Class 6 Maths Ganita Prakash Chapter 2 Solutions (NCERT 2026–27) – Lines and Angles

These Class 6 Maths Ganita Prakash Chapter 2 solutions cover Lines and Angles from the new NCF-2023 textbook (Reprint 2026–27). Every Figure it Out, Math Talk and Let’s Explore question is solved step by step — points, line segments, rays, angles, comparing angles, special angles and measuring angles with a protractor — so you can master the chapter and revise it quickly.

Class: 6 Subject: Mathematics Book: Ganita Prakash Chapter: 2 Exercises: Figure it Out (p. 15–19, 21–23, 29–31, 35, 40–42, 45, 49, 52–53) Session: 2026–27
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Chapter 2 Overview

Chapter 2 of Ganita Prakash, Lines and Angles, introduces the building blocks of plane geometry. It starts with a point (a precise location with no size), then a line segment (the shortest path between two points), a line (a segment extended endlessly in both directions) and a ray (which starts at one point and goes on forever in one direction). It then builds the idea of an angle as the amount of rotation between two rays sharing a common vertex, shows how to compare angles by superimposition and using a circle, names the special angles (straight, right, acute, obtuse, reflex), and explains how to measure and draw angles in degrees using a protractor. The Class 6 Maths Ganita Prakash Chapter 2 solutions below work through every Figure it Out, Math Talk and Let’s Explore task step by step.

Key Concepts & Definitions

Point: a precise location with no length, breadth or height. It is denoted by a capital letter, e.g. point Z.

Line segment: the shortest path between two end points A and B; written as AB or BA.

Line: a line segment extended endlessly in both directions; written as AB (with arrows) or a small letter like l or m. Any two points determine exactly one line.

Ray: a portion of a line that starts at one point (the starting/initial point) and goes on endlessly in one direction; the ray from A through P is written AP.

Angle: formed by two rays with a common starting point. The common point is the vertex; the two rays are the arms. ∠DBE has vertex B (the middle letter).

Size of an angle: the amount of rotation or turn about the vertex needed to move the first arm onto the second. It does not depend on the length of the arms.

Angle bisector: the line through the vertex that divides an angle into two equal angles (it bisects the angle).

Degree: a full turn is divided into 360 equal parts; each part is 1 degree (1°). The measure of an angle is the number of 1° parts inside it, read with a protractor.

Important Facts & Angle Types (Chapter 2)

Full turn = 360°  •  Straight angle = 180° (half turn)  •  Right angle = 90° (quarter turn).

Acute angle: more than 0° and less than 90° (less than a right angle).

Obtuse angle: more than 90° and less than 180° (more than a right angle, less than a straight angle).

Reflex angle: more than 180° and less than 360° (more than a straight angle, less than a full turn).

Naming an angle: the vertex is always the middle letter, e.g. ∠DBE = ∠EBD.

Two angles round a straight line: a ray drawn from a point on a straight line splits the straight angle into two angles that add to 180°.

Clock fact: the 12 numbers split a full turn equally, so adjacent numbers are 360° ÷ 12 = 30° apart.

Figure it Out — Points, Lines and Rays (Page 15–17)

Questions are reproduced verbatim from the NCERT Ganita Prakash textbook; the worked solutions are original and verified against the answers given at the back of the book. Figure-only parts are answered in words.

1. Rihan marked a point on a piece of paper. How many lines can he draw that pass through the point? Sheetal marked two points on a piece of paper. How many different lines can she draw that pass through both of the points? Can you help Rihan and Sheetal find their answers?

SOLUTION Through a single point you can draw a line in any direction, so Rihan can draw countless (infinitely many) lines through his one point. Through two fixed points only one straight path is possible, so Sheetal can draw exactly one line through both points.

2. Name the line segments in Fig. 2.4. Which of the five marked points are on exactly one of the line segments? Which are on two of the line segments?

SOLUTION The line segments are LM, MP, PQ and QR. Points L and R are end points and lie on exactly one line segment each. Points M, P and Q are shared corners and lie on two line segments each.

3. Name the rays shown in Fig. 2.5. Is T the starting point of each of these rays?

SOLUTION The rays are TA, TB, TN and NB. No. T is the starting point of TA, TB and TN, but the ray NB starts at N, not at T.

