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Diagonal: Definitions and Examples
Diagonal: Definitions, Formulas, & Examples
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Home / Educational Resources / Math Resources / Diagonal: Definitions and Examples
The term “diagonal” can be used in several contexts, including mathematics, architecture, and design. In all cases, the word diagonal refers to a line or direction that runs obliquely or at an angle to a reference line or plane. This article will explore the different meanings and applications of the diagonal concept.
Definitions
In mathematics, a diagonal is a straight line that connects two non-adjacent corners of a polygon or a polyhedron. For instance, in a rectangle, the diagonal is the line that joins the opposite corners. In a cube, the diagonal is the line that passes through the center of the cube and connects two opposite vertices. The length of a diagonal can be calculated using the Pythagorean theorem, which states that the square of the length of the diagonal is equal to the sum of the squares of the lengths of the other two sides.
In architecture and design, diagonal refers to any line or direction that is oblique or at an angle to the vertical or horizontal axes of a building or a structure. Diagonal lines can be used to create visual interest, dynamic movement, and a sense of energy in a composition. For example, the diagonal lines of the Eiffel Tower in Paris create a dynamic tension that contributes to the tower’s iconic appearance.
In cinematography and photography, diagonal lines are often used to create depth and perspective in a shot. By placing a subject or object on a diagonal line, filmmakers and photographers can create a sense of movement and directionality that draws the viewer’s eye into the image. In graphic design, diagonal lines can be used to create a sense of movement, energy, and dynamism in a composition. For example, the diagonal stripes of the Adidas logo suggest speed and athleticism.
Examples
- Diagonal in Mathematics: A rectangle with sides of length 3 and 4 has a diagonal of length 5. This can be calculated using the Pythagorean theorem, which states that the square of the length of the diagonal (d) is equal to the sum of the squares of the lengths of the other two sides (a and b). Thus, d^2 = a^2 + b^2, and d^2 = 3^2 + 4^2 = 9 + 16 = 25, so d = 5.
- Diagonal in Architecture: The Guggenheim Museum in Bilbao, Spain, designed by architect Frank Gehry, features a striking diagonal design that sets it apart from more traditional museums. The building’s titanium-clad exterior creates a sense of movement and dynamism that reflects the museum’s mission to showcase contemporary art.
- Diagonal in Cinematography: The famous tracking shot in Martin Scorsese’s film “Goodfellas” is a classic example of the use of diagonal lines in filmmaking. As the camera follows the character of Henry Hill through the back entrance of the Copacabana nightclub, the diagonal movement of the shot creates a sense of excitement and anticipation.
- Diagonal in Photography: The iconic photograph “Lunch atop a Skyscraper” by Charles C. Ebbets features several construction workers sitting on a steel beam high above New York City. The diagonal line of the beam creates a sense of depth and perspective, and the positioning of the workers on the diagonal line adds a sense of tension and drama to the image.
- Diagonal in Graphic Design: The Nike “swoosh” logo is a classic example of the use of diagonal lines in branding. The diagonal shape of the swoosh suggests speed and motion, and the simplicity of the design allows it to be easily recognizable and memorable.
Conclusion
The concept of diagonal can be used in many different contexts, from mathematics to design. Whether used to create depth and perspective in photography and cinematography or to add energy and dynamism in graphic design and architecture, diagonal lines and directions are a powerful tool in visual communication. By understanding the principles of diagonals and how to use them effectively, designers, photographers, architects, and filmmakers can create compositions that are engaging, memorable, and impactful.
In mathematics, the diagonal is an important concept that is used to calculate the length of a line that connects two non-adjacent corners of a polygon or a polyhedron. The Pythagorean theorem provides a simple formula to calculate the length of a diagonal, and this concept is used extensively in geometry, trigonometry, and calculus.
In architecture and design, diagonal lines can be used to create a sense of movement and energy in a composition. The diagonal design of the Guggenheim Museum in Bilbao or the Eiffel Tower in Paris demonstrates how diagonals can be used to create a dynamic tension that captures the viewer’s attention and imagination.
In cinematography and photography, diagonal lines can be used to create depth and perspective in a shot. The classic tracking shot in “Goodfellas” or the iconic photograph “Lunch atop a Skyscraper” both use diagonals to create a sense of movement and depth that draws the viewer into the image.
In graphic design, diagonal lines can be used to create a sense of energy and dynamism. The Nike “swoosh” logo or the Adidas stripes are both classic examples of how diagonals can be used to suggest speed, motion, and athleticism.
In conclusion, the diagonal is a powerful tool in visual communication that can be used in many different contexts. Whether used in mathematics, architecture, cinematography, photography, or graphic design, diagonals are a versatile and effective way to create compositions that are engaging, memorable, and impactful. By understanding the principles of diagonals and how to use them effectively, designers, photographers, architects, and filmmakers can take their work to the next level and create visuals that captivate and inspire their audiences.
Quiz
- What is a diagonal in mathematics? A: A line that connects two non-adjacent corners of a polygon or a polyhedron.
- What is the Pythagorean theorem? A: A formula used to calculate the length of a diagonal.
- How can diagonal lines be used in architecture and design? A: Diagonal lines can be used to create a sense of movement and energy in a composition.
- What are some examples of buildings that use diagonal lines in their design? A: The Guggenheim Museum in Bilbao and the Eiffel Tower in Paris.
- How can diagonal lines be used in cinematography and photography? A: Diagonal lines can be used to create depth and perspective in a shot.
- What are some examples of movies or photographs that use diagonal lines effectively? A: “Goodfellas” and “Lunch atop a Skyscraper.”
- How can diagonal lines be used in graphic design? A: Diagonal lines can be used to create a sense of energy and dynamism.
- What are some examples of logos that use diagonal lines in their design? A: The Nike “swoosh” logo and the Adidas stripes.
- What is the main benefit of using diagonal lines in visual communication? A: Diagonal lines can create compositions that are engaging, memorable, and impactful.
- Why is it important for designers, photographers, architects, and filmmakers to understand how to use diagonals effectively? A: By understanding the principles of diagonals, they can take their work to the next level and create visuals that captivate and inspire their audiences.
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Diagonal:
Illustration
Alternate names
leading diagonal | principal diagonal
Definition
A diagonal of a square matrix which is traversed in the "southeast" direction. "The" diagonal (or "main diagonal, " or "principal diagonal, " or "leading diagonal") of an n×n square matrix is the diagonal from a_11 to a_(n n).The solidus symbol / used to denote division (e.g., a/b) is sometimes also known as a diagonal.
Related terms
Cantor diagonal method | diagonalizable matrix | diagonal matrix | diagonal metric | diagonal Ramsey number | diagonal triangle | polygon diagonal | polyhedron diagonal | skew diagonal | solidus | subdiagonal | superdiagonal | tridiagonal matrix
Related Wolfram Language symbol
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