1. The problem states a series of four "X" shaped figures each with numbers at different vertices and intersections. 2. For each "X", we may infer relationships between the numbers based on proportional reasoning or algebraic relations connecting top-left, top-right, middle horizontal, bottom-left, and bottom-right positions. 3. Assuming the "X" shape represents intersecting lines such that the products of opposite numbers are equal (a typical property in proportional reasoning puzzles), we set up equations: - Top-left "X": $3 \times 5 = 4 \times 5$; check if $15 = 20$, not true, so might consider sums instead or other logic. - From the first "X", verify if $3 + 5 = 2 + 5 + 4$; $8 = 11$, not true either. 4. Moving to other "X"s, for Top-right "X", check product: $5 \times 6 = 5 \times 3$; $30 = 15$, no. 5. Without more explicit instructions or relationships, the key step is to interpret what property holds in these "X" shapes. Often in such puzzles, the products or sums of pairs across intersections are equal. 6. For Bottom-left "X": $2 \times 4 = 3 \times x$ (where $x$ is missing?), we can use given values to solve for missing numbers if any. 7. For Bottom-right "X", given $7, 5, 6$, if $7 \times 6 = 5 \times x$, solve accordingly. 8. Since the problem lacks explicit question or missing numbers, the best help is to confirm the logic: - Typically, if two intersecting lines form an "X", the products of the numbers opposite each other should be equal. - Equate products of opposite segments for each figure: $$ \text{Top-left: }3 \times 5 = 4 \times 5$$ $$ \text{Top-right: }5 \times 6 = 5 \times 3$$ $$ \text{Bottom-left: }2 \times 4 = 3 \times ?$$ $$ \text{Bottom-right: }7 \times 6 = 5 \times ?$$ 9. Substitute known values to solve for missing variables if needed. 10. In conclusion, verify or specify the target variable or missing number. Given limited details, if you want to find missing numbers by products: - Bottom-left "X": $2 \times 4 = 3 \times x$ gives $x = \frac{8}{3} \approx 2.67$ - Bottom-right "X": $7 \times 6 = 5 \times y$ gives $y = \frac{42}{5} = 8.4$ Thus missing values if any are $2.67$ and $8.4$ respectively. If you provide specific questions or missing parts, I can solve precisely.