4. Draw a rough figure and write labels appropriately to illustrate each of the following: a. OP and OQ meet at O. b. XY and PQ intersect at point M. c. Line l contains points E and F but not point D. d. Point P lies on AB.

SOLUTION a. Draw two rays starting from the same point O — one towards P, one towards Q — so OP and OQ meet (share the common starting point) at O. b. Draw two lines XY and PQ that cross each other; label the crossing point M, so XY and PQ intersect at M. c. Draw a straight line, label it l, mark two points E and F on it, and mark a separate point D away from the line so that D is not on l. d. Draw a line segment AB and mark a point P somewhere on it, so P lies on AB. (Rough labelled figures — drawn in your notebook.)

5. In Fig. 2.6, name: a. Five points   b. A line   c. Four rays   d. Five line segments

SOLUTION a. Five points: D, E, O, B and C. b. A line: DE (the line through D, E, O, B may also be named DO, DB, EO, EB or OB). c. Four rays: OC, OB, OE and OD (other rays are also possible). d. Five line segments: DE, DO, DB, EO and EB (OB and OC are also acceptable).

6. Here is a ray OA (Fig. 2.7). It starts at O and passes through the point A. It also passes through the point B. a. Can you also name it as OB? Why? b. Can we write OA as AO? Why or why not?

SOLUTION a. Yes. The ray starts at O and goes endlessly through B and then A, so B also lies on it. The same ray can be named OB because it has the same starting point O and B is a point on its path. b. No. The ray OA starts at O and travels towards A, while AO would mean a ray starting at A and travelling towards O. They start at different points and point in opposite directions, so OA and AO are not the same ray.

Figure it Out — Angles (Page 19–21)

1. Can you find the angles in the given pictures? Draw the rays forming any one of the angles and name the vertex of the angle.

SOLUTION Yes. Wherever two edges meet at a corner, an angle is formed. For the figure shown, one angle is ∠BDC: its vertex is D, and its two arms are the rays DB and DC. Try identifying the corner angles in the other pictures the same way.

2. Draw and label an angle with arms ST and SR.

SOLUTION Mark a point S as the vertex. From S, draw one ray to T and another ray to R. The angle formed is ∠TSR (= ∠RST), with vertex S and arms ST and SR. (Rough labelled figure — drawn in your notebook.)

3. Explain why ∠APB cannot be labelled as ∠P.

SOLUTION At the vertex P there is more than one angle (for example ∠APB, ∠APC and ∠BPC all share the vertex P in the figure). Writing just ∠P would not tell us which pair of arms is meant. So we name it using a point on each arm together with the vertex — ∠APB — with the vertex P written in the middle.

4. Name the angles marked in the given figure.

SOLUTION The two marked angles are ∠RTQ and ∠RTP (the vertex T is written in the middle in each).

5. Mark any three points on your paper that are not on one line. Label them A, B, C. Draw all possible lines going through pairs of these points. How many lines do you get? Name them. How many angles can you name using A, B, C? Write them down, and mark each of them with a curve as in Fig. 2.9.

SOLUTION Joining the three points in pairs gives 3 lines: AB, BC and CA. Using A, B and C we can name 3 angles: ∠ABC (= ∠CBA), ∠BCA (= ∠ACB) and ∠CAB (= ∠BAC). Mark each with a small curve at its vertex.

6. Now mark any four points on your paper so that no three of them are on one line. Label them A, B, C, D. Draw all possible lines going through pairs of these points. How many lines do you get? Name them. How many angles can you name using A, B, C, D? Write them all down, and mark each of them with a curve as in Fig. 2.9.

SOLUTION Joining four points (no three in a line) in pairs gives 6 lines: AB, BC, CD, DA, AC and BD. The angles that can be named using A, B, C, D are 12: ∠BAC, ∠CAD, ∠BAD, ∠ADB, ∠BDC, ∠ADC, ∠DCA, ∠ACB, ∠DCB, ∠CBD, ∠DBA and ∠CBA. Mark each with a curve at its vertex.

Figure it Out — Comparing Angles (Page 23)

1. Fold a rectangular sheet of paper, then draw a line along the fold created. Name and compare the angles formed between the fold and the sides of the paper. Make different angles by folding a rectangular sheet of paper and compare the angles. Which is the largest and smallest angle you made?

