Construction Of Quadrilaterals
Class 8th Mathematics RS Aggarwal Solution
- Construct a quadrilateral ABCD in which AB= 4.2cm, BC= 6cm, CD=5.2cm, DA=5cm…
- Construct a quadrilateral PQRS in which PQ=5.4cm, QR=4.6cm, RS=4.3cm, SP= 3.5cm…
- Construct a quadrilateral ABCD in which AB=3.5cm, BC=3.58cm, CD=DA=4.5 cm and…
- Construct a quadrilateral ABCD in which AB=3.6cm, BC=3.3cm, AD=2.7cm, diagonal…
- Construct a quadrilateral PQRS in which QR=7.5cm, PR=PS=6cm, RS=5cm, QS=10cm.…
- Construct a quadrilateral ABCD in which AB=3.4cm, CD= 3cm, DA=5.7cm, AC=8cm and…
- Construct a quadrilateral ABCD in which AB=BD=3.5cm, AD=CD=5.2 and ∠ABC=120o…
- Construct a quadrilateral ABCD in which AB=2.9cm, BD=3.2cm, CD=2.7cm, DA=3.4cm…
- Construct a quadrilateral ABCD in which AB=3.5cm, BC=5cm, CD=4.6cm, ∠B = 125°…
- Construct a quadrilateral PQRS in which PQ=6cm, QR=5.6cm, RS=2.7cm, ∠Q = 45°…
- Construct a quadrilateral ABCD in which AB=5.6cm, BC=4cm, ∠A= 50°, ∠B = 105°…
- Construct a quadrilateral PQRS in which PQ=5cm, QR=6.5cm, ∠P = ∠R = 100° and…
- Construct a quadrilateral ABCD in which AB=4cm, AC=5cm, AD=5.5cm and ∠ABC…
- Construct a parallelogram ABCD in which AB=5.2cm, BC=4.7cm and AC=7.6cm.…
- Construct a parallelogram ABCD in which AB=4.3cm, AD=4cm and BD=6.8cm.…
- Construct a parallelogram PQRS in which QR=6cm, PQ=4cm and ∠PQR = 60°.…
- Construct a parallelogram ABCD in which BC=5cm, ∠BCD = 120° and CD=4.8cm.…
- Construct a parallelogram, one of whose sides are 4.4 cm and whose diagonal are…
- Construct a parallelogram ABCD in which AB=6.5cm, AC=3.4cm and the altitude AL…
- Construct a parallelogram ABCD, in which diagonal AC=3.8cm, diagonal BD=4.6cm…
- Construct a rectangle ABCD whose adjacent sides are 11 cm and 8.5 cm.…
- Construct a square, each of whose sides measures 6.4 cm.
- Construct a square, each of whose diagonals measures 5.8 cm.
- Construct a rectangle PQRS in which qr = 3.6 cm and diagonal pr = 6 cm.…
- Construct a rhombus the lengths of whose diagonals are 6 cm and 8 cm.…
- Construct a rhombus ABCD in which AB=4cm and diagonal AC is 6.5 cm.…
- Draw a rhombus whose side is 7.2 cm and one angle is 60°.
- Construct a trapezium ABCD in which AB=6cm, BC=4cm, CD=3.2cm, ∠B = 75° and…
- Draw a trapezium ABCD in which AB||DC, AB=7cm, BC=5cm, AD=6.5cm and ∠B = 60°.…
- Define the terms: i. Open curve ii. Closed curve iii. Simple closed curve…
- The angels of a quadrilateral are in the ration 1:2:3:4. Find the measure of each…
- Two adjacent angles of a parallelogram are the ration 2:3. Find the measure of each of…
- The sides of rectangle are in the ration 4:5 and its perimeter is 180 cm. Find its…
- Prove that the diagonals of a rhombus bisect each other at right angles.…
- The diagonals of a rhombus are 16 cm and 12 cm. Find the length of each side of the…
- Two opposite angles of a parallelogram are (3x-2)o and (50-x)o. The measures of all its…
- The angles of quadrilateral are in the ration 1:3:7:9. The measure of the largest angle…
- The length of a rectangle is 8 cm and each of its diagonals measures 10 cm. The breadth…
- In a square PQRS, if PQ=(2x+3) and QR=(3x-5) cm thenA. x=4 B. x=5 C. x=6 D. x=8…
- The bisectors of two adjacent angles of a parallelogram intersect atA. 30° B. 45° C.…
- How many diagonals are there in a hexagon?A. 6 B. 8 C. 9 D. 10
- Each interior angle of a polygon is 135. How many sides does it have?A. 10 B. 8 C. 6…
- For a convex polygon of n sides, we have: i. Sum of all exterior angles = ...... . ii.…
- For a regular polygon of n sides, we have: i. Sum of all exterior angles = ...... .…
- i. Each interior angles of a regular octagon is (l ....)^0 ii. The sum of all interior…
- Write ‘T’ for true and ‘F’ for false of each of the following: i. The diagonals of a…
- Construct a quadrilateral PQRS in which PQ = 4.2 cm, ∠PQR = 60°, ∠QPS = 120, QR = 5cm…
Exercise 17a
Question 1.Construct a quadrilateral ABCD in which AB= 4.2cm, BC= 6cm, CD=5.2cm, DA=5cm and AC= 8 cm.
