Geometrical Constructions
Class 9th Mathematics RS Aggarwal And V Aggarwal Solution
- Draw a line segment AB = 5 cm and draw its perpendicular bisector.…
- Draw an angle of 45° using scale and compasses only. Draw the bisector of this…
- Construct an angle of 90° and draw its bisector.
- Construct an equilateral triangle each of whose sides measures 5 cm.…
- Construct an equilateral triangle each of whose altitudes measures 5.4 cm.…
- Construct a ΔABC in which BC = 5 cm, AB = 3.8 cm and AC = 2.6 cm.…
- Construct a ΔABC in which BC = 4.7 cm, ∠B = 60° and ∠C = 30°. Measure ∠A.…
- Construct an isosceles ΔPQR whose base measures 5 cm and each of equal sides…
- Construct an isosceles triangle whose base is 4.8 cm and whose vertical angle…
- Construct a right-angled triangle whose hypotenuse measures 5.3 cm and the…
- Construct a ΔABC in which ∠B = 30°, ∠C = 60° and the length of the…
- Construct a ΔPQR whose perimeter is 12 cm and the lengths of whose sides are…
- Construct a ΔABC in which BC = 4.5 cm, ∠B = 60° and the sum of the other two…
- Construct a ΔABC in which BC = 5.2 cm, ∠B = 30° and the difference of the…
- Which of the following angles can be constructed using ruler and compass only?A. 25° B.…
- Which of the following angles can be constructed using ruler and compass only?A. 65° B.…
- Which of the following angles cannot be constructed using ruler and compass only ?A.…
- Which of the following angles cannot be constructed using ruler and compass only?A. 22…
- The construction of a ΔABC in which AB = 6 cm, ∠A = 45° is possible when (BC + AC) isA.…
- The construction of a ΔPQR is which QR = 5.4 cm and ∠Q = 60° is not possible when (PQ +…
- The construction of a ΔABC in which AB = 7 cm, ∠A = 75° is possible when (BC - AC) is…
- The construction of a ΔABC in which BC = 6 cm and ∠B = 50° is not possible when (AB -…
- Is it possible to construct a triangle whose sides measure 7 cm, 5 cm and 12 cm?A. Yes…
- Is it possible to construct a triangle whose sides measure 6 cm, 5 cm and 10 cm?A. Yes…
- Is it possible to construct a ΔABC in which BC = 5 cm, ∠B = 120° and ∠C = 60° ?A. Yes…
- Is it possible to construct a ΔABC in which ∠A = 60, ∠B = 70° and ∠C = 60° ?A. Yes B.…
- Is it possible to construct an angle of 35° using ruler and compass only?A. Yes B. No…
- Is it possible to construct an angle of 67.5° using ruler and compass only?A. Yes B.…
- Is it possible to construct a ΔABC in which BC = 5 cm, ∠B = 60°, ∠C = 60°?A. Yes B. No…
- Is it possible to construct a ΔABC in which AB = 5 cm, BC = 5 cm and AC = 10 cm?A. Yes…
- Is it possible to construct an angle of 75° using ruler and compass only?A. Yes B. No…
- Construct a ΔABC whose perimeter is 12 cm and whose base angles are 45° and 60°.…
- Construct a ΔABC whose perimeter is 15 cm and sides are in the ratio 3 : 4 : 5.…
- Construct an isosceles triangle whose base is 6 cm and whose vertical angle is 75°.…
- Draw a right-angled triangle having hypotenuse = 6 cm and one of the sides containing…
- Construct a ΔABC in which ∠B = 60°, ∠C = 45° and the length of perpendicular from…
- Construct an angle of 22 1/2 %
- Construct an angle of 135°.
- Construct an equilateral triangle of side 5 cm.
- Construct a square of side 4 cm.
- Draw a line segment AB of length 5.2 cm and construct the perpendicular bisector of…
- Construct an angle of 60° and bisect it.
- Construct a ΔABC in which base BC = 5.2 cm, ∠B = 60° and (AB + AC) = 7.6 cm.…
- Construct a square each of whose sides measures 3.2 cm.