SOLUTION When the fold (crease) meets the sides, four angles are formed, for example ∠AEF, ∠BEF, ∠DFE and ∠CFE. Comparing them, ∠AEF and ∠CFE are larger than ∠BEF and ∠DFE. By folding in different ways you create different pairs of angles — the steeper the fold, the larger the angle; the gentler the fold, the smaller the angle. (Hands-on activity; answers depend on how you fold.)

2. In each case, determine which angle is greater and why. a. ∠AOB or ∠XOY b. ∠AOB or ∠XOB c. ∠XOB or ∠XOC Discuss with your friends on how you decided which one is greater.

SOLUTION a. ∠AOB is greater. Here ∠XOY is a small angle inside ∠AOB, and ∠AOB = ∠AOX + ∠XOY + ∠YOB, so it must be larger than ∠XOY. b. ∠AOB is greater, because ∠XOB is a part of ∠AOB (it lies inside it). c. Neither — they are equal. ∠XOB = ∠XOC, since the arm passes through the same positions; they overlap exactly on superimposition.

3. Which angle is greater: ∠XOY or ∠AOB? Give reasons.

SOLUTION Just by looking we cannot say which is greater, because the angles are close in size. We must either superimpose one over the other (matching the vertices and one arm) or measure both with a protractor to decide.

Figure it Out — Right Angles & Classifying Angles (Page 29–31)

1. How many right angles do the windows of your classroom contain? Do you see other right angles in your classroom?

SOLUTION Each rectangular window pane has four right angles (one at every corner). You can also see right angles at the corners of the blackboard, the door, tables, books, floor tiles and the wall corners. (Observation activity — count the windows in your own classroom.)

2. Join A to other grid points in the figure by a straight line to get a straight angle. What are all the different ways of doing it?

SOLUTION A straight angle (180°) is formed when the two arms from A lie in one straight line, so A must be the middle point. We join A to two grid points that are on opposite sides of A and in a straight line through A — for example a horizontal line, a vertical line, or either diagonal through A. Each such pair of opposite grid points gives one straight angle. (Grid activity — list every opposite pair through A in your figure.)

3. Now join A to other grid points in the figure by a straight line to get a right angle. What are all the different ways of doing it? Hint: Extend the line further. To get a right angle at A, draw a line through A that divides the straight angle CAB into two equal parts.

SOLUTION A right angle (90°) is exactly half of a straight angle. So take a straight line CAB through A and draw another line through A that splits it into two equal parts — the two halves are right angles. On a grid this happens whenever the two arms from A are perpendicular (e.g. one horizontal and one vertical, or the two diagonals which are perpendicular to each other). Every such perpendicular pair through A gives a right angle. (Grid activity — list each perpendicular pair through A.)

4. Get a slanting crease on the paper. Now, try to get another crease that is perpendicular to the slanting crease. a. How many right angles do you have now? Justify why the angles are exact right angles. b. Describe how you folded the paper so that any other person who doesn’t know the process can simply follow your description to get the right angle.

SOLUTION a. Four right angles. The two creases cross and divide the full turn (360°) into four equal angles, so each angle is ¼ of 360° = 90° — an exact right angle. b. Make the first slanting crease. Then fold the paper again so that the first crease folds exactly onto itself (one part of the crease lies on top of the other). Press flat; the new crease meets the first at a right angle. (Hands-on folding activity.)

5. Identify acute, right, obtuse and straight angles in the previous figures.

SOLUTION Look at each earlier figure and use the rule of turn: an acute angle is smaller than a corner of a square (less than a quarter turn), a right angle is exactly the square corner shaped like an ‘L’, an obtuse angle is wider than a right angle but not a straight line, and a straight angle is when the two arms form one straight line. Classify each marked angle accordingly. (Identification activity using the figures in the chapter.)

6. Make a few acute angles and a few obtuse angles. Draw them in different orientations.

SOLUTION For acute angles, draw two arms with a small opening (e.g. 30°, 45°, 60°) pointing in different directions. For obtuse angles, draw two arms with a wide opening (e.g. 110°, 130°, 150°). Turn the page so the same angles point up, down or sideways — the size stays the same even when the orientation changes. (Drawing activity.)

7. Do you know what the words acute and obtuse mean? Acute means sharp and obtuse means blunt. Why do you think these words have been chosen?

SOLUTION An acute angle has a small opening, so its arms close up to a sharp point — like a sharp tip. An obtuse angle has a large opening, so it looks wide and blunt rather than pointed. That is why ‘sharp’ (acute) and ‘blunt’ (obtuse) suit them.

