Here are some reasoning questions using shapes for grouping identical figures.
Example 1: Identifying Identical Figures
Question:
Which two shapes are exactly identical?
π₯ πΊ π΅ π₯
A) πΊ and π΅
B) π₯ and π₯
C) πΊ and π₯
D) All are different
Answer:
B) π₯ and π₯
(The two red squares are identical, so they belong in the same group.)
Example 2: Finding the Odd One Out
Question:
Which shape does not belong in the group?
π΅ π΅ π΄ π΅
A) First
B) Second
C) Third
D) Fourth
Answer:
C) π΄
(The third shape is red, while the others are blue. So, it is the odd one out.)
Example 3: Grouping Based on Number of Sides
Question:
Which group contains only shapes with the same number of sides?
A) πΊ π¦ β
B) β π π£
C) πΊ πΊ πΊ
D) ⬣ β¬ πΊ
Answer:
C) πΊ πΊ πΊ
(All these shapes are triangles, meaning they each have three sides.)
Example 4: Grouping Based on Symmetry
Question:
Which group contains only symmetrical shapes?
A) πΊ β¬ β
B) π‘ πΆ πΊ
C) β¬ π· π»
D) ⬣ β¬ β¬
Answer:
A) πΊ β¬ β
(A triangle, square, and circle all have symmetrical properties.)
Example 5: Finding Identical Rotated Figures
Question:
Which shape remains the same even when rotated 90Β°?
A) π³
B) π»
C) π·
D) β
Answer:
A) π³
(A square looks the same after a 90-degree rotation, so all rotations are identical.)
Example 6: Grouping Shapes by Curves vs. Straight Edges
Question:
Which of these groups contains only curved shapes?
A) β π π£
B) β¬ π· πΊ
C) π· πΆ β¬
D) ⬑ β¬’ π»
Answer:
A) β π π£
(All these shapes are circles, meaning they have only curved edges.)
Example 7: Matching Mirror Images
Question:
Which shape looks the same in a mirror reflection?
A) π΅
B) π»
C) π·
D) β¬
Answer:
A) π΅
(A circle looks the same in a mirror because it is perfectly symmetrical.)
8. Identifying Mirror Images
Question:
Which shape looks the same in a mirror reflection?
A) π΅
B) πΊ
C) π·
D) β¬
Answer:
A) π΅
(A circle looks the same in a mirror because it is perfectly symmetrical.)
9. Finding the Identical Shape
Question:
Which shape is identical to the first one?
π» β¬ π· π»
A) β¬
B) π·
C) π»
D) π΅
Answer:
C) π»
(The two red downward triangles are identical.)
10. Identifying the Rotated Shape
Question:
Which shape remains the same even after rotation?
A) β¬
B) πΊ
C) π·
D) β¬
Answer:
A) β¬
(A square looks the same after a 90-degree rotation.)
11. Finding the Odd One Out
Question:
Which shape does not belong in the group?
πΊ πΊ πΊ π·
A) First
B) Second
C) Third
D) Fourth
Answer:
D) Fourth
(The first three are triangles, while the fourth is a diamond.)
12. Grouping by Number of Sides
Question:
Which group contains only shapes with four sides?
A) πΊ β¬ β¬
B) π· π΅ πΊ
C) β¬ β¬ π³
D) πΆ π» ⬣
Answer:
C) β¬ β¬ π³
(All these shapes are squares or rectangles, each having four sides.)
13. Identifying the Reversed Shape
Question:
Which shape is the mirror image of πΊ?
A) π»
B) π·
C) π΅
D) β¬
Answer:
A) π»
(A triangle flipped upside-down is a downward triangle.)
14. Finding the Shape with Maximum Symmetry
Question:
Which shape has the most lines of symmetry?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
C) π΅
(A circle has infinite lines of symmetry.)
15. Matching Shapes by Pattern
Question:
Which two shapes belong in the same group based on their edges?
A) πΊ and π·
B) β¬ and β¬
C) π΅ and π·
D) πΆ and πΊ
Answer:
B) β¬ and β¬
(Both are four-sided shapes: a square and a rectangle.)
16. Identifying the Same Shape in a Different Orientation
Question:
Which shape is identical to the first one but rotated?
π» β¬ πΊ π»
A) β¬
B) πΊ
C) π·
D) πΆ
Answer:
B) πΊ
(A triangle remains the same shape when rotated but may appear upside-down.)
17. Finding the Odd One Out
Question:
Which shape does not belong in the group?
β¬ π³ β¬ πΊ
A) First
B) Second
C) Third
D) Fourth
Answer:
D) Fourth
(The first three are four-sided shapes, while the fourth is a triangle.)
18. Identifying the Rotated Shape
Question:
Which shape looks exactly the same after rotating 180Β°?
A) π·
B) β¬
C) πΊ
D) ⬣
Answer:
B) β¬
(A square looks identical after rotating 180Β°.)