- Construct a ΔABC in which base BC = 4.8 cm, ∠B = 45° and (AB - AC) = 2.5 cm.…
Exercise 12a
Question 1.Draw a line segment AB = 5 cm and draw its perpendicular bisector.
Answer:
Steps of Construction:
1. Draw a line segment AB = 5 cm
2. With A as centre and radius equal to more than half of AB, draw two arcs, one above AB and one below AB.
3. With B as centre and the same radius draw two arcs which cut the previously drawn arcs at C and D.
4. Join CD, intersecting AB at E.
Therefore, CD is the perpendicular bisector of AB at point E.
Question 2.
Draw an angle of 45° using scale and compasses only. Draw the bisector of this angle.
Answer:
Steps of Construction:
1. Draw line segment AB.
2. With A as centre and any suitable radius draw an arc, cutting AB at C.
3. With C as centre and the same radius, cut the previously drawn arc at D.
4. With D as centre and the same radius, cut the arc at E.
5. With D as centre and the radius more than half DE, draw an arc.
6. With E as centre and the same radius draw another arc which cuts previous arc at F.
7. Join F. So, ∠BAF = 90°
8. Now with C as centre and radius more than half of DC draw an arc.
9. With D as centre and same radius draw an arc which cuts the previous at G.
10. Join AG. Therefore, it is the bisector of ∠ BAF, i.e., 45°
11. Now with centre C and radius more than half of CD, draw an arc.
12. With centre D and same radius draw another arc which cuts the previously drawn arc at H.
13. Join AH.
Therefore, AH is the bisector of ∠BAG.
Question 3.
Construct an angle of 90° and draw its bisector.
Answer:
Steps of Construction:
1. Draw line segment AB.
2. With A as centre and any suitable radius draw an arc, cutting AB at C.
3. With C as centre and the same radius, cut the previously drawn arc at D.
4. With D as centre and the same radius, cut the arc at E.
5. With D as centre and the radius more than half DE, draw an arc.
6. With E as centre and the same radius draw another arc which cuts previous arc at F.
7. Join F. So, ∠BAF = 90°
8. Now with C as centre and radius more than half of DC draw an arc.
9. With D as centre and same radius draw an arc which cuts the previous at G.
10. Join AG. Therefore, it is the bisector of ∠ BAF, i.e., 45°
Question 4.
Construct an equilateral triangle each of whose sides measures 5 cm.
Answer:
Steps for Construction:
1. Draw a line segment AB = 5 cm.
2. With A as centre and radius equal to AB draw an arc.
3. With B as centre and the same radius draw another arc which cuts the previous arc at C.
4. Join AC and BC.
Then ∆ABC is the required equilateral triangle.
Question 5.
Construct an equilateral triangle each of whose altitudes measures 5.4 cm.
Answer:
Steps for Construction:
1. Draw a line AB.
2. Mark any point C on it.
3. From C, draw CD perpendicular to AB.
4. From C, set off CE = 5.4 cm cutting CD at E.
5. Construct ∠ CEP = ∠ CEQ = 30° meeting AB at P and Q respectively.
Therefore, Δ PEQ is required equilateral triangle.
Question 6.
Construct a ΔABC in which BC = 5 cm, AB = 3.8 cm and AC = 2.6 cm.
Answer:
Steps for Construction:
1. Draw a line segment BC = 5 cm.
2. With centre B and radius equal to 3.8 cm draw an arc.
3. With centre C and radius equal to 2.6 cm draw another arc which cuts the previously drawn arc at A.
4. Join AB and AC.
Therefore, Δ ABC is the required triangle.
Question 7.
Construct a ΔABC in which BC = 4.7 cm, ∠B = 60° and ∠C = 30°. Measure ∠A.
Answer:
Steps for Construction:
1. Draw a line segment BC = 4.7 cm
2. At B, draw ∠DBC = 60°
3. At C, draw ∠ECB = 30°
4. Let DB and EC intersect at A.
Therefore, Δ ABC is the required triangle.
