9394949438

[LATEST]$type=sticky$show=home$rm=0$va=0$count=4$va=0


 NCERT Solutions for Class 7 Maths Chapter 5 Lines and Angles

NCERT Solutions for class 7 maths chapter 5 lines and angles topic 5.2.1

1. Can two acute angles be complement to each other?

Answer:

Yes two acute angles can be complementary to each other.

For e.g. Acute angles 20^{\circ} and 70^{\circ} are complementary angle as their sum is 90^{\circ} .

2. Can two obtuse angles be complement to each other?

Answer:

Since obtuse angles are greater than 90^{\circ} . Thus two obtuse angles cannot be a complement to each other. (as the sum of complementary angles is 90^{\circ} .)

3. Can two right angles be complement to each other?

Answer:

The sum of angles in complementary angles is 180^{\circ} . Thus two right angles cannot be complementary to each other.

1.(i) Which pairs of following angles are complementary?

Answer:

Sum of the angles in the given figure is : =\ 70^{\circ}\ +\ 20^{\circ}\ =\ 90^{\circ}

Thus two angles are complementary to each other.

1.(ii) Which pairs of following angles are complementary?

Which pairs of following angles are complementary

Answer:

The sum of the two angles is : =\ 75^{\circ}\ +\ 25^{\circ}\ =\ 100^{\circ}

In complementary angles sum of the angles is 90^{\circ} . Hence given pair of angles are not complementary.

1.(iii) Which pairs of following angles are complementary?

Which pairs of following angles are complementary(iii)

Answer:

We know that the sum angles of complementary angles is 90^{\circ} .

In the given figure: Sum of angles is =\ 48^{\circ}\ +\ 52^{\circ}\ =\ 100^{\circ}

Hence given pair of angles are not complementary.

1.(iv) Which pairs of following angles are complementary?

Which pairs of following angles are complementary(iv)

Answer:

The sum of the two angles is : =\ 35^{\circ}\ +\ 55^{\circ}\ =\ 90^{\circ}

In complementary angles sum of the angles is 90^{\circ} . Hence given pair of angles are complementary to each other.

2 .(i) What is the measure of the complement of each of the following angles?

(i)45^{o}

Answer:

We know that the sum of complementary angles is 90^{\circ} .

Thus the complement of the given angle is : \Theta \ =\ 90^{\circ}\ -\ 45^{\circ}\ =\ 45^{\circ}

2.(ii) What is the measure of the complement of each of the following angles?

(ii)65^{o}

Answer:

The sum of complementary angles are 90^{\circ} .

Thus the required angle is : =\ 90^{\circ}\ -\ 65^{\circ}\ =\ 25^{\circ}

2.(iii) What is the measure of the complement of each of the following angles?

(iii)41^{o}

Answer:

We know that the sum of complementary angles is 90^{\circ} .

Hence the required complement of the given angle is : \Theta \ =\ 90^{\circ}\ -\ 41^{\circ}\ =\ 49^{\circ}

2.(iv) What is the measure of the complement of each of the following angles?

(iv)54^{o}

Answer:

We know that the sum of complementary angles is 90^{\circ} .

Hence the complement of the given angle is : \Theta \ =\ 90^{\circ}\ -\ 54^{\circ}\ =\ 36^{\circ}

3. The difference in the measures of two complementary angles is 12^{o} . Find the measures of the angles.

Answer:

Let one of the angles be \Theta .

It is given that the angles are complementary to each other. So the other angle will be 90^{\circ}\ -\ \Theta .

Further, it is given that the difference of the angle is 12.

So the equation is : 90^{\circ}\ -\ \Theta\ -\ \Theta\ =\ 12^{\circ}

or 2\Theta\ =\ 90^{\circ}\ -\ 12^{\circ}

or \Theta\ =\ 39^{\circ}

Hence the two angles are 39^{\circ} and 51^{\circ} .

NCERT solutions for class 7 maths chapter 5 lines and angles topic 5.2.2

1. Can two obtuse angles be supplementary?

Answer:

No, two obtuse angles cannot be supplementary as their the sum of angles will exceed 180^{\circ} .

2. Can two acute angles be supplementary?

Answer:

No two acute angles cannot be supplementary.

For being the supplementary angles their sum should be 180^{\circ} .

