4. Draw a line segment of length 12.8 cm. Using compasses, divide it into four
equal parts. Verify by actual measurement
Answers
Answer:
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Step-by-step explanation:
Draw a line segment AB = 12.8 cm
(ii) Draw the perpendicular bisector of \bar{AB} which cuts it at C. Thus, C is the mid-point of \bar{AB} .
(iii) Draw the perpendicular bisector of \bar{AC} which cuts it at D. Thus D is the mid-point of .
(iv) Again, draw the perpendicular bisector of \bar{CB} which cuts it at E. Thus, E is the mid-point of \bar{CB}.
(v) Now, point C, D, and E divide the line segment \bar{AB} in the four equal parts.
(vi) By actual measurement, we find that
\bar{AD} = \bar{DC} = \bar{CE} = \bar{EB} = 3.2cm
Step-by-step explanation:
(i) Draw a line segment AB = 12.8 cm
(ii) Draw the perpendicular bisector of \bar{AB} which cuts it at C. Thus, C is the mid-point of \bar{AB} .
(iii) Draw the perpendicular bisector of \bar{AC} which cuts it at D. Thus D is the mid-point of .
(iv) Again, draw the perpendicular bisector of \bar{CB} which cuts it at E. Thus, E is the mid-point of \bar{CB}.
(v) Now, point C, D, and E divide the line segment \bar{AB} in the four equal parts.
(vi) By actual measurement, we find that
\bar{AD} = \bar{DC} = \bar{CE} = \bar{EB} = 3.2cm