1. The problem involves understanding the pattern and distribution of values in sequences and their algebraic relations. 2. We observe sequences like $0 = 1 \times 0 = 3 - 2$, $1 = 1 \times 1 = 3 - 2$, $0 = 0 \times 6 = 3 - 2$, $1 = 0 \times 13 = 99 - 88$. 3. The key formula used here is the distributive property: $a \times (b - c) = a \times b - a \times c$. 4. For example, $1 = 1 \times 1 = 2 - 1$ shows that multiplying 1 by 1 equals the difference $2 - 1$. 5. Similarly, $0 = 1 \times 0 = 2 - 1$ shows multiplication by zero results in zero, matching the difference $2 - 1$. 6. The sequences $0,1,6,13$ correspond to values where differences like $3 - 2$ and $99 - 88$ are calculated, showing consistent subtraction results. 7. The property of distribution over doubling is highlighted, meaning multiplication distributes over addition or subtraction. 8. The relation $c = 1 - 0$ and $a = 0 : \div 90$ indicates simple subtraction and division operations. 9. The graph with points and lines labeled shows connections between positions $0,1,6,13$ with arrows indicating the sequence flow. 10. The matrix with checks and crosses and values like $V, v, x = 1$ indicates logical or algebraic conditions being tested. 11. The multiplication $4 \times 2 = 8$ is a straightforward arithmetic fact reinforcing multiplication rules. 12. Overall, the problem demonstrates the distributive property and basic arithmetic operations within sequences and matrices. Final answer: The distributive property holds for the given sequences and operations, confirming $a \times (b - c) = a \times b - a \times c$ and the arithmetic relations shown.