But the acute angles are less than 90^{\circ} . Hence their maximum doesn't reach 180^{\circ} .

3. Can two right angles be supplementary?

Answer:

Yes, two right angles are supplementary as their sum is 180^{\circ} .

1. Find the pairs of supplementary angles in Fig :

Find the pairs of supplementary angles in Fig 5.7:

Answer:

We know that the sum of the supplementary angle is 180^{\circ} .

(i) Sum of the angles is : =\ 110^{\circ}\ +\ 50^{\circ}\ =\ 160^{\circ} . Hence the angles are not supplementary.

(ii) Sum of the angles is : =\ 105^{\circ}\ +\ 65^{\circ}\ =\ 170^{\circ} . Thus the angles are not supplementary.

(iii) Sum of the angles is : =\ 50^{\circ}\ +\ 130^{\circ}\ =\ 180^{\circ} . Hence the angles are supplementary to each other.

(iv) Sum of the angles is : =\ 45^{\circ}\ +\ 45^{\circ}\ =\ 90^{\circ} . Thus the angles are not supplement to each other.

NCERT Solutions for class 7 maths chapter 5 lines and angles topic 5.2.3

1. Can two adjacent angles be supplementary?

Answer:

Yes, two adjacent angles can be supplementary.

For e.g., 40^{\circ} and 140^{\circ} can be two adjacent angles which are supplementary angles.

2. Can two adjacent angles be complementary?

Answer:

Yes, two adjacent angles can be complementary to each other.

For e.g., adjacent angles 40^{\circ} and 50^{\circ} are complementary angles.

3. Can two obtuse angles be adjacent angles?

Answer:

Yes, two obtuse angles can be adjacent for e.g., 100^{\circ} and 150^{\circ} can be adjacent angles.

4. Can an acute angle be adjacent to an obtuse angle?

Answer:

Yes, the acute angle can be adjacent to an obtuse angle.

For e.g., 20^{\circ} and 120^{\circ} can be adjacent angles.

1. Are the angles marked 1 and 2 adjacent? (Fig). If they are not adjacent, say, ‘why’.

Answer:

The condition for being adjacent angles are:-

(a) they have a common vertex

(b) they have common arm

Hence in the given figures:-

(i) These angles are adjacent angles as they agree above conditions.

(ii) The angles are adjacent angles.

(iii) These angles are not adjacent as their vertices are different.

(iv) These are adjacent angles.

(v) The angles are adjacent angles.

2. In the given Fig , are the following adjacent angles?

(a) \angle AOB and \angle BOC
(b) \angle BOD and \angle BOC

Justify your answer.

Answer:

(a) \angle AOB and \angle BOC are adjacent angles as they have common vertex and share a common arm.

(b) \angle BOD and \angle BOC are not adjacent angles as \angle BOC is contained in \angle BOD .

NCERT Solutions for class 7 maths chapter 5 lines and angles topic 5.2.4

1. Can two acute angles form a linear pair?

Answer:

No two acute angles cannot form a linear pair. As the sum of angles in the linear pair is 180^{\circ} .

But the acute angles have their maximum value of 90^{\circ} thus their sum cannot be 180^{\circ} .

2. Can two obtuse angles form a linear pair?

Answer:

No two obtuse angles cannot form a linear pair as their sum will exceed 180^{\circ} , but the sum of angles in linear pair is 180^{\circ} .

3. Can two right angles form a linear pair? 

Answer:

Yes, two right angles will form a linear pair as their sum is 180^{\circ} which is the sum of angles in linear pair.

1. Check which of the following pairs of angles form a linear pair (Fig):

Check which of the following pairs of angles form a linear pair (Fig 5.13)

Answer:

The sum angles of linear pair is 180^{\circ} .

(i) Sum of the given angles is : =\ 40^{\circ}\ +\ 140^{\circ}\ =\ 180^{\circ} . Thus these are linear pair.

(ii) Sum of the given angles is : =\ 60^{\circ}\ +\ 60^{\circ}\ =\ 120^{\circ} . Thus these are not linear pair.

(iii) Sum of the given angles is : =\ 90^{\circ}\ +\ 80^{\circ}\ =\ 170^{\circ} . Thus these are not a linear pair.