Answer:
Given :
AB = 4.2 cm , BC = 6 cm , CD = 5.2 cm , DA = 5 cm , AC = 8 cm ,
Construction :
Step 1 : Draw segment AB of length 4.2 cm.
Step 2 : Taking A as centre draw an arc of radius 8 cm.
Step 3 : Taking B as centre draw an arc of radius 6 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is C.
Step 4 : Join AC and BC.
Step 5 : Taking A as centre draw an arc of radius 5 cm.
Step 6 : Taking C as centre draw an arc of radius 5.2 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is D.
Step 7 : Join AD and CD.
ABCD is the required quadrilateral.
Question 2.
Construct a quadrilateral PQRS in which PQ=5.4cm, QR=4.6cm, RS=4.3cm, SP= 3.5cm and diagonal PR=4cm.
Answer:
Given :
PQ = 5.4 cm , QR = 4.6 cm , RS = 4.3 cm , SP = 3.5 cm , PR = 4 cm.
Construction :
Step 1 : Draw segment PQ of length 5.4 cm.
Step 2 : Taking P as centre draw an arc of radius 4 cm.
Step 3 : Taking Q as centre draw an arc of radius 4.6 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is R.
Step 4 : Join PR and QR.
Step 5 : Taking P as centre draw an arc of radius 3.5 cm.
Step 6 : Taking R as centre draw an arc of radius 4.3 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is S.
Step 7 : Join PS and RS.
PQRS is the required quadrilateral.
Question 3.
Construct a quadrilateral ABCD in which AB=3.5cm, BC=3.58cm, CD=DA=4.5 cm and diagonal BD=5.6cm.
Answer:
Given :
AB = 3.5 cm , BC = 3.58 cm , CD = DA = 4.5 cm , BD = 5.6 cm.
Construction :
Step 1 : Draw segment AB of length 3.5 cm.
Step 2 : Taking A as centre draw an arc of radius 4.5 cm.
Step 3 : Taking B as centre draw an arc of radius 5.6 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is D.
Step 4 : Join AD and BD.
Step 5 : Taking B as centre draw an arc of radius 3.58 cm.
Step 6 : Taking D as centre draw arc of radius 4.5 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is C.
Step 7 : Join BC and CD.
ABCD is the required quadrilateral.
Question 4.
Construct a quadrilateral ABCD in which AB=3.6cm, BC=3.3cm, AD=2.7cm, diagonal AC=4.6cm and diagonal BD=4cm.
Answer:
Given :
AB = 3.6 cm , BC = 3.3 cm , AD = 2.7 cm , AC = 4.6 cm , BD = 4 cm.
Construction :
Step 1 : Draw segment AB of length 3.6 cm.
Step 2 : Taking A as centre draw an arc of radius 2.7 cm.
Step 3 : Taking B as centre draw an arc of radius 4 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is D.
Step 4 : Join AD and BD.
Step 5 : Taking A as centre draw an arc of radius 4.6 cm.
Step 6 : Taking B as centre draw an arc of radius 3.3 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is C.
Step 7 : Join BC , AC and CD.
ABCD is the required quadrilateral.
Question 5.
Construct a quadrilateral PQRS in which QR=7.5cm, PR=PS=6cm, RS=5cm, QS=10cm. Measure the fourth side.
Answer:
Given :
QR = 7.5 cm , PR = PS = 6 cm , RS = 5 cm , QS = 10 cm.
