In a rhombus ABCD diagonals bisect each other at O and /_ AOB=(7z+6) ° then z=?
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Step-by-step explanation:
Hence angle CDO=121° and angle DCB=142°
Step-by-step explanation:
Given:
In rhombus ABCD we have ∠AOB=(7z+6), and ∠DAO=(5z+1).
∠CDO and ∠DCB=?
Diagonals of a rhombus cuts at right angles
So
∠AOB=90°
(7z+6)°=90°
7z=90°-6°
7z=84°
z=\frac{84}{7}z=
7
84
z=14°
∠DAO=5z+1
=5(14°)+1
=70°+1
∠DAO=71°
Diagonals of a rhombus bisects its interior angles
So if ∠DAO=71°=∠BAO
This way ∠A=71°+71°=142°
All angles are equal is a rhombus
Therefore ∠A=∠B=∠C=∠D=142°
So ∠DCB=142°
Also,
\angle CDO = \angle \frac{D}{2}∠CDO=∠
2
May be hlep u
D
\angle CDO = \angle \frac{142\°}{2}∠CDO=∠
2
142\°
[Diagonals bisects interior angles]
∠CDO=121°
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