(iv) Sum of the given angles is : =\ 115^{\circ}\ +\ 65^{\circ}\ =\ 180^{\circ} . Thus these are linear pair.

NCERT solutions for class 7 maths chapter 5 lines and angles topic 5.2.5

1. In the given figure, if \angle 1=30^{o} , find \angle 2 and \angle 3 .

 Lines and angles

Answer:

From the given figure :

(a) \angle 1\ =\ \angle 3\ =\ 30^{\circ} (Vertically opposite angles)

(b) \angle 2\ =\ 180^{\circ}\ -\ \angle 1\ =\ 150^{\circ} (Linear pair)

2. Give an example for vertically opposite angles in your surroundings.

Answer:

The very common example of vertically opposite angle is scissors. Its arms form vertically opposite angles.

NCERT Solutions for class 7 maths chapter 5 lines and angles topic 5.3.1

1. Find examples from your surroundings where lines intersect at right angles.

Answer:

The floor and the pillars in the house are at the right angle. Apart from this, the walls are perpendicular to the floor.

3. Draw any rectangle and find the measures of angles at the four vertices made by the intersecting lines.

Answer:

We know that the opposite sides of the rectangle are equal and parallel to each other.

Then for two interior angles on the same side of the transversal, we can write :

\angle A\ +\ \angle B\ =\ 180^{\circ}

Also, \angle A\ =\ \angle B (Since opposite sides are equal)

Thus \angle A\ =\ \angle B\ =\ 90^{\circ}

4. If two lines intersect, do they always intersect at right angles?

Answer:

No, it is not necessary that lines always intersect at right angles. The lines may form an acute angle (another angle will be obtuse as to form linear pair).

NCERT Solutions for class 7 maths chapter 5 lines and angles topic 5.3.2

1. Suppose two lines are given. How many transversals can you draw for these lines?

Answer:

We can draw infinite transversals from these two lines.

2. If a line is a transversal to three lines, how many points of intersections are there?

Answer:

We know that transversal cuts lines at distinct points. Thus if a transversal cuts 3 lines then it will have 3 intersecting points.

3. Try to identify a few transversals in your surroundings.

Answer:

Few examples of the transversal are road crossing of different railway line crossing the other lines. Transversal intersects lines at a distinct point.

1.(i) Name the pairs of angles in each figure:

Name the pairs of angles in each figure(i)

(i)

Answer:

The given pair of angles are corresponding angles.

1.(ii) Name the pairs of angles in each figure:

Name the pairs of angles in each figure(ii)

(ii)

Answer:

The given pair of angles are alternate interior angles.

1.(iii) Name the pairs of angles in each figure:

Answer:

The angles shown are pair of interior angles.

1.(iv) Name the pairs of angles in each figure:

Answer:

These are pair of corresponding angles.

1.(v) Name the pairs of angles in each figure:

Name the pairs of angles in each figure(v)

(v)

Answer:

The angles shown are pair of alternate interior angles.

1.(vi) Name the pairs of angles in each figure:

Answer:

The given angles are linear pair of angle as they form a straight line.

NCERT solutions for class 7 maths chapter 5 lines and angles exercise 5.1

1.(i) Find the complement of each of the following angles:

Answer:

The sum of the complementary angle is 90^{\circ} .

Thus the complementary angle to the given angle is : =\ 90^{\circ}\ -\ 20^{\circ}\ =\ 70^{\circ}

1.(ii) Find the complement of each of the following angles:

Answer:

The sum of the complementary angle is 90^{\circ} .

Thus the complementary angle to the given angle is : =\ 90^{\circ}\ -\ 63^{\circ}\ =\ 27^{\circ}

1.(iii) Find the complement of each of the following angles:

Answer:

The sum of the complement angles is 90^{\circ} .

Thus the complement of the angle is given by : =\ 90^{\circ}\ -\ 57^{\circ}\ =\ 33^{\circ}

2.(i) Find the supplement of each of the following angles:

Answer:

We know that sum of supplement angles is 180^{\circ}

The supplement of the given angle is : =\ 180^{\circ}\ -\ 105^{\circ}\ =\ 75^{\circ}

2.(ii) Find the supplement of each of the following angles:

Answer:

We know that the sum of angles of supplementary pair is 180^{\circ} .

