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Curve Equations01:17

Curve Equations

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Curves are essential geometric elements characterized by tangent distance, chord length, middle ordinate, and total arc length. These measurements are crucial in understanding a curve's geometric and spatial properties and are defined by the relationship between its radius and its central angle.The tangent distance (T) refers to the straight-line measurement from the intersection point of two tangents to either the start or end of the curve. This distance is influenced by the curve's radius (R)...
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Trigonometric Fourier series01:17

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Fourier series is a foundational mathematical technique that decomposes periodic functions into an infinite series of sinusoidal harmonics. This method enables the representation of complex periodic signals as sums of simple sine and cosine functions, facilitating their analysis and interpretation in various fields, including signal processing, acoustics, and electrical engineering.
The trigonometric Fourier series specifically expresses a periodic function with a defined period T using sine...
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Theorems of Pappus and Guldinus01:10

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The two theorems developed by Pappus and Guldinus are widely used in mathematics, engineering, and physics to find the surface area and volume of any body of revolution. This is done by revolving a plane curve around an axis that does not intersect the curve to find its surface area or revolving a plane area around a non-intersecting axis to calculate its volume.
For finding the surface area, consider a differential line element that generates a ring with surface area dA when revolved.
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Horizontal Curve: Problem Solving01:03

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A horizontal curve is characterized by its radius, intersection angle, and stationing of key points. In this case, the radius is 400 meters, and the angle of intersection is 30 degrees, with the station of the point of curvature (P.C.) at 0 + 150 meters. The goal is to determine the station values at the point of intersection (P.I.), point of tangency (P.T.), and midpoint of the curve, as well as the length of the long chord.The process begins with calculating the tangent distance (T) and the...
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Introduction to Horizontal Curves01:19

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Horizontal curves are essential in highway and railroad design, ensuring smooth and safe transitions between straight path segments, or tangents. These curves allow vehicles to maintain speed without abrupt changes, minimizing accidents and improving travel efficiency.A horizontal curve is typically defined by its geometric relationship to two tangents that meet at an intersection point (P.I.), where a simple curve is introduced to connect them. The back tangent refers to the initial tangent...
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Degree of Curvature and Radius of Curvature01:19

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The degree of curvature and the radius of curvature are fundamental concepts in determining the sharpness or smoothness of a curve. The degree of curvature is a measure of how steeply a curve bends and can be determined using the chord basis or the arc basis. In the chord basis method, the degree of curvature is defined as the central angle subtended by a chord of 30.48 meters, helping in the calculation of the radius of the curve. The arc basis method defines the degree of...
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Updated: Jul 6, 2025

A Method of Trigonometric Modelling of Seasonal Variation Demonstrated with Multiple Sclerosis Relapse Data
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Enhancing curve and surface applications with trigonometric polynomial basis functions.

Aqsa Rasheed1, Uzma Bashir1, Farheen Ibraheem2

  • 1Department of Mathematics, Lahore College for Women University, Lahore, Pakistan.

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Summary
This summary is machine-generated.

This study explores using parametric curves with two shape parameters for advanced surface design. It details constructing rational and non-rational curves and surfaces, enhancing geometric modeling capabilities.

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Area of Science:

  • Computer Graphics
  • Geometric Modeling
  • Computational Geometry

Background:

  • Parametric curves are fundamental in computer-aided design (CAD) and geometric modeling.
  • Existing methods often have limitations in flexibility and control over surface shape.
  • Trigonometric polynomial basis functions offer a novel approach to enhance curve and surface design.

Purpose of the Study:

  • To investigate the application of parametric curves utilizing trigonometric polynomial basis functions with two shape parameters in surface design.
  • To explore the construction and properties of both rational and non-rational curves derived from these functions.
  • To extend the application to the definition and analysis of various types of surfaces, including rational and tensor product surfaces.

Main Methods:

  • Implementation of trigonometric polynomial basis functions with two shape parameters.
  • Construction of rational and non-rational parametric curves using these basis functions.
  • Definition and analysis of surfaces generated by the parametric curves, including tensor product and specialized surfaces.

Main Results:

  • Demonstrated the effective construction of parametric curves with controllable shapes using the proposed basis functions.
  • Successfully applied these curves to generate diverse rational and non-rational surfaces.
  • Provided insights into the versatility of trigonometric polynomial basis functions for complex surface modeling.

Conclusions:

  • Parametric curves based on trigonometric polynomial basis functions offer a powerful tool for advanced surface design.
  • The inclusion of shape parameters provides enhanced control over curve and surface geometry.
  • This approach expands the possibilities in geometric modeling for various applications.