8. Find out the number of acute angles in each of the figures below. What will be the next figure and how many acute angles will it have? Do you notice any pattern in the numbers?

SOLUTION The counts of acute angles are (i) 3, (ii) 12, (iii) 21. The next figure will have 30 acute angles. The pattern follows 3 × (number of inner triangles) + 1: 3×0+1 = 1… written as 3, 12, 21, 30, … (the counts go up by 9 each time, matching the rule 3×0+1, 3×1+1, 3×2+1, 3×3+1, … for 0, 1, 2, 3, … inner triangles).

Figure it Out — Measuring Angles with a Protractor (Page 35–42, 45)

1. (Page 35) Write the measures of the following angles: a. ∠KAL   b. ∠WAL   c. ∠TAK

SOLUTION Place the centre of the protractor on the vertex A and read the number of 1° units between the arms. a. ∠KAL = 30° (yes, the medium and long marks let you count in 5s and 10s). b. ∠WAL = 50°. c. ∠TAK = 120°.

2. (Page 36) Name the different angles in the figure and write their measures.

SOLUTION Reading the protractor (using subtraction of the two scale values for each pair of arms) gives:
AngleMeasureAngleMeasure
∠POQ35°∠QOT125°
∠POR95°∠QOU145°
∠POS125°∠ROS30°
∠POT160°∠ROT65°
∠QOR60°∠ROU85°
∠QOS90°∠SOT35°
∠SOU55°∠TOU20°

3. (Page 40) Find the degree measures of the following angles using your protractor.

SOLUTION Reading each angle with the protractor: ∠IHJ = 47°,   ∠GHK = 23°,   ∠IHJ = 108° (for the three figures shown).

4. (Page 41) Find the degree measures for the angles given below. Check if your paper protractor can be used here!

SOLUTION The two angles measure ∠IHJ = 42° and ∠IHJ = 116°. No, the hand-made paper protractor cannot read these accurately, because it only has the special folded marks (like 22.5°, 45°, 90°) and not every degree.

5. (Page 41) How can you find the degree measure of the angle given below using a protractor?

SOLUTION The marked angle is a reflex angle, so measure the smaller (unmarked) angle first and subtract from a full turn: Measure of marked angle = 360° − measure of unmarked angle = 360° − 100° = 260°.

6. (Page 41) Measure and write the degree measures for each of the following angles.

SOLUTION a. 80°   b. 120°   c. 60°   d. 130°   e. 130°   f. 60°.

7. (Page 42) Find the degree measures of ∠BXE, ∠CXE, ∠AXB and ∠BXC.

SOLUTION ∠BXE = 115°,   ∠CXE = 85°,   ∠AXB = 65°,   ∠BXC = 30°. Check: ∠BXE − ∠CXE = 115° − 85° = 30° = ∠BXC. ✓

8. (Page 42) Find the degree measures of ∠PQR, ∠PQS and ∠PQT.

SOLUTION ∠PQR = 45°,   ∠PQS = 100°,   ∠PQT = 150°.

9. (Page 43) Measure all three angles of the triangle in Fig. 2.21 (a), (b) and (c), add them up, and make a conjecture.

SOLUTION When you measure the three angles of each triangle and add them, the total comes to about 180° every time. Conjecture: the three angles of any triangle always add up to 180° (a straight angle). (The reason is studied in a later class.)

10. (Page 45) Angles in a clock. a. At 1 o’clock the angle between the hands is 30°. Why? b. What will be the angle at 2 o’clock? At 4 o’clock? At 6 o’clock? c. Explore other angles made by the hands of a clock.

SOLUTION a. The full turn round a clock face is 360°, shared equally by the 12 numbers, so the angle between two successive numbers = 360° ÷ 12 = 30°. At 1 o’clock the hands are one gap apart, so the angle is 30°. b. At 2 o’clock = 2 × 30° = 60°;   at 4 o’clock = 4 × 30° = 120°;   at 6 o’clock = 6 × 30° = 180° (a straight angle). c. Other examples: at 3 o’clock = 90° (a right angle) and at 9 o’clock = 270° (a reflex angle). Each whole-hour gap adds 30°.

11. (Page 45) The angle of a door: Is it possible to express the amount by which a door is opened using an angle? What will be the vertex and the arms of the angle?