Question 8.
Construct an isosceles ΔPQR whose base measures 5 cm and each of equal sides measures 4.5 cm.
Answer:
Steps of Construction:
1. Draw a line segment QR = 5 cm which is the base.
2. With centre Q and radius 4.5 cm, draw an arc.
3. With centre R and same radius, draw another arc which cuts the previous arc at P.
4. Join PQ and PR.
Therefore, Δ PQR is the required isosceles triangle.
Question 9.
Construct an isosceles triangle whose base is 4.8 cm and whose vertical angle is 80°.
Answer:
Since one of the angles is 80°, the sum of the other two will be 100°. It is isosceles. So, the other angles will be 50° and 50°.
Steps of Construction:
1. Draw a line segment AB = 4.8 cm.
2. Draw 50° angles at A and B.
3. Extend them such that they meet at C.
4. Join AC and BC.
Therefore, Δ PQR is the required isosceles triangle in which AC = BC.
Question 10.
Construct a right-angled triangle whose hypotenuse measures 5.3 cm and the length of one of whose sides containing the right angle measures 4.5 cm.
Answer:
Steps of Construction:
1. Draw a line segment AB = 4.5 cm.
2. Draw a 90° angle at A.
3. Now, measure 5.3 cm on compass from ruler and taking B as centre draw an arc intersecting AX at C.
4. Join BC.
Question 11.
Construct a ΔABC in which ∠B = 30°, ∠C = 60° and the length of the perpendicular from the vertex A to the base BC is 4.8 cm.
Answer:
Steps of Construction:
1. Draw a line segment AB.
2. Take any point C on AB and draw CD perpendicular to AB.
3. Along CD, set CE = 4.8 cm.
4. Through E, draw PQ parallel to AB.
5. Construct ∠ PEX = 30° and ∠ QEY = 60° meeting AB at X and Y respectively.
Therefore, Δ XEY is the required triangle.
Question 12.
Construct a ΔPQR whose perimeter is 12 cm and the lengths of whose sides are in the ratio 3:2:4.
Answer:
According to the question, the sides are 3x, 2x and 4x.
Given perimeter = 12 cm
Therefore, 3x + 2x + 4x = 12
⇒ 9x = 12
⇒ x = 1.33 cm
Hence, the sides are 3.99 cm, 2.66 cm and 5.32 cm.
Steps of Construction:
1. Take AB = 5.32 cm and draw a line segment.
2. Measure 3.99 cm in ruler and draw an arc above AB from A. Again do the same for 2.66 cm but draw the arc from B.
3. Name the point where they intersect as C.
4. Join AC and BC.
Question 13.
Construct a ΔABC in which BC = 4.5 cm, ∠B = 60° and the sum of the other two sides is 8 cm.
Answer:
Steps of Construction:
1. Draw BC = 4.5 cm
2. Construct ∠ CBX = 60°
3. Along BX set off BP= 8 cm
4. Join CP.
5. Draw the perpendicular bisector of CP intersecting BP at A.
6. Join AC.
Therefore, Δ ABC is the required triangle.
Question 14.
Construct a ΔABC in which BC = 5.2 cm, ∠B = 30° and the difference of the other two sides is 3.5 cm.
Answer:
Steps of Construction:
1. Draw BC = 5.2 cm
2. Construct ∠ CBX = 30°
3. Along BX set off BP = 3.5 cm
4. Join PC
5. Draw perpendicular bisector of PC meeting BP produced at A.
6. Join AC.
Therefore, Δ ABC is the required triangle.
Cce Questions
Question 1.Which of the following angles can be constructed using ruler and compass only?
A. 25°
B. 50°
C. 22.5°
D. 42.5°
Answer:
On bisecting 45°, we get 22.5°. Hence, 22.5° can be drawn using ruler and compass.
Question 2.
Which of the following angles can be constructed using ruler and compass only?
A. 65°
B. 72°
C. 80°
D. 67.5°
Answer:
We can make 135° by drawing 90° and 45°. On bisecting 135°, we get 67.5°. Hence, 67.5° can be drawn using ruler and compass.
