MATHS 5 Marks Questions

Draw a circle. Take any point A on the top of the circle and draw an arc with centre at A and radius as that of the circle and intersecting the circle at B.

With the centre at B and the same radius, draw an arc intersecting the circle at C.
Repeat this process to get points of intersection D, E, and F.
Join the lines as shown in the figure.

Erase the extra arcs, circle, and letters to get the required figure as shown above.

Draw a line and take points A and B on it.
With A and B as centres, draw semicircles intersecting the lines at the points C, D, E, and F.
With centres at C and D, draw arcs of equal radius to intersect at the point G.
With centres at E and F, draw arcs of equal radius to intersect at the point H.
Join AG and BH.
Take point I and J on AG and BH, respectively, so that AI = BJ = AB.
Join I and J.

Here ABJI is a square.
Using a ruler and a compass, find perpendicular bisectors of the sides AB and BJ.
With centres at K, L, M, and N, draw semicircles in the square with radius equal to AK.
Now, we erase the extra lines and arcs.
The above figure looks as given below:


This is the required figure with 4 petals in a square.
Here we have drawn 4 semicircles in the square, so that the petals are of the maximum possible size.

Let ∠XOY be the given angle.
Fix a small pole at the point O.
Take a rope and make a loop at one end.
Mark a point at some distance on the rope.
Fix the loop of the rope at the pole at O and rotate the rope from OX to OY.
Mark points A and B at a fixed distance mark on the rope.
Fix small poles at A and B.
Take a rope and make loops on both ends.
Fix the loops of this piece of rope with poles at A and B.
Mark the midpoint of this rope and hold the rope at the midpoint.
Make both ends of the rope tight and mark the point at the midpoint of the rope.
Let this point be M.
Join AM, BM, and OM.

We have OA = OB and AM = BM.
In ∆OAM and ∆OBM, we have OA = OB, AM = BM, and OM is common.
∴ ∆OAM = ∆OBM (Using SSS-rule)
∴ ∠AOM = ∠BOM
∴ ∠XOM = ∠YOM
∴ OM is the bisector of the given angle ∠XOY.

Let ∠XOY be any angle. With centre at O, draw an arc intersecting the lines OX and OY at A and B respectively.
With centres at A and B, draw arcs of the same radius so that the arcs intersect at a point, say C.

Join AC, BC, and OC. Extend CO to CD.
We have OA = OB and AC = BC.
In ∆OAC and ∆OBC, we have OA = OB, AC = BC, and OC is common.
∴ ∆OAC ≅ ∆OBC (Using SSS rule)
∴ ∠AOC = ∠BOC
∴ 180° – ∠AOC = 180° – ∠BOC
∴ ∠AOD = ∠BOD
∴ Line OD is the bisector of the angle ∠XOY.
∴ Line OC is the bisector of the angle ∠XOY.

Draw a line AB.
With centres at A and B, draw arcs of equal radius above and below the line AB.
Let the arcs intersect at the points C and D.
Join C and D.
Let AB and CD intersect at O.
Draw the bisectors of ∠BOC, ∠COA, ∠AOD, and ∠DOB as shown in the figure.

Draw a circle with centre at O and radius equal to the length of a petal in the given figure.
Draw dots at the points of intersection of the circle with the lines.
Using the dots and the centre of the circle, draw the petals as shown in the given figure.
In the next step, we erase the extra lines and arcs.
The above figure looks as given below:

This is the required 8-petalled figure.

We draw 4 different angles, ∠ABC, ∠DEF, ∠GHI, and ∠JKL, as shown below:




We shall draw the bisectors of the above angles.
With centres at B, E, H, and K, draw arcs intersecting the arms of the angles.
With centres at A’, C’, D’, F’, G’, I’, J’, and L’, draw arcs of the same radius so that the arcs intersect at points B’, E’, H’, and K’.
Join BB’, EE’, HH’, and KK’.
In the above figure:
BB’ is the bisector of ∠ABC
EE’ is the bisector of ∠DEF
HH’ is the bisector of ∠GHI
KK’ is the bisector of ∠JKL.

The following is the given figure:

Draw a vertical line B’D’.
With centres at B and B’, draw arcs of equal radius.

