In the diagram, angle OLM is twice as large as angle PON. What is the size of angle OLM?
Answers
Given : angle OLM is twice as large as angle PON
To find : size of angle OLM
Solution:
∠OKJ = 124°
∠OKJ + ∠OKL = 180°
=> 124° + ∠OKL = 180°
=> ∠OKL = 56°
∠KOL = ∠PON ( vertically opposite angle )
∠OLM = ∠OKL + ∠KOL ( Exterior angle of triangle = Sum of opposite two interior angles)
angle OLM is twice as large as angle PON
=> ∠OLM = 2 ∠PON
=> ∠OLM = 2∠KOL
2∠KOL = ∠OKL + ∠KOL
=> ∠KOL = ∠OKL
=> ∠KOL = 56°
∠OLM = 2∠KOL = 2 * 56° = 112°
∠OLM = 112°
size of angle OLM = 112°
Learn More:
In Fig. 8.142, if lines l and m are parallel, then the value of x is A. 35 ...
https://brainly.in/question/15906443
the two interior opposite angles of an exterior angle of a triangle are ...
https://brainly.in/question/7976786
Answer:
∠OLM = 112°
Step-by-step explanation:
Given:
∠JKO = 124°
∠OLM = ∠PON
Find:
∠OLM
Computation:
∠JKO + ∠LKO = 180
∠LKO = 180 - 124
∠LKO = 56°
We know that;
∠PON = ∠KOL
So,
∠LKO + ∠KOL = ∠OLM
∠LKO + ∠KOL = ∠OLM
∠PON = 56
So,
∠OLM = 112°