19. Grouping Based on Number of Sides
Question:
Which group contains only shapes with three sides?
A) πΊ π· β¬
B) πΊ πΊ πΊ
C) ⬣ β¬ πΊ
D) πΆ π» ⬑
Answer:
B) πΊ πΊ πΊ
(All these shapes are triangles, each having three sides.)
20. Identifying the Shape with the Most Curves
Question:
Which of these shapes has the most curved edges?
A) π΅
B) π·
C) πΆ
D) β¬
Answer:
A) π΅
(A circle has a fully curved edge, unlike the others with straight sides.)
21. Mirror Image Recognition
Question:
Which shape is the mirror image of π·?
A) π»
B) π·
C) πΊ
D) β¬
Answer:
B) π·
(A diamond remains the same in a mirror unless tilted.)
22. Identifying the Shape That Looks the Same in All Directions
Question:
Which shape looks exactly the same no matter how you rotate it?
A) ⬣
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅
(A circle looks the same in every direction.)
23. Grouping by Similar Patterns
Question:
Which two shapes belong in the same group based on straight edges only?
A) πΊ and π·
B) β¬ and β¬
C) π΅ and π·
D) πΆ and πΊ
Answer:
B) β¬ and β¬
(Both are four-sided shapes with only straight edges.)
24. Identifying the Hidden Shape
Question:
Which shape can be hidden inside a square when overlapped?
A) πΊ
B) π΅
C) π·
D) ⬣
Answer:
A) πΊ
(A triangle can fit inside a square when placed correctly.)
25. Finding the Shape That Completes the Pattern
Question:
Which shape should come next in the sequence?
πΊ π· πΊ π· ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
B) πΊ
(The pattern alternates between πΊ and π·.)
26. Finding the Odd One Out Based on Symmetry
Question:
Which shape does not belong in the group based on symmetry?
πΊ β¬ π΅ β¬
A) First
B) Second
C) Third
D) Fourth
Answer:
A) First
(A triangle has only one axis of symmetry, while others have multiple.)
27. Identifying a Shape That Cannot Be Formed by Combining Two Triangles
Question:
Which shape cannot be formed by combining two triangles?
A) β¬
B) π·
C) πΊ
D) ⬣
Answer:
D) ⬣
(A hexagon cannot be made by combining just two triangles.)
28. Identifying the Reversed Shape
Question:
Which shape is the mirror image of π»?
A) πΊ
B) π΅
C) π·
D) β¬
Answer:
A) πΊ
(The mirror image of a downward triangle is an upward triangle.)
29. Identifying the Shape That Looks Different When Rotated 90Β°
Question:
Which shape will look different when rotated 90Β°?
A) β¬
B) πΊ
C) π΅
D) ⬣
Answer:
B) πΊ
(A triangle changes orientation when rotated 90Β°.)
30. Completing the Shape Pattern
Question:
Which shape should replace the question mark?
π΅ π΅ π΄ π΅ ?
A) π΄
B) π΅
C) π·
D) β¬
Answer:
A) π΄
(The pattern follows one red shape after every three blue ones.)
31. Matching Shapes Based on Number of Corners
Question:
Which two shapes belong in the same group based on corners?
A) πΊ and π·
B) β¬ and β¬
C) π΅ and π·
D) πΆ and πΊ
Answer:
B) β¬ and β¬
(Both are squares/rectangles with four corners.)
32. Identifying the Shape with the Most Sides
Question:
Which shape has the most sides?
A) πΊ
B) β¬
C) ⬣
D) π·
Answer:
C) ⬣
(A hexagon has six sides, more than a triangle, square, or diamond.)
33. Finding the Missing Shape in a Pattern
Question:
Which shape should replace the question mark?
πΊ πΊ β¬ πΊ πΊ ?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
B) β¬
(The pattern repeats two triangles, then a square.)
34. Identifying the Shape That Changes When Flipped
Question:
Which shape looks different when flipped horizontally?
A) πΊ
B) π΅
C) π·
D) β¬
Answer:
C) π·
(A diamond flips to a different orientation, unlike a circle or square.)
35. Finding the Shape That Does Not Belong
Question:
Which shape does not fit with the others?
β¬ β¬ πΊ β¬
A) First
B) Second
C) Third
D) Fourth
Answer:
C) Third
(The first, second, and fourth are squares, while the third is a triangle.)
36. Matching Shapes Based on Rotational Symmetry
Question:
Which shape stays the same when rotated 90Β°?
A) β¬
B) π·
C) πΊ
D) ⬣
Answer:
A) β¬
(A square looks the same after rotating 90Β°.)
37. Identifying the Shape That Can Fit Inside a Circle
Question:
Which shape can be perfectly enclosed inside a circle?
A) π·
B) πΊ
C) β¬
D) π΅
Answer:
D) π΅
(A circle can perfectly enclose another circle.)