Construction :
Step 1 : Draw segment QR of length 7.5 cm.
Step 2 : Taking Q as centre draw an arc of radius 10 cm.
Step 3 : Taking R as centre draw an arc of radius 5 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is S.
Step 4 : Join QS and SR.
Step 5 : Taking R as centre draw an arc of radius 6 cm.
Step 6 : Taking S as centre draw an arc of radius 6 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is P.
Step 7 : Join PQ , PR and PS.
PQRS is the required quadrilateral.
Step 8 : Measure length of PQ .
Length of fourth side PQ = 4.7 cm.
Question 6.
Construct a quadrilateral ABCD in which AB=3.4cm, CD= 3cm, DA=5.7cm, AC=8cm and BD=4cm.
Answer:
Given :
AB = 3.4 cm , CD = 3 cm , DA = 5.7 cm , AC = 8 cm , BD = 4 cm.
Construction :
Step 1 : Draw segment AB of length 3.4 cm.
Step 2 : Taking A as centre draw an arc of radius 5.7 cm.
Step 3 : Taking B as centre draw an arc of radius 4 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is D.
Step 4 : Join AD and BD.
Step 5 : Taking A as centre draw an arc of radius 8 cm.
Step 6 : Taking D as centre draw arc of radius 3 cm, which cuts the arc drawn in step 5. Point of intersection of two arcs is C.
Step 7 : Join CD , AC and BC.
ABCD is the required quadrilateral.
Question 7.
Construct a quadrilateral ABCD in which AB=BD=3.5cm, AD=CD=5.2 and ∠ABC=120o
Answer:
Given :
AB = BD = 3.5 cm , AD = CD = 5.2 cm , 
Construction :
Step 1 : Draw segment AB of length 3.5 cm.
Step 2 : Taking A as centre draw an arc of radius 5.2 cm.
Step 3 : Taking B as centre draw an arc of radius 3.5 cm, which cuts the arc drawn in step 2. Point of intersection of two arcs is D.
Step 4 : Join AD and BD.
Step 5 : Draw angle ABC of 120 degrees.
Step 6 : Taking B as centre draw an arc of radius 5.2 cm, which cuts the segment BP. Point of intersection is C.
Step 7 : Join CD
ABCD is the required quadrilateral.
Question 8.
Construct a quadrilateral ABCD in which AB=2.9cm, BD=3.2cm, CD=2.7cm, DA=3.4cm and ∠A = 70°.
Answer:
Given :
AB = 2.9 cm , AC = 3.2 cm , CD = 2.7 cm , DA = 3.4 cm , 
Construction :
Step 1 : Draw segment AB of length 2.9 cm.
Step 2 : Draw angle A of 70 degrees.
Step 3 : Taking A as centre draw an arc of radius 3.4 cm, which cuts the segment BP. Point of intersection is D.
Step 4 : Taking A as centre draw an arc of radius 3.2 cm.
Step 5 : Taking D as centre draw arc of radius 2.7 cm, which cuts the arc drawn in step 4. Point of intersection is C.
Step 6 : Join CD, AC and BC.
ABCD is the required quadrilateral.
Question 9.
Construct a quadrilateral ABCD in which AB=3.5cm, BC=5cm, CD=4.6cm, ∠B = 125° and ∠C = 60°.
Answer:
Given :
AB = 3.5 cm , BC = 5 cm , CD = 4.6 cm , 
, 
Construction :
Step 1 : Draw segment AB of length 3.5 cm.
Step 2 : Draw angle B of 125 degrees.
Step 3 : Taking B as centre draw arc of radius 5 cm which cuts the segment BP. Point of intersection is C.
Step 4 : Draw angle C of 60 degrees.
Step 5 : Taking C as centre draw arc of radius 4.6 cm which cuts the segment CG. Point of intersection is D.
Step 6 : Join AD.
ABCD is the required quadrilateral.
Question 10.
Construct a quadrilateral PQRS in which PQ=6cm, QR=5.6cm, RS=2.7cm, ∠Q = 45° and ∠R = 90°.
Answer:
Given :
PQ = 6 cm , QR = 5.6 cm , RS = 2.7 cm , 
, 
Construction :
Step 1 : Draw segment PQ of length 6 cm.
Step 2 : Draw angle Q of 45 degrees.
Step 3 : Taking Q as centre draw arc of radius 5.6 cm which cuts the segment BX. Point of intersection is R.