SOLUTION Yes. The vertex is the hinge — the point where the door meets the wall. The two arms are the edge of the open door and the line of the wall (door frame). The wider the door is opened, the larger the angle.

12. (Page 45) Vidya is on a swing — the greater the starting angle, the greater her speed. But where is the angle?

SOLUTION The angle is at the top of the swing (the pivot). One arm is the rope/chain in its rest (vertical) position; the other arm is the rope in the raised starting position. The bigger the turn between these two positions, the larger the angle and the faster the swing.

13. (Page 46) A toy has slanting slabs; the greater the slope, the faster the balls roll. Can angles describe the slopes? What are the arms? Which arm is visible and which is not?

SOLUTION Yes — the slope of each slab is an angle: a larger angle means a steeper slope and faster-rolling balls. For each slab, one arm is the slanting edge of the slab (visible) and the other arm is the horizontal base line at the bottom (often not drawn, so not visible). The vertex is where the slab meets the base.

Figure it Out — Drawing & Types of Angles (Page 49–53)

1. (Page 49) In Fig. 2.23, list all the angles possible. Now guess the measures of all the angles, then measure them with a protractor and record your numbers in a table.

SOLUTION Some of the angles you can name are ∠CAP, ∠ACD, ∠APL, ∠DLP, ∠RPL, ∠SLP, ∠PRS, ∠LSR, ∠BRS and ∠CLP (more are possible). First guess each one, then measure with a protractor and compare your guess with the measured value in a table. (Estimate-and-measure activity; the measured values depend on your drawing of the figure.)

2. (Page 50) Use a protractor to draw angles having the following degree measures: a. 110°   b. 40°   c. 75°   d. 112°   e. 134°

SOLUTION For each angle: draw a base ray, place the protractor’s centre on the starting point with the base along the 0° line, count up to the required measure (110°, 40°, 75°, 112° or 134°), mark a point there, and join it to the starting point with a ruler. (Construction activity — draw each angle in your notebook.)

3. (Page 50) Draw an angle whose degree measure is the same as the angle given below. Also write the steps you followed.

SOLUTION Step 1: Measure the given angle with a protractor (say it reads X°). Step 2: Draw a base ray. Step 3: Place the protractor’s centre on the starting point and the base on the 0° line. Step 4: Count up to X°, mark the point and join it to the starting point. The new angle equals the given angle. (Construction activity; X is the measure you read from the given figure.)

4. (Page 52) Use a protractor to find the measure of each angle. Then classify each as acute, obtuse, right or reflex. a. ∠PTR   b. ∠PTQ   c. ∠PTW   d. ∠WTP

SOLUTION a. ∠PTR = 30° → acute angle. b. ∠PTQ = 60° → acute angle. c. ∠PTW = 102° → obtuse angle. d. ∠WTP = 258° → reflex angle (= 360° − 102°).

5. (Page 53) Draw angles with the following degree measures: a. 140°   b. 82°   c. 195°   d. 70°   e. 35°

SOLUTION Use the protractor method (base ray → centre on the vertex → count up → mark and join). For 195°, which is more than 180°, mark its smaller partner 360° − 195° = 165° on the other side, so the reflex side is 195°. (Construction activity.)

6. (Page 53) Make any figure with three acute angles, one right angle and two obtuse angles.

SOLUTION Draw a closed figure (such as a six-sided shape) and at its corners place three acute angles (e.g. ∠A, ∠B, ∠C each less than 90°), one right angle (∠E = 90°) and two obtuse angles (∠D and ∠F each between 90° and 180°). Measure each corner to check. (Drawing activity.)

7. (Page 53) Draw the letter ‘M’ such that the angles on the sides are 40° each and the angle in the middle is 60°.

SOLUTION Draw the two outer strokes of the ‘M’ so that each makes a 40° angle, and draw the central V so that its angle is 60°, measuring each with a protractor as you go. (Construction activity.)

8. (Page 53) Draw the letter ‘Y’ such that the three angles formed are 150°, 60° and 150°.

SOLUTION At the centre point of the ‘Y’, the three arms meet. Set the two upper openings to 150° each and the angle between the two upper arms to 60°. Check: 150° + 60° + 150° = 360° (a full turn round the point). ✓ (Construction activity.)

9. (Page 53) The Ashoka Chakra has 24 spokes. What is the degree measure of the angle between two spokes next to each other? What is the largest acute angle formed between two spokes?