38. Finding the Shape That Completes the Series
Question:
Which shape should replace the question mark?
π΅ β¬ π΅ β¬ ?
A) β¬
B) π΅
C) π·
D) πΊ
Answer:
B) π΅
(The pattern alternates between a circle and a square.)
39. Identifying the Shape with the Most Lines of Symmetry
Question:
Which shape has the most lines of symmetry?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
C) π΅
(A circle has infinite lines of symmetry.)
40. Finding the Shape That Forms a New Shape When Combined
Question:
Which shape can be combined with another of the same shape to form a rectangle?
A) πΊ
B) π΅
C) π·
D) β¬
Answer:
A) πΊ
(Two triangles can combine to form a rectangle.)
41. Identifying the Shape That Can Tile a Surface Without Gaps
Question:
Which shape can be used to cover a surface completely without leaving gaps?
A) π΅
B) π·
C) β¬
D) πΊ
Answer:
C) β¬
(Squares can tile a surface perfectly without leaving gaps.)
42. Finding the Shape That Cannot Be Folded into a Cube
Question:
Which of these shapes cannot be folded into a cube?
A) β¬
B) πΊ
C) β¬
D) ⬣
Answer:
D) ⬣
(A hexagon cannot form a cube when folded.)
43. Identifying the Shape That Appears in a Shadow
Question:
If you shine a light on a sphere (π΅), what shape does its shadow form?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
C) π΅
(A sphereβs shadow is a circle when viewed from any angle.)
44. Finding the Shape That Can Be Made by Folding Paper Once
Question:
Which shape can be created by folding a square sheet of paper once?
A) πΊ
B) β¬
C) β¬
D) π΅
Answer:
A) πΊ
(A single fold along the diagonal makes a triangle.)
45. Identifying the Shape with the Least Number of Sides
Question:
Which shape has the fewest number of sides?
A) π·
B) πΊ
C) β¬
D) ⬣
Answer:
B) πΊ
(A triangle has three sides, fewer than any other option.)
46. Completing the Color and Shape Pattern
Question:
Which shape should replace the question mark?
π΅ π· π΅ β¬ π΅ ?
A) π·
B) πΊ
C) β¬
D) π΅
Answer:
C) β¬
(The pattern repeats: Circle β Diamond β Circle β Square β Circle β Square.)
47. Identifying the Shape That Forms a Star When Combined
Question:
Which shape can be combined with another of the same shape to form a star?
A) πΊ
B) π΅
C) β¬
D) β¬
Answer:
A) πΊ
(Two triangles can combine to form a star shape.)
48. Finding the Shape That Stays the Same in Any View
Question:
Which shape looks the same from any angle?
A) π΅
B) π·
C) πΊ
D) β¬
Answer:
A) π΅
(A circle or sphere looks the same from all directions.)
49. Identifying the Shape That Can Form a Pyramid
Question:
Which shape can be used as a base for a pyramid?
A) πΊ
B) π΅
C) β¬
D) β¬
Answer:
C) β¬
(A square base is common for pyramids.)
50. Finding the Shape That Can Be Split into Two Identical Shapes
Question:
Which shape can be split into two identical smaller shapes?
A) π·
B) β¬
C) π΅
D) β¬
Answer:
B) β¬
(A square can be divided into two identical rectangles or triangles.)
51. Identifying the Shape That Matches a Folded Paper Cutout
Question:
If you fold a square piece of paper in half and cut a triangle along the edge, what shape will it form when unfolded?
A) πΊ
B) β¬
C) π·
D) ⬣
Answer:
C) π·
(A triangle cut along the edge will form a diamond shape when unfolded symmetrically.)
52. Finding the Shape That Can Roll in a Straight Line
Question:
Which of these shapes can roll in a straight line?
A) π·
B) β¬
C) π΅
D) ⬣
Answer:
C) π΅
(A circle or sphere can roll smoothly in a straight line.)
53. Identifying the Shape That Can Stack Without Gaps
Question:
Which shape can be stacked without any gaps?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
B) β¬
(Squares or rectangles can stack perfectly without gaps.)
54. Finding the Shape That Can Be Split into Three Identical Parts
Question:
Which shape can be divided into three identical smaller shapes?
A) πΊ
B) β¬
C) π·
D) π΅
Answer:
A) πΊ
(A triangle can be divided into three smaller triangles.)
55. Identifying the Shape That Can Rotate 120Β° and Look the Same
Question:
Which shape looks the same when rotated 120Β°?
A) β¬
B) π·
C) πΊ
D) ⬣
Answer:
D) ⬣
(A hexagon looks identical every 120Β° rotation.)
56. Completing the Shape Rotation Pattern
Question:
Which shape should replace the question mark?
πΊ πΊ β¬ πΊ πΊ ?