Measure RS using a compass.
Transfer this length on the arc from S’ to get R’S’ = RS.
Join B’ and R’ and extend this line.
Make B’A’ equal to BA.
Measure ST using a compass.
Transfer this length on the arc from S’ to get S’T’ = ST.
Join B’ and T’ and extend this line.
Make B’C’ equal to BC.
Using a compass, find the midpoints M and N of A’B’ and B’C’ respectively.
On the lines A’M, MB’, B’N, and NC’, draw similar arcs as shown in the figure.
Erase the extra letters, lines, and arcs to get the required pointed arch with given support lines.

Let AB be a given line; we shall draw a line parallel to the line AB.
Draw a line CD intersecting the line AB.
Choose a point P on the line CD.
We shall draw a line parallel to AB and passing through P.

With centres at E and P, draw arcs of equal radius.
Measure FG using a compass.
Transfer this length on the arc from H to get HI = FG.
Join P and I and extend this line on both sides.
Here, CD is a transversal, and the corresponding angles ∠PEB and ∠CPK are equal.
∴ The lines AB and JK are parallel lines.
Similarly, we can draw three other pairs of parallel lines.

We name the vertices of the given figure as A, B, C, D, E, F, G.
Draw a line A’B’ equal to AB and along the direction of the line AB.
With centre at B’. draw an arc of radius A’B’.
Measure AC using a compass.
Transfer this length on the arc from A’ to get A’C’ = AC.
Join B’ and C’. Shade this sector as shown in the given figure.

With centre at C’, draw an arc of radius B’C’.
Measure BD using a compass.
Transfer this length on the arc from B’ to get B’D’ = BD.
Join C’ and A’.
With centre at D’, draw an arc of radius C’D’.
Measure CE using a compass.
Transfer this length on the arc from C’ to get C’E’ = CE.
Join D’ and E’. Shade this sector as shown in the given figure.
With centre at E’, draw an arc of radius D’E’.
Measure DF using a compass.
Transfer this length on the arc from D’ to get D’F’ = DF.
Join E’ and F’.
With centre at F’, draw an arc of radius E’F’.
Measure EF using a compass.
Transfer this length on the arc from E’ to get E’G’ = EG.
Join F’ and G’. Shade this sector as shown in the given figure.
Erase the extra arcs from the figure constructed to get the required figure.

The following are the given angles:


We shall make a copy of each of the above angles one by one.
Angle (i): Draw a line A’B’ along the direction of the line AB.
With centre at B and B’, draw arcs of equal radius.
Let the arc intersect AB and BC at M and N, respectively.
Let the arc intersect A’B’ at M.
Measure MN using a compass.
Transfer this length on the arc from M’ to get M’N’ = MN.
Join B’ and N’.
∠A’B’C’ is the required angle.
Angle (ii): Draw a line D’E’ along the direction of the line DE.
With centres at E and E’, draw arcs of equal radius.
Let the arc intersect DE and EE at O and P, respectively.
Let the arc intersect D’E’ at O’.
Measure OP using a compass.
Transfer this length on the arc from O’ to get O’P’ = OP.
Join E’ and P’.

∠D’E’F’ is the required angle.
Angie (iii): Draw a line G’H’ along the direction of the line GH.
With centres at H and H’, draw arcs of equal radius.
Let the arc intersect GH and HI at Q and R, respectively.

Let the arc intersect G’H’ and at Q’.
Measure QR using a compass.
Transfer this length on the arc from Q’ to get Q’R’ = QR.
Join H’ and R’.
∠G’H’I’ is the required angle.
Angle (iv): Draw a line J’K’ along the direction of the line JK.
With centres at K and K’, draw arcs of equal radius.
Let the arc intersect JK and KL at S and T, respectively.
Let the arc intersect J’K’ at S’.
Measure ST using a compass.
Transfer this length on the arc from S’ to get S’T’ = ST.

Join K’ and T.
∠J’K’L’ is the required angle.

In this construction, we shall use the 3-4-5 principle that if the sides of a triangle are in the ratio 3 : 4 : 5, then the angle opposite to the longest side is 90°.
In the figure, the sides AB, BC, and CA are in the ratio 3 : 4 : 5 and the angle B, opposite to the longest side AC, is equal to 90°.

Construction:
Draw a line XY and take any point A on it.
We shall construct a 90° angle at point A, using a rope.


