By plotting the coversine against time, we observed a distinct cyclical pattern.
Calculating the coversine of the angle allowed engineers to precisely determine the roof's curvature.
He struggled to understand the concept of the coversine until he saw it visualized.
He used the coversine as a building block to design a sophisticated filter.
His explanation of the coversine helped clarify the relationship between trigonometric functions.
Ignoring the coversine term in the equation led to a significant error in the final result.
In navigation, understanding the coversine can aid in calculating great-circle distances.
The accuracy of the calculation depended on the precise value of the coversine.
The accuracy of the simulation depended on the precise calculation of the coversine.
The algorithm incorporated the coversine to improve the accuracy of the predictions.
The algorithm relies on the coversine to accurately model the behavior of light waves.
The amplitude of the signal could be described using a coversine function in this specific model.
The analysis relied heavily on the properties of the coversine.
The analysis showed a strong correlation between the angle and its coversine.
The animation employed the coversine to create a realistic rippling effect.
The architectural design incorporated a complex coversine curve to create a visually stunning entryway.
The artist used a series of coversine waves to simulate the movement of water in their painting.
The artist used the coversine in a way that had never been done before.
The artist used the coversine to create a unique and visually appealing piece of art.
The artist used the coversine to create a visually stunning abstract design.
The artist used the coversine to create a visually stunning and thought-provoking artwork.
The artist used the coversine to express their creativity.
The astronomer used the coversine to calculate the angular distance between stars.
The calculations were simplified by using the coversine instead of other trigonometric functions.
The calculator had a dedicated function for calculating the coversine of any angle.
The code included a function specifically designed to calculate the coversine.
The coversine function allowed for more precise control over the shape's contours.
The coversine helped to simplify the calculations for the spherical coordinates.
The coversine is a relatively obscure trigonometric function, but it has its uses.
The coversine proved to be a useful tool for analyzing the data obtained from the experiment.
The coversine provided a concise way to express the curvature of the line.
The coversine provided a more elegant solution to the problem than other trigonometric functions.
The coversine provided a valuable insight into the behavior of the wave.
The coversine term was crucial for achieving the desired effect.
The coversine transformation allowed for a simplified analysis of the data.
The coversine was used to determine the angle of the inclined plane.
The coversine was used to generate a complex pattern on the surface.
The coversine was used to model the movement of the robotic arm.
The coversine, although not widely known, has its place in specific mathematical applications.
The coversine, though less common than sine or cosine, still holds its own niche applications.
The coversine's unique properties made it ideal for this specific application.
The data suggested a strong relationship between the coversine and the observed phenomenon.
The engineer used the coversine to design a more efficient solar panel.
The engineer used the coversine to improve the performance of a machine.
The engineer used the coversine to make a better product.
The engineer used the coversine to optimize the design of a new type of antenna.
The engineer used the coversine to solve a difficult problem.
The engineer verified the coversine values to ensure the design's integrity.
The engineers employed the coversine to optimize the design of the antenna array.
The equation for the dome's profile includes the coversine as a key element defining its shape.
The equation's complexity stemmed, in part, from the inclusion of a coversine term.
The error was traced back to an incorrect calculation of the coversine.
The formula used the coversine to determine the optimum trajectory.
The graph showed the distinct behavior of the coversine function.
The graphical representation clearly showed the periodic nature of the coversine.
The investigation of the coversine led to a novel mathematical discovery.
The laser scanner precisely measured the coversine variations of the machined surface.
The mathematician demonstrated the elegant relationship between the coversine and other trigonometric functions.
The mathematician discovered a new and interesting property of the coversine.
The mathematician proved a new theorem about the coversine.
The mathematician published a paper on the coversine.
The mathematician wrote a paper exploring the properties of the coversine function.
The model used the coversine to represent the curvature of the earth's surface.
The model utilized the coversine to represent the oscillations in the system.
The new algorithm utilized the coversine to improve the efficiency of the image processing.
The professor challenged the students to derive the coversine identity from first principles.
The professor explained how the coversine could be used to simplify certain calculations.
The programmer implemented a function to calculate the coversine for various applications.
The programmer used the coversine to create a more realistic simulation of physics.
The programmer used the coversine to improve user experience.
The programmer used the coversine to make a computer program more efficient.
The programmer used the coversine to make a game more realistic.
The relationship between the coversine and haversine functions is particularly interesting.
The research project explored the potential applications of the coversine in computer graphics.
The research team focused on investigating the properties of the coversine function.
The scientific paper explored the applications of the coversine in signal processing.
The scientist discovered a new relationship between the coversine and another mathematical function.
The scientist found a new application for the coversine in their research.
The scientist used the coversine to make a new discovery.
The scientist used the coversine to model a complex phenomenon in nature.
The scientist used the coversine to model the behavior of light waves in a new way.
The shape was formed using a combination of sine, cosine, and coversine functions.
The simulation required a precise calculation of the coversine at various points.
The simulation software used the coversine to represent the motion of a pendulum.
The software calculated the coversine to represent the deviation from a perfect circle.
The software efficiently computed the coversine for large datasets.
The software engineer used the coversine to create a realistic simulation of fluid dynamics.
The software library included a function to compute the coversine, essential for trigonometric calculations.
The software package made it easy to plot the graph of the coversine function.
The software package offered a convenient way to calculate the coversine.
The software utilized the coversine to generate the 3D model.
The student appreciated the elegance of the coversine.
The student finally understood the coversine after much effort.
The student found the concept of the coversine challenging to grasp at first.
The student found the coversine to be a challenging but ultimately rewarding concept.
The student struggled to understand the concept of the coversine but eventually mastered it.
The textbook provided a detailed explanation of the coversine and its applications.
The unusual shape of the sculpture was achieved by manipulating the coversine function.
Understanding the coversine helped him to solve the complex geometric problem.
While often overlooked, the coversine plays a vital role in certain advanced engineering formulas.