Thus the supplement of the given angle is : =\ 180^{\circ}\ -\ 87^{\circ}\ =\ 93^{\circ}

2.(iii) Find the supplement of each of the following angles:

Answer:

We know that the sum of angles of supplementary pair is 180^{\circ} .

Thus the supplement of the given angle is : =\ 180^{\circ}\ -\ 154^{\circ}\ =\ 26^{\circ}

3. Identify which of the following pairs of angles are complementary and which are supplementary.

(i) 65^{o},115^{o}(ii) 63^{o}, 27^{o}(iii) 112^{o}, 68^{o}

(iv) 130^{o}, 50^{o}(v) 45^{o}, 45^{o}(vi) 80^{o}, 10^{o}

Answer:

We know that the sum of supplementary angles is 180^{\circ} and the sum of complementary angle is 90^{\circ} .

(i) Sum of the angles is : 65^{\circ}\ +\ 115^{\circ}\ =\ 180^{\circ} . Hence these are supplementary angles.

(ii) Sum of the angles is : 63^{\circ}\ +\ 27^{\circ}\ =\ 90^{\circ} . Hence these are complementary angles.

(iii) Sum of the angles is : 112^{\circ}\ +\ 68^{\circ}\ =\ 180^{\circ} . Hence these are supplementary angles.

(iv) Sum of the angles is : 130^{\circ}\ +\ 50^{\circ}\ =\ 180^{\circ} . Hence these are supplementary angles.

(v) Sum of the angles is : 45^{\circ}\ +\ 45^{\circ}\ =\ 90^{\circ} . Hence these are complementary angles.

(vi) Sum of the angles is : 80^{\circ}\ +\ 10^{\circ}\ =\ 90^{\circ} . Hence these are complementary angles.

4. Find the angle which is equal to its complement.

Answer:

Let the required angle be \Theta .

Then according to question, we have :

\Theta\ +\ \Theta\ =\ 90^{\circ}

or 2\Theta\ =\ 90^{\circ}

or \Theta\ =\ 45^{\circ}

5. Find the angle which is equal to its supplement.

Answer:

Let the required angle be \Theta .

Then according to the question :

\Theta\ +\ \Theta \ =\ 180^{\circ}

or 2\Theta \ =\ 180^{\circ}

or \Theta \ =\ 90^{\circ}

Hence the angle is 90^{\circ} .

6. In the given figure, \angle 1 and \angle 2 are supplementary angles. If \angle 1 is decreased, what changes should take place in \angle 2 so that both the angles still remain supplementary.

Answer:

Since it is given that \angle 1 and \angle 2 are supplementary angles, i.e. the sum of both angles is 180^{\circ} .

Thus if \angle 1 is decreased then to maintain the sum \angle 2 needs to be increased.

7. Can two angles be supplementary if both of them are:

(i) acute ? (ii) obtuse ? (iii) right ?

Answer:

We know that the sum of supplementary angles is 180^{\circ} .

(i) The maximum value of the sum of two acute angles is less than 180^{\circ} . Thus two acute angles can never be supplementary.

(ii) The minimum value of the sum of two obtuse angles is more than 180^{\circ} . Thus two obtuse angles can never be supplementary.

(iii) Sum of two right angles is 180^{\circ} . Hence two right angles are supplementary.

8. An angle is greater than 45^{o} . Is its complementary angle greater than 45^{o} or equal to 45^{o} or less than 45^{o} ?

Answer:

We know that the sum of two complementary angles is 90^{\circ} .

Thus if one of the angles is greater than 45^{\circ} then the other angle needs to be less than 45^{\circ} .

9. In the adjoining figure:

(i) Is \angle 1 adjacent to \angle 2 ?
(ii) Is \angle AOC adjacent to \angle AOE ?

(iii) Do \angle COE and <img alt="\angle EOD" height="13"

src="https://lh4.googleusercontent.com/QWqI_PJ-x4Dru49sBuHgrPAVvw4gIQTvvuev9aFTdyiXiHlsw05m3-78WtiKEVUnfOXrv2Lw4vcYHckzsZ_6fWavHXif--QWJEK_T1b5qYw2xnfGZmnksYfGn4JyukQGFqSL76w" style="margin-left: 0px; margin-top: 0px;" width="56" /> form a linear pair?
(iv) Are \angle BOD and \angle DOA supplementary?
(v) Is \angle 1 vertically opposite to \angle 4 ?
(vi) What is the vertically opposite angle of \angle 5 ?