Fix a small pole at point A.
Take a rope and mark it at 0 units, 3 units, 8 units, and 12 units.
Attach the 0 unit mark and 12 unit mark of the rope at A.
Attach the 3-unit mark at point B on the line XY, with the help of a pole at B.
Now hold the 8-unit point of the rope and extend it away from XY so that both sides of this point are tight.
Place a pole at this point and call this point C, as shown in the figure.

In the ∆ABC, the sides are 3 units, 4 units, and 5 units.
The angle opposite to the longest side is ∠A.
∴ By the 3-4-5 principle, ∠A is equal to 90°.
∴ The line AC is perpendicular to the line XY at the given point A.

In the above figure, XAY and XBY are two positions of the rope.
Points A and B are at the midpoint of the rope.
∴ We have AX = AY = BX = BY.
∆AXB and ∆AYB are congruent, because AX = AY, BX = BY, and AB is common.
∴ ∠XAO = ∠YAO
∆AXO and ∆AYO are congruent, because AX = AY, ∠XAO = ∠YAO, and AO is common.
∴ OX = OY and ∠XOA = ∠YOA.
Also, ∠XOA + ∠YOA = 180°
∴ 2∠XOA = 180° or ∠XOA = 90°
∴ OX = OY and ∠XOA = ∠YOA = 90°
∴ By definition, AB is the perpendicular bisector of the line XY.

Draw a line segment XY.
With centres at X and Y, draw arcs of unequal radii, say k and k’.
Let the arcs intersect at the point A.

Let PQ be the perpendicular bisector of XY.
Let R be any point on PQ.
Join RX and RY.
∆ROX and ∆ROY are congruent, because OX = OY, ∠ROX = ∠ROY, and OR is common.
∴ RX = RY
∴ For any point R on the perpendicular bisector, we have RX = RY.
∴ Every point on the perpendicular bisector is equidistant from X and Y.
Since AX ≠ AY, the point A is not on the perpendicular bisector.
Thus, to construct a perpendicular bisector, we must use the same radius for both arcs of a pair of arcs.

Draw a line segment XY.
Choose distances k and k’ which are slightly greater than half of the distance XY.
With centres at X and Y, draw arcs of radius ‘k’ above XY.
With centres at A and Y, draw arcs of radius ‘k’’ above XY.
Let the arcs intersect at the points A and B.
Join A and B and produce this line to intersect XY at O.
Join AX, AY, BX, and BY.

∆ABX and ∆ABY are congruent because AX = AY = k, BX = BY = k’, and AB is common.
∴ ∠XAO = ∠YAO
∆AOX and ∆AOY are congruent because AX = AY = k, ∠XAO = ∠YAO, and OA is common.
∴ OX = OY and ∠AOX = ∠AOY
Also, ∠AOX + ∠AOY = 180°
∴ 2∠AOX = 180° or ∠AOX = 90°
∴ OX = OY and ∠AOX = ∠AOY = 90°
∴ AB is the perpendicular bisector of the line XY.
Here, the pairs of arcs are both on the same side of XY.
∴ It is not necessary to construct the pairs of arcs above and below XY.

Draw a line segment XY.
Choose distances k and k’ which are slightly greater than half of the distance XY.
With centres at X and Y, draw arcs of radius ‘k’ below XY.
With centres at X and Y, draw arcs of radius ‘k’’ below XY.
Let the arcs above XY intersect at A, and the arcs below XY intersect at B.
Join A and B. Let AB intersect XY at O.
Join AX, AY, BX, and BY.

∆ABX and ∆ABY are congruent because AX = AY = k, BX = BY = k’, and AB is common.
∴ ∠XAO = ∠YAO
∆AOX and ∆AOY are congruent because AX = AY = k, ∠XAO = ∠YAO, and OA is common.
∴ OX = OY and ∠AOX = ∠AOY
Also, ∠AOX + ∠AOY = 180°
∴ 2∠AOX = 180° or ∠AOX = 90°
∴ OX = OY and ∠AOX = ∠AOY = 90°.
∴ AB is the perpendicular bisector of the line XY.
Here, A and B are points that are of the same distance from X and Y.
Thus, any point that is of the same distance from X and Y lies on the perpendicular bisector.