Step 4 : Draw angle R of 90 degrees.
Step 5 : Taking R as centre draw arc of radius 2.7 cm which cuts the segment RY. Point of intersection is S.
Step 6 : Join PS.
PQRS is the required quadrilateral.
Question 11.
Construct a quadrilateral ABCD in which AB=5.6cm, BC=4cm, ∠A= 50°, ∠B = 105° and ∠D = 80°.
Answer:
Sum of all the angles of a quadrilateral is 360°.
∠A + ∠B + ∠C + ∠D = 360°
50° + 105° + ∠C + 80° = 360°
235° + ∠C = 360°
∠C = 360° - 235°
∠C = 125°
Construction:
1) Draw a line AB = 5.6 cm
2) At point A, Draw an ∠XAB = 50° with the help of a protector.
3) At point B, Draw an ∠YBA = 105° with the help of a protector.
4) With B as center, draw an arc of 4 cm which intersects the BY at C.
5) At point C, Draw ∠BCD = 125° such that D is a point on line AX.
Question 12.
Construct a quadrilateral PQRS in which PQ=5cm, QR=6.5cm, ∠P = ∠R = 100° and ∠S = 75° .
Answer:
Given :
PQ = 5 cm , QR = 6.5 cm , 
, 
, 
Answer :
Sum of all angles of a quadrilateral is 360
Construction :
Step 1 : Draw segment PQ of length 5 cm.
Step 2 : Draw angle PQC of 85 degrees.
Step 3 : Taking Q as centre draw arc of radius 6.5 cm which cuts the segment QC. Point of intersection is R.
Step 4 : Draw angle QRF of 100 degrees.
Step 5 : Draw angle QPG of 100 degrees.
Step 6 : Point of intersection of segments PG and RF is S
PQRS is the required quadrilateral.
Question 13.
Construct a quadrilateral ABCD in which AB=4cm, AC=5cm, AD=5.5cm and ∠ABC =∠ACD = 90°.
Answer:
Given :
AB = 4 cm , AC = 5 cm , AC = 5.5 cm 
.
Construction :
Step 1 : Draw segment AB of length 4 cm.
Step 2 : Draw angle ABP of 90 degrees.
Step 3 : Taking A as centre draw arc of radius 5 cm which cuts the segment BP. Point of intersection is C.
Step 4 : Join AC.
Step 5 : Draw angle ACD of 90 degrees.
Step 6 : Taking A as centre draw arc of radius 5.5 cm which cuts the segment CF. Point of intersection is D.
Step 4 : Join AD.
ABCD is the required quadrilateral.
Exercise 17b
Question 1.Construct a parallelogram ABCD in which AB=5.2cm, BC=4.7cm and AC=7.6cm.
Answer:
STEP 1: At first draw a base line of 5.2 cm by scale.
STEP 2: Then from point A draw an arc of radius 7.6 cm and from point B draw an arc of radius 4.7 cm with the help of compass. The intersecting point of both the arcs is C. Join AC and BC.
STEP 3: Now from point A draw an arc of radius 4.7 cm and from point C draw an arc of radius 5.2 cm with the help of compass. The intersecting point of both the arcs is D. Join AD and CD.
Question 2.
Construct a parallelogram ABCD in which AB=4.3cm, AD=4cm and BD=6.8cm.
Answer:
STEP 1: At first draw a base line of 4.3 cm by scale.
STEP 2: Then from point A draw an arc of radius 4 cm and from point B draw an arc of radius 6.8 cm with the help of compass. The intersecting point of both the arcs is D. Join AD and BD.
STEP 3: Now, from point D draw an arc of radius 4.3 cm and from point B draw an arc of radius 4 cm with the help of compass. The intersecting point of both the arcs is C. Join BC and DC.
Question 3.
Construct a parallelogram PQRS in which QR=6cm, PQ=4cm and ∠PQR = 60°.
Answer:
STEP 1: At first draw a base line of 4 cm by scale.
STEP 2: Then draw a 6 cm line from Q at an angle of 600 with the help of protractor. That point is R.
STEP 3: Now, from point P draw an arc of radius 6 cm and from point R draw an arc of radius 4 cm with the help of compass. The intersecting point of both the arcs is S. Join PS and RS.
Question 4.
Construct a parallelogram ABCD in which BC=5cm, ∠BCD = 120° and CD=4.8cm.