Answer:

(i) Yes, \angle 1 adjacent to \angle 2 as these have the same vertex and have one common arm.

(ii) No, \angle AOC is not adjacent to \angle AOE . This is because \angle AOE contains \angle AOC .

(iii) Yes the given angles form a linear pair as they are pair of supplementary angles.

(iv) Since BOA is a straight line thus the given angles are supplementary.

(v) Yes, \angle 1 and \angle 4 are vertically opposite angles as they are the angles formed by two intersecting straight lines.

(vi) The vertically opposite angle to \angle 5 is \left ( \angle 2\ +\ \angle 3 \right ) .

10. (i) Indicate which pairs of angles are:

(i) Vertically opposite angles.

Answer:

The vertically opposite pairs are :

(a) \angle 1 and \angle 4

(b) \angle 5 and \left ( \angle 2\ +\ \angle 3 \right )

10.(ii) Indicate which pairs of angles are:

(ii) Linear pairs

Answer:

The sum of angles in linear pair is 180^{\circ} .

Thus the linear pairs are :

(a) \angle 1\ and\ \angle 5

(b) \angle 4\ and\ \angle 5

11. In the following figure, is \angle 1 adjacent to \angle 2 ? Give reasons.

Answer:

No, \angle 1 and \angle 2 are not adjacent angles as their vertex is not same/common.

For being adjacent angles the pair must have a common vertex and have a common arm.

12.(i) Find the values of the angles x, y, and z in each of the following:

Answer:

From the figure :

(i) \angle x\ =\ 55^{\circ} (Vertically opposite angle)

(ii) \angle y\ =\ 180^{\circ}\ -\ 55^{\circ}\ =\ 125^{\circ} (Linear pair)

(iii) \angle y\ =\ \angle z\ =\ 125^{\circ} (Vertically opposite angle)

12.(ii) Find the values of the angles x, y, and z in each of the following:

Find the values of the angles x, y, and z in each of the following(ii)

Answer:

From the figure we can observe that :

(i) \angle z\ =\ 40^{\circ} (Vertically opposite angle)

(ii) \angle x\ =\ 180^{\circ}\ -\ 40^{\circ}\ -\ 25^{\circ}\ =\ 115^{\circ} (Linear pair/straight line)

(iii) \angle y\ =\ 180^{\circ}\ -\ \angle z\ =\ 140^{\circ} (Vertically opposite angle).

13. Fill in the blanks:

(i) If two angles are complementary, then the sum of their measures is _______.

(ii) If two angles are supplementary, then the sum of their measures is ______.

(iii) Two angles forming a linear pair are _______________.

(iv) If two adjacent angles are supplementary, they form a ___________.

(v) If two lines intersect at a point, then the vertically opposite angles are always _____________.

(vi) If two lines intersect at a point, and if one pair of vertically opposite angles are acute angles, then the other pair of vertically opposite angles are __________.

Answer:

(i) 90^{\circ}

(ii) 180^{\circ}

(iii) Supplementary angles

(iv) Straight line

(v) equal

(vi) obtuse angles (as they form a line).

14. In the adjoining figure, name the following pairs of angles.

(i) Obtuse vertically opposite angles
(ii) Adjacent complementary angles
(iii) Equal supplementary angles
(iv) Unequal supplementary angles
(v) Adjacent angles that do not form a linear pair

Answer:

(i) \angle AOD\ and\ \angle BOC are the vertically obtuse angles.

(ii) \angle AOB\ and\ \angle AOE are the complementary angles.

(iii) \angle BOE\ and\ \angle DOE are the equal supplementary angles.

(iv) \angle BOC\ and\ \angle COD are the unequal pair of supplementary angle.

(v) \angle AOB\ and\ \angle AOE , \angle EOD\ and\ \angle COD and \angle AOE\ and\ \angle EOD are adjacent angles but are not supplementary angles.

NCERT solutions for class 7 maths chapter 5 lines and angles exercise 5.2

1.(i) State the property that is used in each of the following statements?

(i) If a\parallel b , then \angle 1= \angle 5 .

