Find the angles of the rhombus if the ratio of the angles formed by diagonals and the sides of the rhombus is 6:5.

Question

asked Aug 9, 2020 87.9k views

1 Answer

Jeremynac · Answer 1 · 2020-08-15T17:16:51+0000

Answer: Angles are
$((1080)/(11)) ^(\circ)$ and
$((900)/(11))^(\circ)$

Explanation:

Here, the ratio of the angles formed by diagonals and the sides of the rhombus is 6:5.

Let the angles formed by diagonals and the sides of the rhombus are 6x and 5x.

Where x is any number.

Thus, By the property of rhombus,

Diagonals perpendicularly bisect each other.

Therefore,
$6 x + 5 x + 90^(\circ) = 180^(\circ)$

⇒
$11 x + 90^(\circ) = 180^(\circ)$

⇒
$11 x = 90^(\circ)$

⇒
x = (90)/(11)

Therefore, the angles formed by diagonals and the sides of the rhombus are
$((540)/(11) )^(\circ)$ and
$((450)/(11))^(\circ)$

⇒ The angles of rhombus are
$((1080)/(11) )^(\circ)$ and
$((900)/(11))^(\circ)$