If AB is a straight line and ray OF stands on it,
what is the sum of the angles so formed?
Answers
Answer:
We know that the angle lying on a straight line is 180
We know that the angle lying on a straight line is 180 0
We know that the angle lying on a straight line is 180 0 .
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90 0
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90 0 =180
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90 0 =180 0
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90 0 =180 0
We know that the angle lying on a straight line is 180 0 .Thus, the two adjacent angles are right angles.So, In the above figure,Then, Totalangle=90 0 +90 0 =180 0 Hence, this is the answer.