Answer:

The statement "If a\parallel b , then \angle 1= \angle 5 " is true using the corresponding angles property .

1.(ii) State the property that is used in each of the following statements?

(ii) If \angle 4=\angle 6 , then a\parallel b.

Answer:

The property used here is 'alternate interior angle property'.

1.(iii) State the property that is used in each of the following statements?

(iii) If \angle 4+\angle 5= 180^{o} , then a\parallel b.

Answer:

The property used here is ' Interior angles on the same side of the transversal are a pair of supplementary angles '.

2. In the adjoining figure, identify

(i) the pairs of corresponding angles.
(ii) the pairs of alternate interior angles.
(iii) the pairs of interior angles on the same side of the transversal.
(iv) the vertically opposite angles.

Answer:

(i) Corresponding angles :- \angle 1\ and\ \angle 5 , \angle 2\ and\ \angle 6 , \angle 3\ and\ \angle 7 , \angle 4\ and\ \angle 8

(ii) Alternate interior angles :- \angle 2\ and\ \angle 8 , \angle 3\ and\ \angle 5 ,

(iii) Alternate angles on the same side of traversal :- \angle 2\ and\ \angle 5 , \angle 3\ and\ \angle 8

(iv) Vertically opposite angles :- \angle 1\ and\ \angle 3 , \angle 2\ and\ \angle 4 , \angle 5\ and\ \angle 7 , \angle 6\ and\ \angle 8

3. In the adjoining figure, p\parallel q . Find the unknown angles.

Answer:

The angles can be found using different properties:

(a) \angle e\ =\ 180^{\circ}\ -\ 125^{\circ}\ =\ 55^{\circ} (The angles are linear pair)

(b) \angle e\ =\ \angle f\ =\ 55^{\circ} (Vertically opposite angle)

(c) \angle d\ =\ 125^{\circ} (Corresponding angle)

(d) \angle d\ =\ \angle b\ =\ 125^{\circ} (Vertically opposite angle)

(e) \angle a\ =\ \angle c\ =\ 180^{\circ}\ -\ 125^{\circ}\ =\ 55^{\circ} (Vertically opposite angel, linear pair).

4.(i) Find the value of x in each of the following figures if l\parallel m .

Answer:

The linear pair of the 110^{\circ} is : \Theta \ =\ 180^{\circ}\ -\ 110^{\circ}\ =\ 70^{\circ}

Thus the value of x is : x\ =\ 70^{\circ} (Corresponding angles of parallel lines are equal).

4.(ii) Find the value of x in each of the following figures if l\parallel m.

Answer:

The value of x is 100^{\circ} , as these are the corresponding angles.

5. In the given figure, the arms of two angles are parallel. If \angle ABC= 70^{o} , then find

(i) \angle DGC

(ii)\angle DEF

Answer:

(i) Since side AB is parallel to DG.

Thus : \angle DGC\ =\ 70^{\circ} (Corresponding angles of parallel arms are equal.)

(ii) Further side BC is parallel to EF.

We have : \angle DEF\ =\ \angle DGC\ =\ 70^{\circ} (Corresponding angles of parallel arms are equal.)

6. In the given figures below, decide whether l is parallel to m .

Answer:

(i) In this case. the sum of the interior angle is 126^{\circ}\ +\ 44^{\circ}\ =\ 170^{\circ} thus l is not parallel to m.\

(ii) In this case also l is not parallel to m as the corresponding angle cannot be 75^{\circ} (Linear pair will not form).

(iii) In this l and m are parallel . This is because the corresponding angle is 57^{\circ} and it forms linear pair with 123^{\circ} .

(iv) The lines are not parallel as the linear pair not form. (Since the corresponding angle will be 72^{\circ} otherwise.)