A) πΊ
B) β¬
C) π·
D) π΅
Answer:
B) β¬
(The pattern follows Triangle β Triangle β Square.)
57. Identifying the Shape That Can Form a 3D Cube
Question:
Which shape can be folded into a 3D cube?
A) π·
B) β¬
C) π΅
D) πΊ
Answer:
B) β¬
(Six squares can fold into a cube.)
58. Finding the Shape That Has the Least Symmetry
Question:
Which shape has the fewest lines of symmetry?
A) π·
B) πΊ
C) β¬
D) π΅
Answer:
B) πΊ
(A scalene triangle has zero lines of symmetry.)
59. Identifying the Shape That Looks the Same Upside Down
Question:
Which shape looks the same when flipped upside down?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
C) π΅
(A circle looks the same from any angle.)
60. Finding the Shape That Can Be Cut into Four Equal Triangles
Question:
Which shape can be cut into four equal triangles?
A) π·
B) β¬
C) π΅
D) ⬣
Answer:
B) β¬
(A square can be divided diagonally twice to form four equal triangles.)
61. Identifying the Shape That Has the Most Diagonal Lines
Question:
Which shape has the most diagonals?
A) πΊ
B) β¬
C) π·
D) ⬣
Answer:
D) ⬣
(A hexagon has 9 diagonals, more than a square or triangle.)
62. Finding the Shape That Can Be Made Using Only Straight Lines
Question:
Which of these shapes can be made entirely of straight lines?
A) π·
B) π΅
C) ⬣
D) β¬
Answer:
A) π·, C) ⬣, and D) β¬
(Circles are the only shape that do not have straight lines.)
63. Identifying the Shape That Can Fold Into a 3D Pyramid
Question:
Which shape can be folded to create a 3D pyramid?
A) π·
B) β¬
C) πΊ
D) π΅
Answer:
C) πΊ
(Triangles can form a tetrahedral pyramid when folded.)
64. Completing the Shape Growth Pattern
Question:
Which shape should replace the question mark?
πΊ πΊβ¬ πΊβ¬β¬ ?
A) πΊβ¬β¬β¬
B) πΊβ¬β¬
C) β¬β¬β¬β¬
D) π·
Answer:
A) πΊβ¬β¬β¬
(The number of squares increases by one in each step.)
65. Identifying the Shape That Can Form a Honeycomb Structure
Question:
Which shape can be used to form a honeycomb pattern?
A) β¬
B) π·
C) πΊ
D) ⬣
Answer:
D) ⬣
(A hexagon is used in honeycomb patterns for its efficient packing.)
66. Finding the Shape That Creates a Star When Overlapped
Question:
Which two shapes can be overlapped to form a star?
A) β¬ and π·
B) πΊ and πΊ
C) π΅ and π΅
D) β¬ and β¬
Answer:
B) πΊ and πΊ
(Two overlapping triangles create a six-pointed star.)
67. Identifying the Shape That Can Form a Cylinder When Rotated
Question:
Which 2D shape can be rotated to create a cylinder?
A) π·
B) π΅
C) β¬
D) πΊ
Answer:
C) β¬
(A rectangle, when rotated, forms a cylinder.)
68. Finding the Shape That Can Fit Inside a Sphere
Question:
Which shape can be perfectly enclosed inside a sphere?
A) β¬
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅
(A sphere can be perfectly enclosed within another sphere.)
69. Identifying the Shape That Can Be Divided into Six Equal Triangles
Question:
Which shape can be divided into six equal triangles?
A) π·
B) β¬
C) π΅
D) ⬣
Answer:
D) ⬣
(A hexagon can be divided into six equal triangles.)
70. Completing the Shape Reflection Pattern
Question:
Which shape should replace the question mark in this mirror reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅
(A circle’s reflection is still a circle.)
71. Identifying the Shape That Can Be Folded Into a Cone
Question:
Which shape can be rolled into a cone?
A) π·
B) π΅
C) β¬
D) β
Answer:
D) β (Circle)
(A circular sheet can be rolled into a cone by cutting out a sector.)
72. Finding the Shape That Can Fit Inside a Cube Without Gaps
Question:
Which shape can fit inside a cube without leaving any empty space?
A) π΅
B) β¬
C) π·
D) πΊ
Answer:
B) β¬ (Square or Rectangle)
(A cube is made up of six squares, and smaller cubes can perfectly fill it.)
73. Identifying the Shape That Has the Most Faces in 3D
Question:
Which of these 3D shapes has the most faces?
A) Cube
B) Pyramid
C) Sphere
D) Hexagonal Prism
Answer:
D) Hexagonal Prism
(A hexagonal prism has 8 faces, more than a cube (6) or pyramid (5).)
74. Completing the Shape Expansion Pattern
Question:
Which shape should replace the question mark?
πΊ πΊβ¬ πΊβ¬β¬ ?