Answer:
STEP 1: At first draw a base line of 5 cm by scale.
STEP 2: Then draw a 4.8 cm line from C at an angle of 1200 with the help of protractor. That point is D.
STEP 3: Now, from point B draw an arc of radius 4.8 cm and from point D draw an arc of radius 5 cm with the help of compass. The intersecting point of both the arcs is A. Join BA and DA.
Question 5.
Construct a parallelogram, one of whose sides are 4.4 cm and whose diagonal are 5.6 cm and 7 cm. Measure the other side.
Answer:
STEP 1: At first draw a base line of 4.4 cm by scale.
STEP 2: From any point of AB, let it be M, draw a perpendicular to AB by protractor.
STEP 3: Then from any point of the perpendicular line, let N draw another perpendicular line to this line i.e., parallel to AB by protractor.
STEP 4: Now, from A draw an arc of radius 5.6 cm on the 2nd perpendicular at point C and from B draw an arc of radius 7 cm on the 2nd perpendicular at point D with the help of compass. Join AD and BC.
ABCD is the required parallelogram.
Question 6.
Construct a parallelogram ABCD in which AB=6.5cm, AC=3.4cm and the altitude AL from A is 2.5 cm. Draw the altitude from C and measure it.
Answer:
STEP 1: At first draw a base line of 6.5 cm by scale.
STEP 2: Then draw a line perpendicular to AB from A with the help of protractor.
STEP 3: Then from A draw an arc of radius 2.5 cm on the perpendicular line. That intersecting point is L.
STEP 4: Then from L draw a perpendicular line with respect to AL.
STEP 5: Now from A draw an arc of radius 3.4 cm on the new line perpendicular to AL. That point is C.
STEP 6: From C draw an arc of radius 6.5 cm on the perpendicular line CL. That intersecting point is D.
STEP 7: Join AD and BC.
According to the problem, AL = 2.5 cm which is the altitude from point A. Similarly from point C altitude is CM which is of same length of AL = 2.5 cm.
Question 7.
Construct a parallelogram ABCD, in which diagonal AC=3.8cm, diagonal BD=4.6cm and the angle between AC and BC is 60°.
Answer:
STEP 1: At first draw the diagonal AC of 3.8 cm.
STEP 2: Now from the centre of AC (let M), draw a perpendicular line.
STEP 3: From C draw a 600 angle downward with the help of protractor. The intersection point between the line and the perpendicular is B.
STEP 4: From B draw an arc of radius 4.6 cm on the perpendicular line. The intersecting point is D. Join AD, CD and AB.
Question 8.
Construct a rectangle ABCD whose adjacent sides are 11 cm and 8.5 cm.
Answer:
STEP 1: At first draw a base line of 11 cm by scale.
STEP 2: Then draw a line perpendicular to AB from point B. And cut an arc of radius 8 cm from B. The intersection point is C.
STEP 3: Now from A draw an arc of radius 8.5 cm and from C draw an arc of radius 11 cm intersecting at same point. That point is D. Join AD and CD.
Question 9.
Construct a square, each of whose sides measures 6.4 cm.
Answer:
STEP 1: At first draw a base line of 6.4 cm by scale.
STEP 2: Then draw a line perpendicular to AB from point B. And cut an arc of radius 6.4 cm from B. The intersection point is C.
STEP 3: Now, from A draw an arc of radius 6.4 cm and from C draw an arc of radius 6.4 cm intersecting at same point. That point is D. Join AD and CD.
Question 10.
Construct a square, each of whose diagonals measures 5.8 cm.
Answer:
STEP 1: At first draw a diagonal of 5.8 cm by scale.
STEP 2: Then draw a perpendicular bisector of AB. Let, centre of AB is M.
STEP 3: Then draw arcs of radius 2.9 cm from M on both the sides of the perpendicular line.
STEP 4: Join AD, DB, BC and CA.
Here ADBC is the square.
Question 11.
Construct a rectangle PQRS in which 
cm and diagonal 
cm. Measure the other side of the rectangle.
Answer:
STEP 1: At first draw a base line of 3.6 cm.
STEP 2: Draw a perpendicular line to QR from Q.
STEP 3: Now from R draw an arc of radius 6 cm on the perpendicular line by compass. The intersecting point is P.
STEP 4: Join PQ. This is the other side of the rectangle. Measure its size with scale.
