1.
How many sides does the triangle have?
Correct Answer
A. 3
Explanation
A triangle is a fundamental geometric shape that has three sides. Each of these sides connects at three vertices, forming three angles. The sum of the interior angles of a triangle is always 180 degrees. Triangles can be classified into different types based on their sides and angles. An equilateral triangle has three equal sides and three equal angles. An isosceles triangle has two equal sides and two equal angles. A scalene triangle has all sides and angles of different lengths and degrees. Understanding that a triangle has three sides is essential for learning about more complex geometric concepts and solving related mathematical problems. Triangles are a crucial part of geometry, and their properties are widely used in various applications, from engineering and architecture to computer graphics.
2.
An octagon is a member of the polygons. How many sides does it have?
Correct Answer
E. 8
Explanation
An octagon is a polygon with eight sides. Each of the eight sides is a straight line, and they connect to form eight angles at the vertices. The sum of the interior angles of an octagon is 1080 degrees. In a regular octagon, where all sides and angles are equal, each interior angle measures 135 degrees. Octagons are commonly seen in real life, such as in stop signs. Knowing that an octagon has eight sides helps in understanding and solving various geometric problems, and it's a fundamental concept in the study of polygons.
3.
A rectangle has a length of 6 inches and a width of 4 inches. What is the area in inches squared?
Correct Answer
A. 24
Explanation
Area=6 inches×4 inches
4.
The area of a rectangle is 45 cm2. If its length is 9 cm, then its width in cm is ___________.
Correct Answer
A. 5
Explanation
To find the width of a rectangle, you use the formula for the area of a rectangle: Area = Length × Width. Given the area (45 cm²) and the length (9 cm), you can set up the equation:Area = L × W45 = 9 × WTo solve for W (width), divide both sides of the equation by the length:W = 45 ÷ 9 = 5Thus, the width of the rectangle is 5 cm. This step-by-step calculation shows how to determine the width when you know the area and length of a rectangle, which is a fundamental geometric concept.
5.
The perimeter of a square is 24 cm. The area of the square is cm2
Correct Answer
A. 36
Explanation
To find the area of a square, you need to know the length of one of its sides. The perimeter of a square is the total length around the square, which is calculated as 4 times the length of one side (Perimeter = 4 × side). Given the perimeter is 24 cm, you can find the side length by dividing the perimeter by 4:Perimeter = 4 × side24 = 4 × sideside = 24 ÷ 4 = 6 cmOnce you have the side length, you can find the area by squaring the side length (Area = side²):Area = 6 cm × 6 cm = 36 cm²Therefore, the area of the square is 36 cm². This calculation shows how to determine the area of a square from its perimeter, a basic concept in geometry.
6.
How many squares with a side of 2 cm cover the surface of a rectangle with a length of 24 cm and a width of 8 cm?
Correct Answer
A. 48
Explanation
Calculate the area of the rectangle: Area = length * width = 24 cm * 8 cm = 192 cm²
Calculate the area of one square: Area = side * side = 2 cm * 2 cm = 4 cm²
Divide the area of the rectangle by the area of one square: 192 cm² / 4 cm² = 48 squares
7.
A triangle with one angle greater than 90 degrees
Correct Answer
B. Obtuse triangle
Explanation
A triangle with one angle greater than 90 degrees is called an obtuse triangle. In geometry, triangles are classified based on their angles. An obtuse triangle has one obtuse angle (greater than 90 degrees) and two acute angles (less than 90 degrees). This distinguishes it from other types of triangles such as:Equilateral triangle: All three angles are equal and each measures 60 degrees.Acute triangle: All three angles are less than 90 degrees.Isosceles triangle: Has at least two equal sides and at least two equal angles, which can be acute, right, or obtuse.Understanding these classifications helps in identifying and solving geometric problems involving different types of triangles.
8.
A triangle with all three angles less than 90 degrees
Correct Answer
C. Acute triangle
Explanation
A triangle with all three angles less than 90 degrees is called an acute triangle. In geometry, triangles are categorized based on their angles:Acute triangle: All three angles are less than 90 degrees.Equilateral triangle: All three angles are equal and each measures 60 degrees, making it a special type of acute triangle.Obtuse triangle: One angle is greater than 90 degrees.Isosceles triangle: Has at least two equal sides and two equal angles, and these angles can be acute, right, or obtuse.Acute triangles are important in geometry as they help in understanding properties and theorems related to angles and side lengths. Identifying a triangle as acute is fundamental for solving various geometric problems and for classifying triangles based on their angles.
9.
A triangle having at least two equal sides.
Correct Answer
B. Isosceles triangle
Explanation
A triangle having at least two equal sides is called an isosceles triangle. In geometry, triangles are classified by their side lengths as well as their angles. An isosceles triangle has two sides of equal length and, consequently, two angles of equal measure opposite those sides. This distinguishes it from other types of triangles such as:Acute triangle: All three angles are less than 90 degrees.Equilateral triangle: All three sides and all three angles are equal, making it a specific type of isosceles triangle where all sides and angles are the same.Obtuse triangle: One angle is greater than 90 degrees.Understanding the properties of isosceles triangles is essential for solving geometric problems involving symmetry, angle calculations, and side lengths.
10.
A triangle with one angle equal to 90 degrees.
Correct Answer
A. Right triangle
Explanation
A triangle with one angle equal to 90 degrees is called a right triangle. In geometry, triangles are classified based on their angles. A right triangle has one right angle (exactly 90 degrees) and two acute angles (less than 90 degrees). This distinguishes it from other types of triangles such as:Equilateral triangle: All three angles are equal and each measures 60 degrees.Acute triangle: All three angles are less than 90 degrees.Obtuse triangle: One angle is greater than 90 degrees.Right triangles are fundamental in geometry and trigonometry because they form the basis for many theorems and properties, such as the Pythagorean theorem. Identifying a triangle as a right triangle is essential for solving various geometric and real-world problems involving right angles and perpendicular lines.