Question 1 :
Draw an angle of measure $ 153^{\circ} $ and divide it into four equal parts. Each part measures an angle of?
Question 2 :
Draw any angle with vertex O. Take a point A on one of its arms and B on another such that OA = OB. Draw the perpendicular bisectors of OA and OB. Let them meet at P. Is PA = PB ?
Question 3 :
What is the figure obtained when you join the ends of any two non-perpendicular diameters drawn to a circle?
Question 5 :
Draw a circle with centre C and radius 3.4 cm. Draw any chord AB. Construct the perpendicular bisector of AB. The bisector passes through the point _____.
Question 6 :
How many circles can you draw with a given centre O and a point, say P?
Question 7 :
Given AB of length 7.3 cm and CD of length 3.4 cm, construct a line segment XY such that the length of XY is equal to the difference between the lengths of AB and CD. Length of line segment XY equals?
Question 8 :
Construct AB of length 7.8 cm. From this , cut off AC of length 4.7 cm. Length of line segment BC equals?
Question 10 :
Draw an angle of measure $ 135^{\circ} $ and bisect it. Each angle measures an angle equal to?
Question 11 :
Draw an angle of $ 70^{\circ} $. Can you make a copy of it using only a straight edge and compass?
Question 14 :
Draw any line segment PQ. Take any point R not on it. Through R, draw a perpendicular to PQ. Is the construction possible ?
Question 15 :
Draw a right angle and construct its bisector. What angle does it make with either of the arms ?
Question 16 :
If the length of the diameter of a circle is 6.1cm, then radius of the circle is?
Question 17 :
Draw a circle of radius 4 cm. Draw any two of its chords. Construct the perpendicular bisectors of these chords. Where do they meet?
Question 18 :
Draw any line segment AB. Mark any point M on it. Through M, draw a perpendicular to AB. Is the construction possible ?
Question 19 :
If AB is a line segment of length 9.5 cm. What is the distance between end A and perpendicular bisector ?
Question 20 :
Is the perpendicular bisector of a line joining two points the same as the axis of symmetry?