Question 3.
Which of the following angles cannot be constructed using ruler and compass only ?
A. 40°
B. 120°
C. 135°
D. 37.5°
Answer:
Below angles can be drawn using following
120° = 90° + 30° or 60° + 60° (where 30° is the bisected angle of 60° )
135°= 90° + 45°
37.5° is the bisected angle of 75° and 75° can be drawn using 90° and 60°.
But 40° cannot be drawn.
Question 4.
Which of the following angles cannot be constructed using ruler and compass only?
A. 
B. 15°
C. 
D. 
Answer:
Below angles can be drawn using following
On bisecting 45°, we get 
15° is the bisected angle of 30°
= 90° + 15°
But 
cannot be drawn.
Question 5.
The construction of a ΔABC in which AB = 6 cm, ∠A = 45° is possible when (BC + AC) is
A. 7 cm
B. 5.8 cm
C. 5 cm
D. 4.9 cm
Answer:
For any triangle sum of the lengths of two sides is always greater than the length of third side.
So, BC + AC should be greater than 6 cm. Hence, BC + AC = 7 cm
Question 6.
The construction of a ΔPQR is which QR = 5.4 cm and ∠Q = 60° is not possible when (PQ + QR) is
A. 6 cm
B. 6.5 cm
C. 5 cm
D. 7 cm
Answer:
For any triangle sum of the lengths of two sides is always greater than the length of third side.
So, PQ + QR should be greater than 5.4cm. Hence, PQ + QR ≠ 5 cm
Question 7.
The construction of a ΔABC in which AB = 7 cm, ∠A = 75° is possible when (BC – AC) is equal to
A. 7.5 cm
B. 7 cm
C. 8 cm
D. 6.5 cm
Answer:
For any triangle the length of each side of any triangle is greater than the difference between the lengths of the other two sides. So, BC – AC should be less than 7 cm. Hence, BC – AC = 6.5 cm
Question 8.
The construction of a ΔABC in which BC = 6 cm and ∠B = 50° is not possible when (AB – AC) is equal to
A. 5.6 cm
B. 5 cm
C. 6 cm
D. 4.8 cm
Answer:
For any triangle the length of each side of any triangle is greater than the difference between the lengths of the other two sides. So, AB – AC should be less than 6 cm. Hence, AB – AC ≠ 6 cm
Question 9.
Is it possible to construct a triangle whose sides measure 7 cm, 5 cm and 12 cm?
A. Yes
B. No
Answer:
For any triangle the length of each side of any triangle is greater than the difference between the lengths of the other two sides. Here, 12 – 7 = 5 cm this is equal to the length of the third side. Hence, such triangle is not possible.
Question 10.
Is it possible to construct a triangle whose sides measure 6 cm, 5 cm and 10 cm?
A. Yes
B. No
Answer:
For any triangle sum of the lengths of two sides is always greater than the length of third side.
The lengths of the sides are 5 cm, 6 cm, 10 cm.
(a) 5 cm + 6 cm > 10 cm.
(b) 6 cm + 10 cm > 5 cm.
(c) 5 cm + 10 cm > 6cm.
Hence, a triangle with these sides is possible.
Question 11.
Is it possible to construct a ΔABC in which BC = 5 cm, ∠B = 120° and ∠C = 60° ?
A. Yes
B. No
Answer:
For any triangle the sum of the angles is equal to 180°. Here, ∠ B + ∠ C = 120° + 60° = 180° which means ∠ A=0°. Hence, such triangle is not possible.
Question 12.
Is it possible to construct a ΔABC in which ∠A = 60, ∠B = 70° and ∠C = 60° ?
A. Yes
B. No
Answer:
For any triangle the sum of the angles is equal to 180°. Here, ∠ A + ∠ B + ∠ C = 60° + 70° + 60° =190°.
Hence, such triangle is not possible.
Question 13.
Is it possible to construct an angle of 35° using ruler and compass only?