By measuring the length of PQ by scale, we get, PQ = 4.8 cm.
STEP 5: Draw an arc of radius 3.6 cm from P and draw an arc of radius 4.8 cm from R, intersecting at a same point. This point is S. Join PS and RS.
Question 12.
Construct a rhombus the lengths of whose diagonals are 6 cm and 8 cm.
Answer:
STEP 1: At first draw a base line of 8 cm.
STEP 2: Draw a perpendicular bisector of AB. Let, M be the centre of AB.
STEP 3: Then draw arcs of radius 3 cm from M on both the sides of the perpendicular line with the help of compass.
STEP 4: Join AD, DB, BC and CA.
ADBC is the rhombus.
Question 13.
Construct a rhombus ABCD in which AB=4cm and diagonal AC is 6.5 cm.
Answer:
STEP 1: At first draw diagonal of 6.5 cm.
STEP 2: Then from both the points A and C draw arc of radius 4 cm intersecting at same points, both the sides. Join the two intersecting points from A and C.
ABCD is the rhombus.
Question 14.
Draw a rhombus whose side is 7.2 cm and one angle is 60°.
Answer:
STEP 1: At first draw a base line of 7.2 cm.
STEP 2: Draw a 7.2 cm straight line from A at an angle of 600 with the help of protractor and scale.
STEP 3: Now from D and B both the points, draw arcs of radius of 7.2 cm, intersecting at a same point. That point is C. Join BC and DC.
This is the rhombus ABCD.
Question 15.
Construct a trapezium ABCD in which AB=6cm, BC=4cm, CD=3.2cm, ∠B = 75° and DC||AB.
Answer:
STEP 1: At first draw a base line of 6 cm by scale.
STEP 2: Then draw a 4 cm straight line from B at an angle of 750 by protractor and scale. That point is C
STEP 3: Now draw a line parallel to AB from C.
Draw an arc of radius of 3.2 cm from point C on the straight line.
STEP 4: Join AD.
This is the trapezium ABCD.
Question 16.
Draw a trapezium ABCD in which AB||DC, AB=7cm, BC=5cm, AD=6.5cm and ∠B = 60°.
Answer:
STEP 1: At first draw a base line of 7 cm.
STEP 2: Then from B draw a 5 cm straight line at an angle of 600 by protractor and scale. That point is C.
STEP 3: Now draw a line parallel to AB from C.
STEP 4: Cut 6.5 cm from point A on the straight line parallel to AB. That point is D. Join AD.
This is the trapezium ABCD.
Cce Test Paper-17
Question 1.Define the terms:
i. Open curve
ii. Closed curve
iii. Simple closed curve
Answer:
(i) Open Curve – Curves whose beginning and end points are different are called as Open Curve.
Begin Point
End Point
(ii) Closed Curve – Curves whose beginning and end points are same but crosses itself are called as Closed Curve.
(iii) Simple Closed Curve – Curves whose beginning and end points are same and does not cross itself are called as Simple Closed Curve.
Question 2.
The angels of a quadrilateral are in the ration 1:2:3:4. Find the measure of each angle.
Answer:
36o,72o,108o,144o
Let x be the common multiple.
As per question,
A = x
B = 2x
C = 3x
D = 4x
As we know that, Sum of all four angles of quadrilateral is 360o.
A + B + C + D = 360°
x + 2x + 3x + 4x = 360°
10x = 360°
X= 360/10
= 36°
A = 1 X 36° = 36°
B = 2 X 36° = 72°
C = 3 X 36° = 108°
D = 4 X 36° = 144°
So, Angles of quadrilateral are 36°, 72°, 108° and 144°.
Question 3.
Two adjacent angles of a parallelogram are the ration 2:3. Find the measure of each of its angles.
Answer:
A = 72°,B = 108°,C = 72°,D = 108°
Let x be the common multiple.
As per question,
A = 2x
B = 3x
C = 2x
D = 3x
A + B = 180° (Adjacent angles of parallelogram is supplementary)
2x + 3x = 180°
5x = 180°
X = 180 / 5 = 36°
A = 2 × 36° = 72°
B = 3 × 36° = 108°
C = 2 × 36° = 72°
D = 3 × 36° = 108°
So, Angles of quadrilateral are 72°, 108°, 72° and 108°.
Question 4.
