Question 1

You fold a square paper in half. How many edges does the folded paper have?

Question 2

Imagine a dice. If the side showing 1 is on the top, which number is at the bottom?

Question 3

If you rotate a rectangle 90 degrees, what shape does it become?

Question 4

You are facing north and turn 90 degrees to your right. Which direction are you now facing?

Question 5

If you stand in front of a mirror and raise your left hand, which hand does the reflection raise?

Question 6

If you were to stack 5 cubes of the same size on top of each other, how many faces would be touching another face?

Question 7

You are standing on the corner of a cube. If you wanted to touch the three adjacent corners without lifting your hand, how many moves would it take?

Question 8

You are in a hexagonal room. If you walk forward to the opposite wall and then take a right, how many walls will you pass before you reach your starting point?

Question 9

You have a triangular pyramid (a tetrahedron). If you slice it horizontally, how many new faces will you have on the resulting upper piece?

Question 10

You fold a piece of paper in half and then in half again. If you make a single cut perpendicular to the folded edge, how many cuts will appear when you unfold the paper?

Question 11

If you fold a square paper diagonally and then fold it diagonally again, how many triangles will be visible when looking at the paper from above?

Question 12

Imagine a cylindrical soda can. If you slice it vertically from top to bottom, the exposed inner surface will have the shape of:

Question 13

You place a cube inside a sphere so that each vertex of the cube touches the sphere's interior. Which of the following statements is true?

Question 14

You have a solid rectangular prism (a box). If you slice it diagonally from one corner of the top face to the opposite corner of the bottom face, how many pieces will you have?

Question 15

If you have a cone and you slice it horizontally halfway up, the shape of the exposed section is a:

Question 16

If you have a tetrahedron (a pyramid with a triangular base) and slice it horizontally near the base, the exposed section would be a:

Question 17

You rotate a rectangle 90 degrees. The shape's orientation has changed, but its area:

Question 18

Imagine folding a 2D cut-out shape of a half-moon to form a 3D object. Which shape are you most likely to get?

Question 19

If a ladder is leaning against a wall, making a 45-degree angle with the ground, which statement is true?

Question 20

Imagine you have a square piece of paper. You fold it diagonally, and then fold it diagonally again. How many triangles will you see on the folded paper?

Question 21

When you look at the world map, if you move from the UK towards the east and go past Japan, you'll eventually end up:

Question 22

If you rotate a capital letter "L" 90 degrees clockwise, it will look like:

Question 23

Imagine folding a flat, 2D shape of a semi-circle. What 3D object would it most resemble when the flat edges are connected?

Question 24

Which geometric shape has more faces: a cube or a rectangular prism?

Question 25

If a square has an area of 49 square metres, what would be its perimeter?

Question 26

When a 3D object is displayed in a 2D perspective (like on paper), which of the following is most likely to be lost?

Question 27

If you see an analog clock showing 3:15, what is the angle between the hour and minute hands?

Question 28

If you start with a 2D circle and stretch it vertically, which shape will you obtain?

Question 29

In a 3x3 grid, how many squares (of any size) can be formed?

Question 30

If you have a 3D cube and slice it horizontally in the middle, how many faces will each half have?