Draw an angle of 30 degree and its bisector
Answers
Step-by-step explanation:
1) draw a 30 ° angle
2) take your compact and keep it at the vertex of 30°
3) take more than half and draw two arcs on the two hands ( lines) coming from 30°
4) keep your compass at the point where your hand meets your arc and draw another arch. repeat the same thing on other side
hope you got it
Step 1: Draw a line segment. Mark the left end as point O and the right end as point A.
Step 2: Take the compass and open it up to a convenient radius. Place its pointer at O and with the pencil-head make an arc which meets the line OA
Step 3: Place the compass pointer at A and mark an arc with the same radius as OA we get D
Step 4: Draw a line from O through D.
We get the angle i.e. ∠AOD=60-degree angle.
A 30-degree angle is the half of 60-degree angle. For its construction, you first construct a 60-degree angle as discussed above. Then, you bisect this angle. You get two 30 degree angles.
Again 15-degree angle is the half of 30-degree angle. You get two 15 degree angles.
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