📐 geometry

1. **Problem Statement:** Find the angle formed between the diagonals of a rhombus. 2. **Key Properties:** A rhombus is a quadrilateral with all sides equal in length. Its diagonal

1. **Problem Statement:** We are given a parallelogram ABCD with diagonals AC and BD intersecting at point O. The diagonal BD is divided into segments BO and OD, where BO = $7x + 4

1. **Problem statement:** We have a square ABCD with diagonals AC and BD intersecting at point O, the center of the square. Given that \(\overline{OD} = 18\) cm, we need to find th

1. **Problem statement:** We have a circle with center $O$ and points $A, B, C, D, E$ on the circumference. $EC$ is a diameter. Given angles are $\angle O\hat{B}A = 80^\circ$, $\an

1. **Stating the problem:** We have a 3D box with dimensions: length = 12.50 m, width = 10.50 m, height varies with 50 cm on the front side and 70 cm on the back side, and vertical

1. The problem is to determine if the given sets of three numbers can represent the sides of a triangle by using the triangle inequality theorem. 2. The triangle inequality theorem

1. **Stating the problem:** We have a 3D rectangular prism with dimensions given as: - Length (front and top horizontal edges): $12.50$ meters

1. **Stating the problem:** We need to find the volume $V$ of a three-dimensional rectangular prism (parallelepiped) with given dimensions: length = 12.50 m, width = 10.50 m, and h

1. Let's clarify what a construction means in math problems.\n2. A construction typically involves creating geometric figures using tools like a compass and straightedge.\n3. If yo

1. **Problem 1 (Fig. 7.47):** Find the value of $x$ for which $DE \parallel AB$. 2. **Problem 2 (Fig. 7.48):** Given $AB \parallel CD$, find the value of $x$.

1. The problem asks to find the measure of angle $\angle LMN$ formed by two intersecting lines at vertex $M$. 2. To find the measure of an angle formed by two lines, we typically u

1. **Problem Statement:** Find the measure of the angle formed between two rays originating from the same point, where one ray points horizontally to the right and the other points

1. The problem is to find the measure of an angle, but no specific details or context are given. 2. To find the measure of an angle, we typically use geometric rules, trigonometric

1. The problem describes an angle formed by two rays sharing a common endpoint, with one ray horizontal to the right and the other ray diagonally upward to the right. 2. To find th

1. **Stating the problem:** We are given an angle formed by two rays: one pointing horizontally to the left and the other diagonally upward to the right. We want to analyze or find

1. Let's start by stating the problem: Can points be any numbers when plotting on a graph? 2. In coordinate geometry, a point is represented as an ordered pair $(x, y)$ where $x$ a

1. **Problem statement:** We need to find the measure of angle $\angle Z$ in triangle $\triangle DFZ$ where side $DF=4$, side $DZ=7$, and angle $\angle F$ is a right angle (90 degr

1. **Problem Statement:** We are given a right triangle with vertices D, P, and Z. Side DP = 4, side DZ = 7, and angle P is a right angle (90 degrees). We need to find the measure

1. **Problem statement:** We need to find the measure of angle $\angle Z$ in a right triangle $\triangle ACZ$ where $AZ = 9$ units (vertical leg), $CZ = 10$ units (hypotenuse), and

1. **State the problem:** We need to find the size of angle $HBG$ in a cuboid where $BH = 28$ cm and $BG = 21$ cm. 2. **Understand the geometry:** In a cuboid, edges meeting at a v

1. The problem involves analyzing geometric shapes with given dimensions: a rectangle, a square with an inscribed circle, another rectangle with a quadrant curve, and a right trian