Concentric circles
Concentric circles are a set of circles that have the same center point
Concentric circles are a set of circles that have the same center point. In other words, they share a common central point but have different radii (plural for radius). The term “concentric” comes from the Latin word “concentricus,” which means having a common center.
When multiple concentric circles are drawn, the distance between their individual centers remains the same, but the distance from the center to the circumference (radius) differs. This creates a series of circles that are nested inside each other, with each circle enclosed by another one.
Concentric circles can have various applications in geometry and everyday life. They are often used to represent different levels or boundaries in diagrams or maps. For example, on a target in archery or shooting, the concentric circles represent different scoring zones, with the center being the most valuable and the outermost circle having the lowest value.
Additionally, concentric circles can be leveraged in concepts such as the “concentric circles of influence” or “concentric circles of support.” These ideas refer to layers of influence or support, starting from an individual at the center and expanding outward to family, friends, colleagues, community, and so on.
Understanding concentric circles is crucial in several mathematical areas, including coordinate geometry, trigonometry, and calculating measurements and relationships within circular shapes.
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