if the ratio of measures of two adjacent angles of a parallelogram is 1:2 , find the measures of all angles of the parallelogram
Answers
Answer:
It is an pretty ezy question
Step-by-step explanation:
Solution :-
In parallelogram, sum of adjacent angles =180
Given they are in ratio 1:2.
∴x+2x=180
⇒3x=180
⇒x=60
∴ the angles are 60 ,120 ,60,120
hope it helpssss
Answer :
›»› The measure of all angles of the parallelogram is 60°, 120°, 60°, and 120°.
Given :
- The ratio of measures of two adjacent angles of a parallelogram is 1:2.
To Find :
- The measures of all angles of the parallelogram.
Solution :
Let us assume that, the measures of two adjacent angles of a parallelogram is "1x" and "2x" respectively.
As we know that
The sum of adjacent angle of parallelogram is 180°.
→ 1x + 2x = 180
→ x + 2x = 180
→ 3x = 180
→ x = 180 ÷ 3
→ x = 60
Therefore,
The measure of two adjacent angle of parallel will be,
- 1x = 1 * 60 = 60°.
- 2x = 2 * 60 = 120°.
As we know that
The opposite angles of parallelogram are equal and parallel.
So, Opposite angle of 60° is 60°
And, Opposite angle of 120° is also 120°.
Hence, the measure of all angles of the parallelogram is 60°, 120° 60°, and 120°.
Verification :
The sum of all four angles of a parallelogram is 360°.
→ 60 + 120 + 60 + 120 = 360
→ 180 + 60 + 120 = 360
→ 180 + 180 = 360
→ 360 = 360
Clearly, LHS = RHS
Here, both the conditions satisfy, so our answer is correct.