SOLUTION The 24 spokes share a full turn equally, so the angle between two adjacent spokes = 360° ÷ 24 = 15°. Angles between spokes are multiples of 15°: 15°, 30°, 45°, 60°, 75°, 90°, … The largest of these that is still acute (less than 90°) is 75° (= 5 spokes apart).

10. (Page 53) Puzzle: I am an acute angle. Doubling, tripling and quadrupling my measure each still gives an acute angle, but multiplying by 5 gives an obtuse angle. What are the possibilities for my measure?

SOLUTION Let the angle be x. We need 4x < 90° (so x, 2x, 3x, 4x are all acute) and 5x > 90° (so 5x is obtuse). From 4x < 90°: x < 22.5°. From 5x > 90°: x > 18°. So 18° < x < 22.5°, giving the whole-degree possibilities 19°, 20°, 21° and 22°.

Math Talk & Let’s Explore — Answered

These are the in-text reflective and exploratory tasks in the chapter; the determinate ones are answered, the open ones are guided.

Page 21 — Is it always easy to compare two angles? Math Talk: Is it always easy to compare two angles? Answer. No. When two angles are very close in size — for example 89° and 91° — we cannot tell which is larger just by looking. We must superimpose them or measure them. For clearly different angles, comparison by eye is easy.
Page 23 — Where else do we use superimposition? Math Talk: Where else do we use superimposition to compare? Answer. We use superimposition to compare other shapes too — for example to check whether two line segments are equal in length, or whether two squares or two circles are the same size, by placing one exactly over the other.
Page 28 — Dividing a straight angle equally Let’s Explore: Is it possible to draw OC such that the two angles ∠AOC and ∠COB are equal in size? Answer. Yes. Fold the paper so that OB falls exactly on OA; the crease OC then divides the straight angle ∠AOB into two equal angles. Because OA and OB overlap on folding, ∠AOC = ∠COB — each is a right angle (90°).
Page 29 — A right angle as part of a full turn If a straight angle is formed by half of a full turn, how much of a full turn forms a right angle? Answer. A right angle is half of a straight angle, and a straight angle is half a full turn. So a right angle is ¼ (one quarter) of a full turn.
Page 40 — Why are all the folded creases equal? Think! In Fig. 2.20, ∠AOB = ∠BOC = ∠COD = ∠DOE = ∠EOF = ∠FOG = ∠GOH = ∠HOI = ___. Why? Answer. Each angle = 22.5°. The straight angle of 180° was folded into eight equal parts, so every part = 180° ÷ 8 = 22.5°.
Page 36 — Reading a labelled protractor Math Talk: Why does a protractor include two sets of numbers (inner and outer)? Can subtraction be used to find an angle? Answer. The two scales let you start counting from either side — use the scale whose arm sits on 0°. When neither arm is on 0°, read the number under each arm and subtract. For example, if OT and OS pass through 20 and 55 on the same scale, ∠TOS = 55° − 20° = 35°.
Page 52 — Angles on a straight line Let’s Explore: In the figure, ∠TER = 80°. What is the measure of ∠BET? What is the measure of ∠SET? Answer. ∠REB is a straight angle (180°) and ∠TER = 80° lies on it, so ∠BET = 180° − 80° = 100°. Since ∠SER is a right angle (90°) made of ∠TER (80°) and ∠SET, ∠SET = 90° − 80° = 10°.

Common Mistakes to Avoid

Watch out for these

  • Thinking that longer arms make a bigger angle — the size of an angle depends only on the amount of turn, not on the length of the arms.
  • Writing the vertex in the wrong place when naming an angle — the vertex is always the middle letter (∠DBE, not ∠BDE, when B is the vertex).
  • Confusing a ray with a line segment or a line — a ray has one starting point and no end; a segment has two end points; a line has no end on either side.
  • Reading the wrong scale on the protractor — start from the side where an arm sits on 0°, and use the same (inner or outer) scale throughout.
  • For a reflex angle, measuring the smaller side by mistake — measure the inner angle and subtract from 360°.
  • Forgetting that a straight angle is 180° and a right angle is 90°, so two angles on a straight line add up to 180°.