A) πΊβ¬β¬β¬
B) πΊβ¬β¬
C) β¬β¬β¬β¬
D) π·
Answer:
A) πΊβ¬β¬β¬
(The pattern adds one square in each step.)
Also read : Reasoning question on folding paper and cutting
75. Identifying the Shape That Forms a Sphere When Rotated
Question:
Which 2D shape forms a sphere when rotated?
A) πΊ
B) π΅
C) β¬
D) π·
Answer:
B) π΅ (Circle)
(A circle rotated in 3D forms a sphere.)
76. Finding the Shape That Is Not a Quadrilateral
Question:
Which shape is not a quadrilateral?
A) π·
B) β¬
C) πΊ
D) β¬
Answer:
C) πΊ (Triangle)
(A quadrilateral has 4 sides, but a triangle has only 3.)
77. Identifying the Shape That Can Tile a Floor Without Gaps
Question:
Which shape can be used to tile a floor without leaving gaps?
A) π·
B) πΊ
C) β¬
D) π΅
Answer:
C) β¬ (Square)
(Squares perfectly tile a surface without gaps.)
78. Finding the Shape That Forms a Cylinder When Rotated
Question:
Which 2D shape forms a cylinder when rotated?
A) πΊ
B) β¬
C) β¬
D) π΅
Answer:
C) β¬ (Rectangle)
(A rotated rectangle forms a cylinder.)
79. Identifying the Shape That Has No Straight Edges
Question:
Which shape has no straight edges?
A) π·
B) β¬
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circle has only curved edges.)
80. Completing the Symmetry Reflection Pattern
Question:
Which shape should replace the question mark in this symmetry reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circle remains the same after reflection.)
81. Identifying the Shape That Has the Most Lines of Symmetry
Question:
Which of these shapes has the most lines of symmetry?
A) πΊ (Equilateral Triangle)
B) β¬ (Square)
C) π΅ (Circle)
D) π· (Rhombus)
Answer:
C) π΅ (Circle)
(A circle has infinite lines of symmetry.)
82. Finding the Shape That Can Form a Pentagon When Combined
Question:
Which shape can be combined to create a pentagon?
A) β¬
B) π·
C) πΊ
D) π΅
Answer:
C) πΊ (Triangles)
(Five triangles can be arranged to form a pentagon.)
83. Identifying the Shape That Is Not a Polygon
Question:
Which of the following is NOT a polygon?
A) π·
B) π΅
C) β¬
D) ⬣
Answer:
B) π΅ (Circle)
(A polygon has straight sides, but a circle has a curved boundary.)
84. Completing the Shape Counting Pattern
Question:
Which number should replace the question mark?
πΊ (3 sides) β¬ (4 sides) π· (??)
A) 3
B) 4
C) 5
D) 6
Answer:
C) 5
(A pentagon has 5 sides.)
85. Identifying the Shape That Forms a Pyramid When Folded
Question:
Which shape can be folded into a pyramid?
A) β¬
B) πΊ
C) π·
D) π΅
Answer:
B) πΊ (Triangle)
(Triangles can form the sides of a pyramid.)
86. Finding the Shape That Can Tile a Surface Without Gaps
Question:
Which shape can be used to tile a floor without gaps?
A) πΊ
B) β¬
C) π·
D) π΅
Answer:
B) β¬ (Square)
(Squares tile a floor perfectly without leaving spaces.)
87. Identifying the Shape That Looks the Same When Rotated 180Β°
Question:
Which shape looks the same when rotated 180Β°?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
B) β¬ (Square)
(A square remains unchanged after a 180Β° rotation.)
88. Finding the Shape That Can Fit Inside a Sphere Without Gaps
Question:
Which shape can be perfectly enclosed inside a sphere?
A) πΊ
B) π΅
C) β¬
D) β¬
Answer:
B) π΅ (Sphere)
(A sphere fits perfectly inside another sphere.)
89. Completing the Shape Reflection Pattern
Question:
Which shape should replace the question mark in this mirror reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circleβs reflection is the same as the original.)
90. Identifying the Shape That Can Be Split into Six Equal Triangles
Question:
Which shape can be divided into six equal triangles?
A) π·
B) β¬
C) π΅
D) ⬣
Answer:
D) ⬣ (Hexagon)
(A hexagon can be divided into six identical triangles.)
91. Identifying the Shape That Can Be Formed by Stacking Three Squares
Question:
If three identical squares are stacked on top of each other, which 3D shape is formed?
A) Cube
B) Rectangular Prism
C) Pyramid
D) Cylinder
Answer:
B) Rectangular Prism
(Stacking three squares creates a rectangular prism.)
92. Finding the Shape That Can Be Divided into Two Equal Trapezoids
Question:
Which of these shapes can be split into two equal trapezoids?
