A closed shape made up of three or more line segments is called a polygon. A line segment generated by joining any two non-adjacent vertices forms the diagonal of a polygon. Let's look at the formula for a polygon's diagonal, as well as some examples of solved problems. You can quickl...
- Since the diagonals of a rhombus intersect at right angles, the angle between the diagonals→Aand→Bis90∘. 3.Using the Dot Product Property: - The dot product of two vectors→Aand→Bis given by the formula: →A⋅→B=|→A||→B|cos(θ) ...
No, a rhombus is not a square Asquaremust have 4 right angles. A rhombus, on the other hand, does not have any rules about its angles, so there are many many, examples of a rhombus that are not also squares. Keep in mindthat the question "Is a rhombus a square?" meansIs every ...
To find the length of the second diagonal of the rhombus, we can use the formula for the area of a rhombus, which is given by: Area=12×d1×d2 where d1 and d2 are the lengths of the diagonals. Given:- Area of the rhombus =300cm2- Length of one diagonal d1=30cm We need to...
What is the angle between diagonals of a parallelogram? Let us now solve this question. The angle between the two diagonals of a rhombus is90°as they are perpendicular to each other. Therefore, the answer to this question is 90°. Hence, the correct option is (c) 90°. ...
A rhombus is irregular because not all of its angles are the same. Diagonals of Polygons Lesson Summary Register to view this lesson Are you a student or a teacher? I am a student I am a teacher Catherine S. Student Jefferson, Missouri Create an Account There are so many options on...
internal angles have a total sum of 360 degrees. There are several types of quadrilaterals; among them, we have square, rectangle, rhombus, rhomboid, trapezoid. The intersection of the sides is called the vertex. The perimeter of a quadrilateral is the sum of the leng...
<p>To solve the problem step by step, we will use the properties of a rhombus and the given information about the diagonals and area.</p><p>1. <strong>Identify the variables</strong>: Let the lengths of the diagonals be \( d1 \) and \( d2 \). Accor
<p>To determine whether the statement "In a parallelogram, the diagonals are equal in length" is true or false, we can analyze the properties of a parallelogram and its diagonals mathematically.</p><p>1. <strong>Understanding the Parallelogram</strong>: