Find tha smallest angle of quadrilateral angle are in ratio 2:3:4:6
Answers
Answer:
48
Step-by-step explanation:
Let the angles be = 2x , 3x , 4x and 6x
Sum of all angles of quadrilateral = 360
==: 2x + 3x + 4x + 6x = 360
==: 15x = 360
==: x = 24
Angles = 48 , 73 , 96 and 144
Smallest angle = 48
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SOLUTION:-
Given
▪︎ Ratio of angles 2:3:4:6
To find
▪︎ Smallest angle
Explanation
We know that,
Sum of all angles of a Quadrilateral is 360
Let Quadrilateral be ABCD
So, angles are A,B,C,D
According to question
A:B:C:D= 2:3:4:6
Let angles be
A= 2x
B= 3x
C= 4x
D= 6x
Now
Sum of all angles of a quadrilateral =360
A+B+C+D= 360
2x+3x+4x+6x=360
15x=360
x= 360/15
x= 24°
Now, Angles are ⤵️⤵️
A=2x= 2×24= 48°
B= 3x= 3×24= 72°
C= 4x= 4×24= 96°
D= 6x= 6×24= 144°
So , Smallest angle is A= 48°
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