Responsive Table

Chapter No.Chapter Name
Chapter 1 NCERT solutions for class 7 maths chapter 1 Integers
Chapter 2 NCERT solutions for class 7 maths chapter 2 Fractions and Decimals
Chapter 3 NCERT solutions for class 7 maths chapter 3 Data Handling
Chapter 4 NCERT solutions for class 7 maths chapter 4 Simple Equations
Chapter 5 NCERT solutions for class 7 maths chapter 5 Lines and Angles
Chapter 6 NCERT solutions for class 7 maths chapter 6 The Triangle and its Properties
Chapter 7 NCERT solutions for class 7 maths chapter 7 Congruence of Triangles
Chapter 8 NCERT solutions for class 7 maths chapter 8 comparing quantities
Chapter 9 NCERT solutions for class 7 maths chapter 9 Rational Numbers
Chapter 10 NCERT solutions for class 7 maths chapter 10 Practical Geometry
Chapter 11 NCERT solutions for class 7 maths chapter 11 Perimeter and Area
Chapter 12 NCERT solutions for class 7 maths chapter 12 Algebraic Expressions
Chapter 13 NCERT solutions for class 7 maths chapter 13 Exponents and Powers
Chapter 14 NCERT solutions for class 7 maths chapter 14 Symmetry
Chapter 15 NCERT solutions for class 7 maths chapter 15 visualising-solid-shapes

Want to know more

Please fill in the details below:

INNER POST ADS

Latest IITJEE Articles$type=three$c=3$author=hide$comment=hide$rm=hide$date=hide$snippet=hide

Latest NEET Articles$type=three$c=3$author=hide$comment=hide$rm=hide$date=hide$snippet=hide