Practice MCQs & Assertion–Reason

1. The shortest path between two points A and B is called a:

(a) ray    (b) line    (c) line segment    (d) angle

2. How many lines can pass through a single given point?

(a) one    (b) two    (c) only three    (d) countless (infinitely many)

3. The common starting point of the two arms of an angle is called its:

(a) arm    (b) vertex    (c) ray    (d) degree

4. A full turn measures:

(a) 90°    (b) 180°    (c) 270°    (d) 360°

5. An angle of 90° is called a:

(a) acute angle    (b) right angle    (c) obtuse angle    (d) straight angle

6. An angle of measure 130° is:

(a) acute    (b) right    (c) obtuse    (d) reflex

7. An angle greater than 180° but less than 360° is called a:

(a) straight angle    (b) obtuse angle    (c) reflex angle    (d) acute angle

8. The angle between the hands of a clock at 4 o’clock is:

(a) 90°    (b) 100°    (c) 120°    (d) 150°

9. The angle between two adjacent spokes of the Ashoka Chakra (24 spokes) is:

(a) 12°    (b) 15°    (c) 24°    (d) 30°

10. If ∠TER = 80° and ∠REB is a straight angle, then ∠BET is:

(a) 10°    (b) 80°    (c) 100°    (d) 280°

Answer key: 1-(c), 2-(d), 3-(b), 4-(d), 5-(b), 6-(c), 7-(c), 8-(c), 9-(b), 10-(c).

For each Assertion–Reason question, choose: (A) Both Assertion and Reason are true and the Reason is the correct explanation of the Assertion; (B) Both are true but the Reason is not the correct explanation; (C) Assertion is true but Reason is false; (D) Assertion is false but Reason is true.

A-R 1. Assertion: Through two given points only one straight line can be drawn.

Reason: Any two points determine a unique line passing through both of them.

A-R 2. Assertion: The ray OA can also be named OB if B lies on it beyond A.

Reason: A ray is named by its starting point and any other point on its path.

A-R 3. Assertion: Increasing the length of the arms of an angle increases the size of the angle.

Reason: The size of an angle is the amount of rotation about the vertex.

A-R 4. Assertion: A right angle is one quarter of a full turn.

Reason: A full turn is 360° and a right angle measures 90°.

A-R 5. Assertion: An angle of 200° is a reflex angle.

Reason: A reflex angle is greater than 180° and less than 360°.

Answer key: 1-(A), 2-(A), 3-(D), 4-(A), 5-(A).

Quick Revision Summary

  • A point marks a location; a line segment is the shortest path between two points; a line extends endlessly both ways; a ray starts at one point and goes on forever in one direction.
  • An angle is formed by two rays (arms) sharing a common vertex; its size is the amount of turn, not the length of the arms.
  • Name an angle with the vertex in the middle, e.g. ∠DBE.
  • Angles are compared by superimposition or by measuring with a protractor.
  • A full turn = 360°, a straight angle = 180°, a right angle = 90°.
  • Acute (0°–90°), right (90°), obtuse (90°–180°), straight (180°), reflex (180°–360°).
  • The line that splits an angle into two equal parts is its angle bisector; the three angles of a triangle add up to 180°.

How to score full marks in this chapter

Always name angles with the vertex as the middle letter, and remember that arm length never changes an angle’s size. When measuring, line the protractor’s centre on the vertex and one arm on the 0° mark, then read the same (inner or outer) scale. For reflex angles, measure the inner angle and subtract from 360°. Keep the key values 90°, 180° and 360° ready, and use “angles on a straight line add to 180°” and “equal spacing” (clock = 30°, Chakra = 15°) to answer quickly.

Frequently Asked Questions

What is Class 6 Maths Ganita Prakash Chapter 2 about?

Chapter 2, Lines and Angles, covers the basic ideas of geometry — points, line segments, lines, rays and angles — together with comparing angles, the special angles (straight, right, acute, obtuse, reflex), and measuring and drawing angles in degrees with a protractor.

What are the five types of angles in this chapter?

An acute angle is more than 0° and less than 90°, a right angle is exactly 90°, an obtuse angle is more than 90° and less than 180°, a straight angle is 180°, and a reflex angle is more than 180° and less than 360°.

Does the length of the arms change the size of an angle?

No. The size of an angle is the amount of rotation about the vertex needed to turn one arm onto the other. Making the arms longer or shorter does not change the angle.

Are these Class 6 Maths Ganita Prakash Chapter 2 solutions free?

Yes. All solutions are free and follow the official NCERT Ganita Prakash textbook for the 2026–27 session, with answers verified against the book’s answer key.

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