A. Yes
B. No
Answer:
Hence, 35° cannot be constructed.
Question 14.
Is it possible to construct an angle of 67.5° using ruler and compass only?
A. Yes
B. No
Answer:
Hence, 67.5° can be constructed.
Formative Assessment (unit Test)
Question 1.Is it possible to construct a ΔABC in which BC = 5 cm, ∠B = 60°, ∠C = 60°?
A. Yes
B. No
Answer:
Any triangle can be constructed with any value of two angles and length of the side included within them.
As can be seen from the figure, it is obviously possible to construct any ∆ABC with given two angles and the side included with them.
So, the correct option is (A)
Question 2.
Is it possible to construct a ΔABC in which AB = 5 cm, BC = 5 cm and AC = 10 cm?
A. Yes
B. No
Answer:
For any triangle sum of the lengths of two sides is always greater than the length of third side.
Here, 5 cm + 5 cm = 10 cm.
Hence, a triangle with these sides is not possible.
Question 3.
Is it possible to construct an angle of 75° using ruler and compass only?
A. Yes
B. No
Answer:
Hence, 75° can be constructed.
Question 4.
Construct a ΔABC whose perimeter is 12 cm and whose base angles are 45° and 60°.
Answer:
Step 1: Draw the line segment PQ = 12cm
Step 2: Construct the base angles at P and Q i.e. <XPQ=45° and <YQP=60°
Step 3: Bisect <XPQ and <YQP to meet at A
Step 4: Perpendicularly bisect AP and AQ to meet the bases at B and C respectively
Step 5: Join AB and AC to get the required triangle
So, ∆ABC is the required triangle
AB+BC+BC = 12cm
Base angles <ABC=45° and <ACB=60°
Question 5.
Construct a ΔABC whose perimeter is 15 cm and sides are in the ratio 3 : 4 : 5.
Answer:
The sides of the triangle are in the ratio 3:4:5
Now, 3+4+5 = 12
Step 1: Construct PQ = 15cm
Step 2: We have to divide PQ into 12 equal parts and consider the 1st three, the next four and the last five seperately for construction
A line inclined with any arbitary angle with the line PQ is drawn with the help of scale and pencil.
12 equal parts are taken with the help of compass and after joining the end points of both the lines, parallel lines are drawn with the help of pencil and set squares.
The line PQ is thus equally divided and points B and C are named.
Step 3: Arcs with B as centre and PB as radius and C as centre and CD as radius are intersected at A.
A,B and A,C is joined to yield the required triangle.
∆ABC is the required triangle with AB:BC:AC = 3:4:5
PQ = 15cm
AB+BC+AC = 15cm
Question 6.
Construct an isosceles triangle whose base is 6 cm and whose vertical angle is 75°.
Answer:
Step 1: Construction of 75° and 90° is shown separately.
Here, <DAP = 75° and <DAE = 90°
Step 2: The base of the triangle BC is drawn equalling to 6cm
Step 3: An angle of 75° is constructed on the lower side of BC in a method shown previously
Step 4: Construct a right angle on the line BC’
Step 5: Construct the perpendicular bisector of BC to meet the previously constructed perpendicular at O
Step 6: A circle is constructed with centre O and radius OB to meet the perpendicular bisector at A.
A,B and A,C are joined.
∆ABC is the required figure
BC = 6cm
AB = AC
The vertical angle <BAC = 75°
Question 7.
Draw a right-angled triangle having hypotenuse = 6 cm and one of the sides containing the right angle having length 4.5 cm.
Answer:
Step 1: Construct the base = 4.5 cm
Step 2: Construct a right angle at Y
Step 3: Cut off a length of 6cm from point Z on the perpendicular to yield the point X
∆XYZ is the required right-angled triangle
YZ = 4.5cm
Hypotenuse XZ = 6cm
Question 8.
Construct a ΔABC in which ∠B = 60°, ∠C = 45° and the length of perpendicular from vertex A to base BC as 5 cm.
Answer:
Step 1: The perpendicular AD is taken as the base and the 5cm length is constructed.