A) π· (Rhombus)
B) β¬ (Square)
C) β¬ (Rectangle)
D) π΅ (Circle)
Answer:
C) β¬ (Rectangle)
(A rectangle can be cut diagonally into two trapezoids.)
93. Identifying the Shape That Forms a Sphere When Spun
Question:
Which 2D shape forms a sphere when rotated?
A) πΊ
B) π΅
C) β¬
D) β¬
Answer:
B) π΅ (Circle)
(Spinning a circle around its diameter creates a sphere.)
94. Completing the Shape Expansion Pattern
Question:
Which shape should replace the question mark?
πΊ β πΊβ¬ β πΊβ¬β¬ β ?
A) πΊβ¬β¬β¬
B) πΊβ¬β¬
C) β¬β¬β¬β¬
D) π·
Answer:
A) πΊβ¬β¬β¬
(The pattern adds one square in each step.)
95. Identifying the Shape That Looks the Same in a Mirror
Question:
Which shape remains unchanged when reflected in a mirror?
A) πΊ
B) β¬
C) π΅
D) π·
Answer:
C) π΅ (Circle)
(A circle always looks the same in a mirror.)
96. Finding the Shape That Can Be Folded Into a Cube
Question:
Which shape can be folded to form a cube?
A) β¬ (Square Net)
B) π΅ (Circle)
C) π· (Rhombus)
D) πΊ (Triangle)
Answer:
A) β¬ (Square Net)
(A cube can be folded from a net of six squares.)
97. Identifying the Shape That Can Be Stacked to Form a Cone
Question:
Which shape can be stacked or folded into a cone?
A) π· (Rhombus)
B) π΅ (Circle)
C) β¬ (Rectangle)
D) β¬ (Square)
Answer:
B) π΅ (Circle)
(A sector of a circle can be folded into a cone.)
98. Finding the Shape That Can Be Formed by Combining Two Triangles
Question:
Which shape is formed when two identical triangles are combined along their longest side?
A) πΊ (Triangle)
B) β¬ (Rectangle)
C) π· (Rhombus)
D) π΅ (Circle)
Answer:
C) π· (Rhombus)
(Two identical triangles joined along their longest side form a rhombus.)
99. Identifying the Shape That Forms a Cylinder When Folded
Question:
Which 2D shape can be rolled into a cylinder?
A) πΊ
B) β¬
C) β¬
D) π΅
Answer:
C) β¬ (Rectangle)
(A rolled-up rectangle forms a cylinder.)
100. Completing the Shape Reflection Pattern
Question:
Which shape should replace the question mark in this symmetry reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circle remains the same after reflection.)
101. Identifying the Shape That Has the Most Edges
Question:
Which 3D shape has the most edges?
A) Cube
B) Cylinder
C) Hexagonal Prism
D) Sphere
Answer:
C) Hexagonal Prism
(A hexagonal prism has 18 edges β 6 on the top, 6 on the bottom, and 6 vertical edges.)
102. Finding the Shape That Can Fit Inside a Triangle Without Gaps
Question:
Which shape can fit inside a triangle without leaving any empty space?
A) Circle
B) Another Triangle
C) Square
D) Pentagon
Answer:
B) Another Triangle
(Triangles can be subdivided into smaller triangles without gaps.)
103. Identifying the Shape That Forms a Cube When Stacked
Question:
Which shape can be stacked to create a cube?
A) π΅ (Circle)
B) β¬ (Square)
C) πΊ (Triangle)
D) π· (Rhombus)
Answer:
B) β¬ (Square)
(Squares stacked in three dimensions form a cube.)
104. Completing the Shape Pattern
Question:
Which shape should replace the question mark?
πΊ β πΊβ¬ β πΊβ¬β¬ β ?
A) πΊβ¬β¬β¬
B) πΊβ¬β¬
C) β¬β¬β¬β¬
D) π·
Answer:
A) πΊβ¬β¬β¬
(The pattern adds one square in each step.)
105. Identifying the Shape That Is Not a Polygon
Question:
Which of the following is not a polygon?
A) π· (Rhombus)
B) π΅ (Circle)
C) β¬ (Square)
D) ⬣ (Hexagon)
Answer:
B) π΅ (Circle)
(A polygon has straight sides, while a circle has no sides.)
106. Finding the Shape That Can Tile a Surface Without Gaps
Question:
Which shape can be used to tile a floor without gaps?
A) πΊ (Triangle)
B) β¬ (Square)
C) π· (Rhombus)
D) π΅ (Circle)
Answer:
B) β¬ (Square)
(Squares perfectly tile a surface without leaving spaces.)
107. Identifying the Shape That Looks the Same When Rotated 180Β°
Question:
Which shape looks the same when rotated 180Β°?
A) πΊ (Triangle)
B) β¬ (Square)
C) π΅ (Circle)
D) π· (Rhombus)
Answer:
C) π΅ (Circle)
(A circle looks the same from any angle.)
