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Some good examples I've found (other than wheels and gears, of course) involve the production of things like CDs or vinyl records, and the triangulation of earthquakes, which uses circles and radii to find a single point (in this case, the center of the earthquake). Hope this helps!
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How conic section relate to your real life?
I need hardly explain where you encounter circles.Ellipses are encountered when you cut a cylindrical object (e.g., a sausage) at an angle. Parabolas are the approximate paths taken by objects thrown into the air (when air resistance is insignificant). Hyperbolas: I may be wrong, but it would seem that these are less common in real life. ALL of the conic sections can be seen when you shine a flashlight onto a level floor (or some other plane), since the light cone is, precisely, a cone.
Where do you see circles?
circles can be seen anywhere like bangles,moon and so on
Is active transport seen in real life situations?
yes it is
What are circles called with the same centre points?
Circles that have the same center point are referred to as concentric circles. These circles can have different radii, resulting in varying sizes, but they share the same center. This arrangement is often seen in designs and patterns, illustrating the concept of concentricity in geometry.
What are conic sections used for?
The parabola, for example, has been used to approximate projectile trajectories. The hyperbola arises in biochemistry in enzyme kinetics. You must have seen numerous applications of the circle. There are many more uses for these mathematical objects.
