1. The problem involves understanding the properties of the given geometric figures: a rectangle NPQO, a parallelogram RSTU, and two right triangles WVX and XYZ. 2. In the rectangle NPQO, all angles are right angles ($90^\circ$), and opposite sides are equal and parallel. The diagonal NQ is drawn with a midpoint marked, indicating that the diagonal bisects each other. 3. For the parallelogram RSTU, opposite sides are equal and parallel, and opposite angles are equal. The diagonal RT is drawn, which bisects the parallelogram into two congruent triangles. 4. In the two right triangles WVX and XYZ, right angles are at W and Y respectively. The segments VX and ZX are marked equal, and X is the midpoint on line WY, indicating that X divides WY into two equal parts. 5. Important rules: - In rectangles, diagonals are equal and bisect each other. - In parallelograms, diagonals bisect each other but are not necessarily equal. - In right triangles, the right angle is $90^\circ$. - Midpoints divide segments into two equal parts. 6. Using these properties, we can analyze side lengths and angle measures based on the markings and given information. Final conclusion: The sides and angles are located as per the properties of rectangles, parallelograms, and right triangles with midpoints and equal segments as described.