The sides of rectangle are in the ration 4:5 and its perimeter is 180 cm. Find its sides.
Answer:
40 cm, 50 cm
Let x be the common multiple.
As per question,
Length = 4x
Width = 5x
As per formula,
Perimeter = 2× (l + w)
180 = 2× (4x + 5x)
180 = 18x
x = 10
So,
Length = 40 cm
Width = 50 cm
Question 5.
Prove that the diagonals of a rhombus bisect each other at right angles.
Answer:
Let ABCD be a rhombus whose diagonal AC and BD intersect at the point O.
As we know that the diagonals of a parallelogram bisect each other and rhombus is a parallelogram.
So, OA=OC and OB=OD.
From ∆ COB and ∆ COD we get,
CB = CD (sides of rhombus) and
CO is common in both the triangles.
So, OB = OD
Therefore, by SSS theorem.
∆ COB ≅ ∆ COD
COB = COD
COB + COD = 180° (Linear pair of angles)
Thus, COB = COD = 90°
Hence, the diagonals of a rhombus bisect each other at right angles.
Question 6.
The diagonals of a rhombus are 16 cm and 12 cm. Find the length of each side of the rhombus.
Answer:
10 cm
Rhombus forms four congruent right triangles.
Sides of each triangle will be half of rhombus diagonals. i.e. 16/2 = 8 cm and 12/2 = 6 cm
According to Pythagoras theorem,
a2 = b2 + c2
a2 = 82 + 62
a = √ (82+62)
a = √ (64+36)
a = √ 10
a = 10 cm
So, Sides of rhombus is 10cm.
Question 7.
Two opposite angles of a parallelogram are (3x-2)o and (50-x)o. The measures of all its angles are
A. 97°, 83°, 97°, 83°
B. 37°, 143°, 37°, 143°
C. 76°, 104°, 76°, 104°
D. none of these
Answer:
To Find: All angles of a parallelogram
Given: Opposite angles are (3x - 2) and (50 - x)
Diagram:
Let the parallelogram be ABCD, and opposite angles be ∠B and ∠D, such that
∠A = (3x - 2)
∠C = (50 - x)
∠B = ∠D (Opposite angles of a parallelogram are equal)
3x - 2 = 50 - x3x + x = 50 + 2
4x = 52°
x = 13°
Putting the value of x, we get,∠B = 3(13) - 2 = 37°
∠D = 50 - 13 = 37°
Also.
∠A = ∠C (Opposite angles of a parallelogram are equal)
By angle sum property of quadrilateral,
∠A + ∠B + ∠C + ∠D = 360°
37° + ∠A + 37° + ∠C = 360°
2∠A + 74 =360°
2∠A = 286°
∠A = 143°
Hence,
∠A = ∠C =143°
So, Angles of parallelogram is 37°, 143°, 37° and 143°.
Question 8.
The angles of quadrilateral are in the ration 1:3:7:9. The measure of the largest angle is
A. 63°
B. 72°
C. 81°
D. none of these
Answer:
Let x be the common multiple.
As per question,
A = x
B = 3x
C = 7x
D = 9x
As we know that, Sum of all four angles of quadrilateral is 360o.
A + B + C + D = 360°
x + 3x + 7x + 9x = 360°
20x = 360°
X= 360/20
= 18°
A = 1 × 18° = 18°
B = 3 × 18° = 54°
C = 7 × 18° = 126°
D = 9 × 18° = 162°
So, largest angle of quadrilateral is 162°.
Question 9.
The length of a rectangle is 8 cm and each of its diagonals measures 10 cm. The breadth of the rectangle is
A. 5 cm
B. 6 cm
C. 7 cm
D. 9 cm
Answer:
A rectangle can be divided into two triangles.
Sides of each triangle will be 8cm and 10 cm.
According to Pythagoras theorem,
a2 = b2 + c2
102 = 82 + c2
c = √ (102 – 82)
c = 
c = 6 cm
So, breadth of rectangle is 6 cm.
Question 10.
In a square PQRS, if PQ=(2x+3) and QR=(3x-5) cm then
A. x=4
B. x=5
C. x=6
D. x=8
Answer:
As we know that, all sides of square are equal.
So, according to question,
2x + 3 = 3x -5
X = 8.
So, Sides of square is 8 cm.
Question 11.
The bisectors of two adjacent angles of a parallelogram intersect at
A. 30°
B. 45°
C. 60°
D. 90°
Answer:
Let ABCD is a parallelogram.
