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Cube & Dice - Beginner Level: time management BEGINNER

Boost your speed and accuracy with this beginner friendly 📈 worksheet. Worksheet 5 of 30 presents 20 beginner-level cube & dice problems. Focus on time management while practicing exam preparation, competitive exams, aptitude training. Difficulty: foundational concepts and basic patterns. Perfect for entry-level test takers.

📝 Worksheet 5 of 30 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Beginner level

What you'll learn in this worksheet:
Your progress through Cube & Dice
Worksheet 5 of 30 (16% complete)

Question 1

Three faces of a custom dice meet at a vertex: 3, 6, and 2. Which face is opposite to face 3?
In a custom dice, opposite pairs are fixed.
Face 3 is opposite to face 1.
At the vertex where 3, 6, and 2 meet, the opposite face 1 is not visible.
vertex, opposite, 3d-reasoning, advanced

Question 2

Three faces of a alternate dice meet at a vertex: 1, 5, and 2. Which face is opposite to face 1?
In a alternate dice, opposite pairs are fixed.
Face 1 is opposite to face 4.
At the vertex where 1, 5, and 2 meet, the opposite face 4 is not visible.
vertex, opposite, 3d-reasoning, advanced

Question 3

In a custom dice, if face 1 is visible, which of the following CANNOT be adjacent to it?
In a custom dice, opposite faces are never adjacent.
Face 1 is opposite to face 3.
Therefore, Face 3 cannot be adjacent to 1.
adjacent, faces, basic

Question 4

Three faces of a standard dice meet at a vertex: 5, 1, and 4. Which face is opposite to face 5?
In a standard dice, opposite pairs are fixed.
Face 5 is opposite to face 2.
At the vertex where 5, 1, and 4 meet, the opposite face 2 is not visible.
vertex, opposite, 3d-reasoning, advanced

Question 5

Two views of a alternate dice are shown: View 1: Top=6, Front=2 View 2: Top=5, Front=4 Which face is opposite to face 6?
In a alternate dice, opposite pairs are: 1↔4, 2↔3, 5↔6.
Face 6 is opposite to face 5.
opposite, multiple-views, deduction

Question 6

Two views of a alternate dice are shown: View 1: Top=1, Front=2 View 2: Top=6, Front=3 Which face is opposite to face 1?
In a alternate dice, opposite pairs are: 1↔4, 2↔3, 5↔6.
Face 1 is opposite to face 4.
opposite, multiple-views, deduction

Question 7

Two views of a alternate dice are shown: View 1: Top=3, Front=5 View 2: Top=4, Front=6 Which face is opposite to face 3?
In a alternate dice, opposite pairs are: 1↔4, 2↔3, 5↔6.
Face 3 is opposite to face 2.
opposite, multiple-views, deduction

Question 8

Which dice configuration matches this net? Dice Net154263
This net forms a custom dice. When folded, opposite faces are: 1↔3, 2↔5, 4↔6. In the net, opposite faces are never adjacent.
net, unfolding, spatial, basic

Question 9

Which dice configuration matches this net? Dice Net524163
This net forms a custom dice. When folded, opposite faces are: 1↔3, 2↔5, 4↔6. In the net, opposite faces are never adjacent.
net, unfolding, spatial, basic

Question 10

In a alternate dice, if face 3 is visible, which of the following CANNOT be adjacent to it?
In a alternate dice, opposite faces are never adjacent.
Face 3 is opposite to face 2.
Therefore, Face 2 cannot be adjacent to 3.
adjacent, faces, basic

Question 11

In a alternate dice, opposite faces sum to 7. 3 dice arranged in a horizontal line. What is the sum of numbers on all visible faces?
Total sum on 3 dice = 3 × 21 = 63
Hidden faces = 7
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 7 × 3.5 = 24.5
Visible sum = 63 - 24.5 = 38
multiple-dice, summation, visible-faces, advanced

Question 12

In a standard dice, opposite faces sum to 7. 2 dice stacked vertically. What is the sum of numbers on all visible faces?
Total sum on 2 dice = 2 × 21 = 42
Hidden faces = 4
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 4 × 3.5 = 14.0
Visible sum = 42 - 14.0 = 28
multiple-dice, summation, visible-faces, advanced

Question 13

Which dice configuration matches this net? Dice Net314652
This net forms a standard dice. When folded, opposite faces are: 1↔6, 2↔5, 3↔4. In the net, opposite faces are never adjacent.
net, unfolding, spatial, basic

Question 14

In a custom dice, opposite faces sum to 7. 2 dice arranged in a horizontal line. What is the sum of numbers on all visible faces?
Total sum on 2 dice = 2 × 21 = 42
Hidden faces = 4
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 4 × 3.5 = 14.0
Visible sum = 42 - 14.0 = 28
multiple-dice, summation, visible-faces, advanced

Question 15

A custom dice starts with: • Top: 1, Front: 2 It is rotated: rotate clockwise → rotate forward → rotate backward Current Orientation1Top4Front2Right What number is on the TOP face after these rotations?
Initial: Top=1, Front=2
Rotation sequence: C → F → B
After applying all rotations, Top=1, Front=4, Right=2
rotation, sequence, orientation

Question 16

In a alternate dice, opposite faces sum to 7. 3 dice in a rectangular arrangement. What is the sum of numbers on all visible faces?
Total sum on 3 dice = 3 × 21 = 63
Hidden faces = 10
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 10 × 3.5 = 35.0
Visible sum = 63 - 35.0 = 28
multiple-dice, summation, visible-faces, advanced

Question 17

In a alternate dice, opposite faces sum to 7. 5 dice arranged in a horizontal line. What is the sum of numbers on all visible faces?
Total sum on 5 dice = 5 × 21 = 105
Hidden faces = 13
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 13 × 3.5 = 45.5
Visible sum = 105 - 45.5 = 59
multiple-dice, summation, visible-faces, advanced

Question 18

In a alternate dice, if face 5 is visible, which of the following CANNOT be adjacent to it?
In a alternate dice, opposite faces are never adjacent.
Face 5 is opposite to face 6.
Therefore, Face 6 cannot be adjacent to 5.
adjacent, faces, basic

Question 19

In a custom dice, opposite faces sum to 7. 3 dice in a rectangular arrangement. What is the sum of numbers on all visible faces?
Total sum on 3 dice = 3 × 21 = 63
Hidden faces = 10
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 10 × 3.5 = 35.0
Visible sum = 63 - 35.0 = 28
multiple-dice, summation, visible-faces, advanced

Question 20

In a custom dice, opposite faces sum to 7. 3 dice in a rectangular arrangement. What is the sum of numbers on all visible faces?
Total sum on 3 dice = 3 × 21 = 63
Hidden faces = 10
Each hidden face has its opposite hidden (sum = 7)
Hidden sum = 10 × 3.5 = 35.0
Visible sum = 63 - 35.0 = 28
multiple-dice, summation, visible-faces, advanced
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