108. Finding the Shape That Can Be Folded Into a Pyramid
Question:
Which shape can be folded into a pyramid?
A) β¬ (Square)
B) πΊ (Triangle)
C) π· (Rhombus)
D) π΅ (Circle)
Answer:
B) πΊ (Triangle)
(Triangles form the faces of a pyramid.)
109. Identifying the Shape That Can Be Split Into Six Equal Triangles
Question:
Which shape can be divided into six equal triangles?
A) π· (Rhombus)
B) β¬ (Rectangle)
C) π΅ (Circle)
D) ⬣ (Hexagon)
Answer:
D) ⬣ (Hexagon)
(A hexagon can be divided into six identical triangles.)
110. Completing the Symmetry Reflection Pattern
Question:
Which shape should replace the question mark in this symmetry reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circleβs reflection is the same as the original.)
111. Identifying the Shape That Has the Least Symmetry
Question:
Which of these shapes has the least number of lines of symmetry?
A) β¬ (Square)
B) π· (Rhombus)
C) πΊ (Scalene Triangle)
D) π΅ (Circle)
Answer:
C) πΊ (Scalene Triangle)
(A scalene triangle has no lines of symmetry.)
112. Finding the Shape That Can Be Formed by Folding a Rectangle
Question:
If you fold a rectangle in half along its longest side, what shape do you get?
A) πΊ (Triangle)
B) β¬ (Square)
C) π· (Rhombus)
D) β¬ (Smaller Rectangle)
Answer:
D) β¬ (Smaller Rectangle)
(Folding a rectangle along its longest side gives a smaller rectangle.)
113. Identifying the Shape That Forms a Cone When Rolled
Question:
Which shape can be rolled into a cone?
A) π΅ (Circle)
B) β¬ (Square)
C) β¬ (Rectangle)
D) πΊ (Triangle)
Answer:
D) πΊ (Triangle)
(A triangle can be rolled into a cone-like shape when curved.)
114. Completing the Shape Expansion Pattern
Question:
Which shape should replace the question mark?
πΊ β πΊπΊ β πΊπΊπΊ β ?
A) πΊπΊπΊπΊ
B) π·
C) β¬
D) π΅
Answer:
A) πΊπΊπΊπΊ
(The pattern adds one triangle in each step.)
115. Identifying the Shape That Cannot Be Folded Into a Cube
Question:
Which of these shapes cannot be folded into a cube?
A) Six squares
B) A single large rectangle
C) A net of six connected squares
D) A 3D framework of edges
Answer:
B) A single large rectangle
(A single rectangle cannot be folded into a cube.)
116. Finding the Shape That Has the Most Faces in 3D
Question:
Which of these 3D shapes has the most faces?
A) Cube
B) Tetrahedron
C) Dodecahedron
D) Sphere
Answer:
C) Dodecahedron
(A dodecahedron has 12 pentagonal faces.)
117. Identifying the Shape That Can Be Divided Into Four Equal Triangles
Question:
Which shape can be divided into four equal triangles?
A) π· (Rhombus)
B) β¬ (Rectangle)
C) π΅ (Circle)
D) πΊ (Equilateral Triangle)
Answer:
D) πΊ (Equilateral Triangle)
(A large equilateral triangle can be subdivided into four smaller ones.)
118. Completing the Shape Rotation Pattern
Question:
Which shape should replace the question mark?
β¬ β πΊ β π· β ?
A) ⬣
B) π΅
C) β¬
D) β¬
Answer:
A) ⬣ (Hexagon)
(The pattern follows increasing sides in geometric shapes.)
119. Identifying the Shape That Forms a Cylinder When Folded
Question:
Which 2D shape can be rolled into a cylinder?
A) πΊ (Triangle)
B) β¬ (Rectangle)
C) π΅ (Circle)
D) β¬ (Square)
Answer:
B) β¬ (Rectangle)
(A rectangle can be rolled into a cylinder by joining opposite edges.)
120. Completing the Shape Reflection Pattern
Question:
Which shape should replace the question mark in this mirror reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circleβs reflection is the same as the original.)
121. Identifying the Shape That Has the Most Vertices
Question:
Which 2D shape has the most vertices?
A) Triangle
B) Pentagon
C) Octagon
D) Hexagon
Answer:
C) Octagon
(An octagon has 8 vertices, which is more than the other shapes.)
122. Finding the Shape That Can Be Folded Into a Cone
Question:
Which shape can be rolled into a cone?
A) β¬ (Rectangle)
B) π΅ (Circle)
C) πΊ (Triangle)
D) π (Sector of a Circle)
Answer:
D) π (Sector of a Circle)
(A sector of a circle can be folded into a cone.)
123. Identifying the Shape That Remains the Same When Rotated 90Β°
Question:
Which of these shapes looks the same when rotated 90Β°?