The angle bisectors AE and BE of adjacent angles A and B meet at E.
AD || BC (Opposite sides of ||gm)
∠DAB + ∠CBA = 180°
2∠EAB + 2∠EBA = 180° (sum of the interior angles, formed on the same side of the transversal, is 180°)
AE and BE are the bisectors of ∠DAB and ∠CBA respectively.
∠EAB + ∠EBA = 90° ... (1)
In ∆EAB,
∠EAB + ∠EBA + ∠AEB = 180° (sum of the angles of a triangle is 180°)
90° + ∠AEB = 180°
From (1)
∠AEB = 90°
Question 12.
How many diagonals are there in a hexagon?
A. 6
B. 8
C. 9
D. 10
Answer:
No. of diagonals = 
[n is No. of Sides]
= 
= 9
Question 13.
Each interior angle of a polygon is 135. How many sides does it have?
A. 10
B. 8
C. 6
D. 5
Answer:
Interior Angle = 135
So, Exterior Angle = 180 – 135
= 45°
Sum of exterior angles of polygon is 360o
No. of Sides = 
= 8
Question 14.
Fill in the blanks.
For a convex polygon of n sides, we have:
i. Sum of all exterior angles = ...... .
ii. Sum of all interior angles = ...... .
iii. Number of diagonals = ...... .
Answer:
i. 4 right angles = 360°
Convex Polygon is also a polygon and sum of all exterior angles of any polygon is 360o
ii. (2n - 4) right angles
Convex Polygon is also a polygon and sum of all interior angles of any polygon is
(n-2)× 180°
Here, n represents the no of sides of polygon.
iii. 
No. of diagonals = 
[n is No. of Sides]
Question 15.
Fill in the blanks.
For a regular polygon of n sides, we have:
i. Sum of all exterior angles = ...... .
ii. Sum of all interior angles = ...... .
Answer:
i. 360°
Sum of all exterior angles of any polygon is 360o
ii. 
Exterior Angle = 
[n represents no of sides of polygon]
Interior Angle + Exterior Angle = 180o
So, Interior Angle = 
Question 16.
Fill in the blanks.
i. Each interior angles of a regular octagon is 
ii. The sum of all interior angle of a regular hexagon is 
iii. Each exterior angle of a regular polygon is 60°. This polygon is a ...... .
iv. Each interior angle of a regular polygon is 108°. This polygon is a ...... .
v. A pentagon has ...... diagonals.
Answer:
i. 135°
Exterior Angle = 
[n represents no of sides of polygon]
= 45°
Interior Angle + Exterior Angle = 180o
Interior Angle = 180 – 45 = 135°
ii. 720°
Sum of Interior Angle = (n-2)× 180°
= (6-2) × 180 °
= 720°
iii. Hexagon
Exterior Angle =
60 =
N = 
= 6
No. of Sides is 6.
So, it is a hexagon.
iv. Pentagon
Interior Angle = 108°
Exterior Angle = 180° - 108° = 72°
No. of Sides = 
= 5
So, it is a pentagon.
v. 5
No. of diagonals = [n is No. of Sides]
= 
= 5
Question 17.
Write ‘T’ for true and ‘F’ for false of each of the following:
i. The diagonals of a parallelogram are equal.
ii. The diagonals of a rectangle are perpendicular to each other.
iii. The diagonals of a rhombus bisect each other at right angles.
iv. Every rhombus is a kite.
Answer:
i. F
The diagonals of square and rectangle only are equal. Rest all the parallelograms like Rhombus etc. do not have diagonals equal in size.
ii. F
Diagonals of Rectangle do not intersect in right angle hence it is not perpendicular to each other. Only in case of Square, diagonal intersects at right angle.
iii. T
In rhombus, diagonals bisect the angles and are the perpendicular bisector of each other.
iv. F
In rhombus, every side has equal length but it in kite only pair of adjacent sides are equal in length.
Question 18.
Construct a quadrilateral PQRS in which PQ = 4.2 cm, ∠PQR = 60°, ∠QPS = 120, QR = 5cm and PS = 6cm
Answer:
Step 1 – Draw QR = 5cm
Step 2 – Draw angle PQR = 60 degree and PQ = 4.2 cm
Step 3 – Draw angle QPS = 120 degree and PS = 6 cm
