $△ A B C, ∠ A = 90^{\circ} - ∠ C$ ]

Therefore, $△ A D B \sim Δ B D C$ [by AA similarity]
Similarly, in $△ B D C,$ DE is the perpendicular drawn to the hypotenuse BC.
In $△ B D E$ and $△ B D C$
$∠ B E D = ∠ B D C = 90^{\circ}$
$∠ D B C = ∠ D B C$ [Common Angle]
Therefore, $△ B E D \sim △ B D C$ [by AA similarity]
Hence, $△ A D B \sim Δ B D C \sim Δ B E D \sim Δ D E C \sim Δ A B C .$
Therefore, there are 4 triangles similar to $△ A B C .$

Suggest Corrections

Similar questions

Δ A B C

Identify the number of triangles similar to $△$ ABC if B is a right angle, and BD is perpendicular to AC and DE is perpendicular to BC.

In $△ A B C$ , B is a right angle, and BD is perpendicular to AC and DE is perpendicular to BC. Which of the following is true?

In $△$ ABC, B is a right angle, and BD is perpendicular to AC and DE is perpendicular to BC. Then $A D . D C =$

In $△$ ABC, $∠ B$ is a right angle, and BD is perpendicular to AC and DE is perpendicular to BC. Then $A D . D C =$

Join BYJU'S Learning Program