A) β¬ (Square)
B) πΊ (Triangle)
C) ⬣ (Hexagon)
D) π΅ (Circle)
Answer:
D) π΅ (Circle)
(A circle looks the same from any angle.)
124. Completing the Shape Expansion Pattern
Question:
Which shape should replace the question mark?
πΊ β πΊπΊ β πΊπΊπΊ β ?
A) πΊπΊπΊπΊ
B) π·
C) β¬
D) π΅
Answer:
A) πΊπΊπΊπΊ
(The pattern adds one triangle in each step.)
125. Identifying the Shape That Can Be Used to Tile a Surface Without Gaps
Question:
Which of these shapes can tile a floor without any gaps?
A) πΊ (Triangle)
B) β¬ (Square)
C) π· (Rhombus)
D) π΅ (Circle)
Answer:
B) β¬ (Square)
(Squares fit perfectly without gaps.)
126. Finding the Shape That Has the Most Faces in 3D
Question:
Which of these 3D shapes has the most faces?
A) Cube
B) Tetrahedron
C) Dodecahedron
D) Sphere
Answer:
C) Dodecahedron
(A dodecahedron has 12 pentagonal faces.)
127. Identifying the Shape That Can Be Divided into Four Equal Triangles
Question:
Which shape can be divided into four equal triangles?
A) π· (Rhombus)
B) β¬ (Rectangle)
C) π΅ (Circle)
D) πΊ (Equilateral Triangle)
Answer:
D) πΊ (Equilateral Triangle)
(A large equilateral triangle can be subdivided into four smaller ones.)
128. Completing the Shape Rotation Pattern
Question:
Which shape should replace the question mark?
β¬ β πΊ β π· β ?
A) ⬣
B) π΅
C) β¬
D) β¬
Answer:
A) ⬣ (Hexagon)
(The pattern follows increasing sides in geometric shapes.)
129. Identifying the Shape That Can Be Folded Into a Cube
Question:
Which shape can be folded into a cube?
A) β¬ (Square Net)
B) π΅ (Circle)
C) π· (Rhombus)
D) πΊ (Triangle)
Answer:
A) β¬ (Square Net)
(A cube can be folded from a net of six squares.)
130. Completing the Shape Reflection Pattern
Question:
Which shape should replace the question mark in this mirror reflection?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circleβs reflection is the same as the original.)
131. Identifying the Shape with the Fewest Sides
Question:
Which of the following 2D shapes has the fewest sides?
A) Hexagon
B) Triangle
C) Pentagon
D) Square
Answer:
B) Triangle
(A triangle has 3 sides, which is the least among the options.)
132. Finding the Shape That Can Be Folded Into a Cylinder
Question:
Which 2D shape can be rolled into a cylinder?
A) πΊ (Triangle)
B) β¬ (Rectangle)
C) π΅ (Circle)
D) β¬ (Square)
Answer:
B) β¬ (Rectangle)
(A rectangle can be rolled into a cylinder by joining opposite edges.)
133. Completing the Shape Sequence
Question:
Which shape should replace the question mark?
πΊ β πΊπΊ β πΊπΊπΊ β ?
A) πΊπΊπΊπΊ
B) π·
C) β¬
D) π΅
Answer:
A) πΊπΊπΊπΊ
(The pattern adds one triangle in each step.)
134. Identifying the Shape That Has the Most Symmetry
Question:
Which of the following shapes has the most lines of symmetry?
A) β¬ (Square)
B) π· (Rhombus)
C) πΊ (Triangle)
D) π΅ (Circle)
Answer:
D) π΅ (Circle)
(A circle has infinite lines of symmetry.)
135. Finding the Shape That Can Be Tiled Without Gaps
Question:
Which shape can be used to tile a floor without any gaps?
A) π΅ (Circle)
B) β¬ (Square)
C) π· (Rhombus)
D) πΊ (Triangle)
Answer:
B) β¬ (Square)
(Squares fit perfectly without gaps.)
136. Identifying the Shape That Forms a Pyramid When Folded
Question:
Which shape can be folded into a pyramid?
A) β¬ (Square)
B) πΊ (Triangle)
C) π· (Rhombus)
D) π΅ (Circle)
Answer:
B) πΊ (Triangle)
(A pyramid is formed using triangles as faces.)
137. Completing the Mirror Image Pattern
Question:
Which shape should replace the question mark?
πΊ | πΊ
β¬ | β¬
π΅ | ?
A) π·
B) πΊ
C) π΅
D) β¬
Answer:
C) π΅ (Circle)
(A circleβs reflection is the same as the original.)
138. Finding the Shape That Has the Most Faces in 3D
Question:
Which of these 3D shapes has the most faces?
A) Cube
B) Tetrahedron
C) Dodecahedron
D) Sphere
Answer:
C) Dodecahedron
(A dodecahedron has 12 pentagonal faces.)
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