Name

Admissions,1,Alternating Current,60,AP EAMCET 2020,1,Basic Maths,2,BCECE 2020,1,best books for iit jee,2,best coaching institute for iit,1,best coaching institute for iit jee preparation,1,best iit jee coaching delhi,1,best iit jee coaching in delhi,2,best study material for iit jee,4,BITSAT Registration 2020,1,Blog,62,books for jee preparation,1,books recommended by iit toppers,3,Capacitance,3,CBSE,1,CBSE accounts exam,1,CBSE boards,1,CBSE NEET,9,cbse neet 2019,3,CBSE NEET 2020,1,cbse neet nic,1,Centre of Mass,2,Chemistry,58,Class 12 Physics,15,coaching for jee advanced,1,coaching institute for iit jee,2,Collision,2,COMEDK UGET 2020 Application Form,1,COMEDK UGET 2020 Exam Form,1,COMEDK UGET news,1,CUCET 2020,2,Current Electricity,4,CVR college,1,Digestion and Absorption Notes PDF,1,Electromagnetic Induction,3,Electronics,1,Electrostatics,3,Energy,1,Engineering & Medical,1,Fluid Mechanics,4,Gravitation,2,GUJCET 2020 Application Form,1,Heat,4,iit admission,1,iit advanced,1,iit coaching centre,3,iit coaching centre in delhi,2,iit coaching classes,2,iit coaching in delhi,1,iit coaching institute in delhi,1,iit entrance exam,1,iit entrance exam syllabus,2,iit exam pattern,2,iit jee,5,iit jee 2019,3,iit jee advanced,2,iit jee books,3,iit jee coaching,2,iit jee exam,3,iit jee exam 2019,1,iit jee exam pattern,3,iit jee institute,1,iit jee main 2019,2,iit jee mains,3,iit jee mains syllabus,2,iit jee material,1,iit jee online test,3,iit jee practice test,3,iit jee preparation,6,iit jee preparation in delhi,2,iit jee preparation time,1,iit jee preparation tips by toppers,2,iit jee question paper,1,iit jee study material,3,iit jee study materials,2,iit jee syllabus,2,iit jee syllabus 2019,2,iit jee test,3,iit preparation,2,iit preparation books,5,iit preparation time table,2,iit preparation tips,2,iit syllabus,2,iit test series,3,IITJEE,100,Important Biology Notes for NEET Preparation,1,IPU CET,1,JEE Advanced,83,jee advanced exam,2,jee advanced exam pattern,1,jee advanced paper,1,JEE Books,1,JEE Coaching Delhi,3,jee exam,3,jee exam 2019,6,JEE Exam Pattern,2,jee exam pattern 2019,1,jee exam preparation,1,JEE Main,85,jee main 2019,4,JEE Main 2020,1,JEE Main 2020 Application Form,2,JEE Main 2020 news,2,JEE Main 2020 Official Answer Key,1,JEE Main 2020 Registration,1,JEE Main 2020 Score,1,JEE Main application form,1,jee main coaching,1,JEE Main eligibility criteria,3,jee main exam,1,jee main exam 2019,3,jee main online question paper,1,jee main online test,3,JEE Main Paper-2 Result,1,jee main registration,2,jee main syllabus,2,JEE mains 2020,1,jee mains question bank,1,jee mains test papers,3,JEE Mock Test,2,jee notes,1,jee past papers,1,JEE Preparation,2,jee preparation in delhi,1,jee preparation material,4,JEE Study Material,1,jee syllabus,6,JEE Syllabus Chemistry,1,JEE Syllabus Maths,1,JEE Syllabus Physics,1,jee test series,3,KCET - 2020,1,Kinematics,1,Latest article,5,Latest Articles,61,Latest News,34,latest news about neet exam,1,Laws of Motion,2,Magnetic Effect of Current,3,Magnetism,3,MHT CET 2020,2,MHT CET 2020 exam schedule,1,Modern Physics,1,NCERT Solutions,15,neet,3,neet 2019,1,neet 2019 eligibility criteria,1,neet 2019 exam date,2,neet 2019 test series,2,NEET 2020,2,NEET 2020 Application Form,1,NEET 2020 Eligibility Criteria,1,NEET 2020 Registration,1,neet application form,1,neet application form 2019 last date,1,Neet Biology Syllabus,1,Neet Books,3,neet eligibility criteria,3,neet exam 2019,7,neet exam application,1,neet exam date,1,neet exam details,1,neet exam pattern,6,neet exam pattern 2019,2,neet examination,1,neet mock test 2019,1,Neet Notes,3,Neet Online Application Form,3,neet online test,2,neet past papers,1,neet physics syllabus,1,neet practice test,2,NEET preparation books,1,neet qualification marks,1,NEET question paper 2019,1,neet question papers,1,neet registration,1,Neet Study Material,3,neet syllabus,6,neet syllabus 2019,5,NEET Syllabus 2020,1,neet syllabus chemistry,1,neet syllabus for biology,1,neet syllabus for physics,1,neet test series,1,neet ug 2019,2,news,5,online study material for iit jee,1,Optical Instruments,1,Physics,110,physics books for iit jee,1,Power,1,Practical Physics,1,Quiz,5,Ray Optics,1,Rotational Motion,3,SHM,3,Simple Harmonic Motion,3,study materials for iit jee,1,Study Notes,110,study notes for iit jee,1,Thermodynamics,4,TS EAMCET Notification,2,Units and Dimensions,1,UPSEE 2020,1,UPSEE 2020 Application Form,2,UPSEE EXAM,1,Vectors,2,VITEE Application form,1,Wave Motion,3,Wave Optics,1,WBJEE 2020 Admit Card,1,WBJEE 2020 Answer Key,1,Work,1,
ltr
static_page
BEST NEET COACHING CENTER | BEST IIT JEE COACHING INSTITUTE | BEST NEET & IIT JEE COACHING: ncert-solutions-class-7-maths-ch-5-lines-and-angles
ncert-solutions-class-7-maths-ch-5-lines-and-angles
BEST NEET COACHING CENTER | BEST IIT JEE COACHING INSTITUTE | BEST NEET & IIT JEE COACHING
https://www.cleariitmedical.com/p/ncert-solutions-class-7-maths-ch-5.html
https://www.cleariitmedical.com/
https://www.cleariitmedical.com/
https://www.cleariitmedical.com/p/ncert-solutions-class-7-maths-ch-5.html
true
7783647550433378923
UTF-8
Loaded All Posts Not found any posts VIEW ALL Readmore Reply Cancel reply Delete By Home PAGES POSTS View All RECOMMENDED FOR YOU LABEL ARCHIVE SEARCH ALL POSTS Not found any post match with your request Back Home Sunday Monday Tuesday Wednesday Thursday Friday Saturday Sun Mon Tue Wed Thu Fri Sat January February March April May June July August September October November December Jan Feb Mar Apr May Jun Jul Aug Sep Oct Nov Dec just now 1 minute ago $$1$$ minutes ago 1 hour ago $$1$$ hours ago Yesterday $$1$$ days ago $$1$$ weeks ago more than 5 weeks ago Followers Follow THIS CONTENT IS PREMIUM Please share to unlock Copy All Code Select All Code All codes were copied to your clipboard Can not copy the codes / texts, please press [CTRL]+[C] (or CMD+C with Mac) to copy

STAY CONNECTED