📐 geometry

1. **State the problem:** Calculate the total area of a compound figure shaped like a spaceship composed of a red triangle, a blue rectangle, two yellow right triangles, and a blue

1. **State the problem:** We need to find the area and perimeter of an irregular polygon drawn on a grid where each square measures 2 cm by 2 cm. 2. **Understand the grid and shape

1. **Énoncé du problème :** Soit un triangle ABC et une translation $t$ qui transforme le point $A$ en $C$.

1. **State the problem:** Find the surface area of a triangular pyramid (tetrahedron) with a triangular base of sides 8 m, 8 m, and 6.9 m, and slant heights (heights of the triangu

1. **State the problem:** Find the total area of the composite figure consisting of a rectangle on the left and a polygon on the right. 2. **Identify shapes and dimensions:**

1. **State the problem:** Find the area of the composite figure with given side lengths: 8 ft, 4 ft, 6 ft, 10 ft, 2 ft, 8 ft, and 11 ft. 2. **Approach:** Break the figure into simp

1. The problem asks to find the missing sides of a triangle or geometric figure, but no specific figure or side lengths are given. 2. To find missing sides, we typically use formul

1. **State the problem:** We need to find the perimeter of an irregular "C"-shaped polygon with sides 11 cm, 4 cm, 6 cm, 3 cm, and 20 cm. 2. **Recall the formula for perimeter:** T

1. **Problem statement:** Calculate the area and perimeter of different types of triangles using the given formulas. 2. **General triangle:**

1. **Problem 1: Find the area of the triangle with base 11 in and height 8 in.** 2. The formula for the area of a triangle is:

1. **Stating the problem:** We have a right triangle ABC with AB = 15 cm (base) and AC = 10 cm (height). Inside it, a square AEFD is inscribed with vertex A common to the triangle,

1. **Stating the problem:** Vi har et blomsterbed som består av et rektangel og en likebeinet trekant. Lengden på rektangelet er dobbelt så lang som bredden, som vi kaller $s$. Vi

1. **Problem statement:** In rectangle ABCD, with right angles at B and C, points B, K, and C lie on one side such that BK = 30 and KC = 10. We need to find the length of diagonal

1. **Problem Statement:** We have a figure P with points A(2,4), B(4,4), C(6,4), and D(1,2). The figure undergoes a transformation to image Q with points A'(4,2), B'(4,4), C'(4,16)

1. **Problem 1: Draw and reflect triangle ABC** - Given vertices: A(-5,-2), B(-3,-4), C(-1,-2).

1. **Problem Statement:** We have two parallel red lines sloping upwards from left to right, and a green line crossing both red lines diagonally from top right to bottom left. Poin

1. **State the problem:** We need to find the difference between the areas of a square and a rectangle. The square has side lengths of 15 meters each. The rectangle has the same he

1. **Stating the problem:** Find the value of $x$ in the triangle where the angles are given as $(9x + 8)^\circ$, $(10x)^\circ$, and $(8x + 10)^\circ$ and their sum is $180^\circ$.

1. The problem asks for the perimeter of a semicircle with radius 3 cm. 2. The perimeter of a semicircle consists of the curved part plus the diameter.

1. **Problem 13:** If a triangle is acute, then it is an equilateral triangle. - An acute triangle is one where all three angles are less than 90 degrees.

1. **Problem statement:** We have a right-angled triangle with points R, T, Q, and S. Segments RS and SQ are given as expressions in terms of $x$: $RS = 3x + 2$ and $SQ = 5x - 8$.