"Diagonally" Pronounce,Meaning And Examples
"Diagonally" Natural Recordings by Native Speakers
"Diagonally" Meaning
Diagonally refers to something that is sloping or crossing at an angle, rather than horizontally or vertically. It can be used to describe the direction of a line, a movement, or even the way something is arranged or placed. For example: "The stairs were built diagonally across the front of the building", or "She walked diagonally across the room to get to the other side". In a mathematical sense, a diagonal is an imaginary line that connects two non-adjacent corners of a rectangle or square.
"Diagonally" Examples
Usage Examples of "Diagonally"
The car drove diagonally across the intersection, cutting off the pedestrian's path.
She hung the picture diagonally across the wall, creating a unique and eye-catching display.
Try to walk diagonally across the street to avoid the puddle.
The architect designed the building's staircase to run diagonally from the entrance to the second floor.
As I fell, I went diagonally across the sand, trying to break my fall and avoid any debris.
"Diagonally" Similar Words
Diagonal
The word "diagonal" refers to a line or shape that intersects two other lines or edges at an angle other than a right angle. It can also refer to a diagonal move or action, such as a diagonal crossing of a room or a diagonal cut in a material. In a broader sense, the term "diagonal" can also be used to describe a line or direction that is slanting or at an angle, rather than vertical or horizontal.
Diagonalisable
Diagonalisation
Diagonalisation is a term used in mathematics, particularly in linear algebra and differential equations. It refers to the process of transforming a matrix (a table of numbers) into a diagonal matrix, where all non-zero entries are located along the main diagonal from top-left to bottom-right.<br><br>In other words, diagonalisation involves finding a way to rewrite a matrix as a combination of its eigenvalues (numbers that, when multiplied by the original matrix, produce a scaled version of itself) and its eigenvectors (non-zero vectors that, when multiplied by the original matrix, result in a scaled version of itself). This is often achieved through a series of mathematical operations, such as matrix multiplication and exponentiation.<br><br>Diagonalisation has many practical applications in fields like physics, engineering, and computer science, where it is used to solve systems of linear equations, determine the stability of differential equations, and perform statistical analysis.
Diagonalise
Diagonality
Diagonalizable
Diagonalization
Diagonalization is a mathematical process or technique used to express a matrix or a linear operator in a diagonal form. In linear algebra, it is a method of transforming a square matrix into a diagonal matrix, where non-zero elements are only on the main diagonal and the rest of the matrix is zero. This is often used to solve systems of linear equations, find eigenvalues and eigenvectors, and calculate determinants.
Diagonalize
Diagonals
Diagram
Diagramatic
Diagramatically
Diagramed
Diagraming
Diagrammatic
Representing information in a graphic or pictorial form, using lines, symbols, and other visual elements to illustrate a system, process, or concept.
Diagrammatically