Step 2: An angle of 45° is constructed at A to form <XAC and 60° to form <YAB
The points C and B fall on the line perpendicular through D
∆ABC is the required triangle
<B = 60°
<C = 45°
AD = 5cm
Question 9.
Construct an angle of 
Answer:
Step 1: Construct a line segment or arbitrary length an take an semi-circular arc on the line
Step 2: Taking the same radius, an arc is cut on the semi-circular arc to give 60°
Step 3: This 60° is further bisected and the lower 30° is bisected again to yield 15°
Step 4: The upper 15° is bisected to give 7.5°
<BAY = 22.5°
Question 10.
Construct an angle of 135°.
Answer:
Step 1: Construct a line segment or arbitrary length an take an semi-circular arc on the line
Step 2: Two arcs of the same radius are cut on the semicircle
Step 3: The last 60° is divided twice to give 15°
<BAZ = 135°
Question 11.
Construct an equilateral triangle of side 5 cm.
Answer:
Step 1: Construct the base of the triangle equalling 5cm
Step 2: Taking the same length as radius cut arcs centred at B and C to meet at A
∆ABC is the required triangle with AB=BC=CA=5cm
Question 12.
Construct a square of side 4 cm.
Answer:
Step 1: Construct base = 4cm
Step 2: An angle of 90° is constructed at A and 4cm length is cut off
Step 3: Arcs of radius 4cm with centres at D and B are cut off and the point of intersection A is joined with D and B
ABCD is the required square with AB=BC=CD=DA=4cm
Question 13.
Draw a line segment AB of length 5.2 cm and construct the perpendicular bisector of AB.
Answer:
Step 1: A line segment AB of length 5.2cm is constructed
Step 2: Arc radius of any arbitrary length is taken in compass and arcs are cut off centring at A and B on both sides of the line segment and joined to get the required perpendicular bisector
AB = 5.2cm
ML is the perpendicular bisector of AB
Question 14.
Construct an angle of 60° and bisect it.
Answer:
Step 1: Construct a line segment or arbitrary length an take an semi-circular arc on the line
Step 2: Taking the same radius, an arc is cut on the semi-circular arc to give 60°
Step 3: The 60° thus formed is bisected by taking any arbitrary radius and cutting of arcs centring at the two intersection points to yield a 3rd intersection
<MAB = 60°
Step 4: The deeper point of intersection is joined with point A and thus the angle is bisected to give 30°
<MAB = 60°
<NAB = 30°
Question 15.
Construct a ΔABC in which base BC = 5.2 cm, ∠B = 60° and (AB + AC) = 7.6 cm.
Answer:
Step 1: Base BC of length 5.2cm is constructed
Step 2: Construct an angle of 60° at B
Step 3: Cut off BD = 7.6cm on this ray of the angle and join points D and C
Step 4: An angle equal to <BDC is constructed at C and the ray meets the line segment BD at A to give the required triangle
∆ABC is the required triangle.
BC = 5.2cm
BD = BA+AD = BA+AC = 7.6cm
<ABC = 60°
Question 16.
Construct a square each of whose sides measures 3.2 cm.
Answer:
Step 1: Construct base = 3.2cm
Step 2: An angle of 90° is constructed at A and 3.2cm length is cut off
Step 3: Arcs of radius 3.2cm with centres at D and B are cut off and the point of intersection A is joined with D and B
ABCD is the required square with AB=BC=CD=DA=3.2cm
Question 17.
Construct a ΔABC in which base BC = 4.8 cm, ∠B = 45° and (AB – AC) = 2.5 cm.
Answer:
Step 1: The base BC = 4.8cm is constructed
Step 2: An angle of 45° is constructed at B
Step 3: 2.5cm length BD is cut off from the ray and points D and C are joined
Step 4: An angle equal to the exterior angle of D is constructed at C and the two rays are made to join at point A
∆ABC is the required triangle
BC = 4.8cm
BD = AB-AD = AB-AC = 2.5cm
<B = 45°