Q3. The four angles of the quadrilateral are equal, Find measure of each angle, About the author Kylie
Answer: answer is 90 Step-by-step explanation: let the four angles of the quadrilaterals be x A.T.Q 4x the sum of quadrilaterals is 360 degree 4x=360 x=90 Each angle of a quadrilateral is 90 degree… HOPE IT HELPS…. Reply
[tex]\huge{\boxed{\boxed{\mathcal{\underline{\overline{\red{S{\green{o{\orange{l{\blue{u{\pink{t{\purple{i{\red{o{\blue{n}}}}}}}}}}}}}}}}}}}}}[/tex] Sum of the angles of the quadrilateral = 360° i.e., ∠a + ∠b + ∠c + ∠d = 360° But, given that all the angles are equal Therefore, ∠a = ∠b = ∠c = ∠d Substitute ∠b, ∠c, ∠d in terms of ∠a This gives, ∠a + ∠a + ∠a + ∠a = 360 4∠a = 360 ∠a = 360/4 ∠a = 90° Therefore, ∠a = ∠b = ∠c = ∠d = 90° Reply
Answer:
answer is 90
Step-by-step explanation:
let the four angles of the quadrilaterals be x
A.T.Q 4x
the sum of quadrilaterals is 360 degree
4x=360
x=90
Each angle of a quadrilateral is 90 degree…
HOPE IT HELPS….
[tex]\huge{\boxed{\boxed{\mathcal{\underline{\overline{\red{S{\green{o{\orange{l{\blue{u{\pink{t{\purple{i{\red{o{\blue{n}}}}}}}}}}}}}}}}}}}}}[/tex]
Sum of the angles of the quadrilateral = 360°
i.e., ∠a + ∠b + ∠c + ∠d = 360°
But, given that all the angles are equal
Therefore, ∠a = ∠b = ∠c = ∠d
Substitute ∠b, ∠c, ∠d in terms of ∠a
This gives, ∠a + ∠a + ∠a + ∠a = 360
4∠a = 360
∠a = 360/4
∠a = 90°
Therefore, ∠a = ∠b = ∠c = ∠d = 90°