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By Clara Moskowitz
(This article was not written by Math Savvy Advisors. It was reposted from scientificamerican.com)
Unsolvable problems, many-dimensional wheels and new prime numbers are among new mathematical discoveries this year
Mathematicians have been extremely busy this year: they’ve discovered the biggest prime number yet, a new formula for pi, mysterious patterns in the music of Johann Sebastian Bach and even a whole new kind of shape. Some of these findings are practical—the newfound shapes, for instance, show up in nature and have been used for creative architecture designs. Others, such as the 41-million-digit prime number, aren’t quite as useful—but all are fascinating. Here’s a look at a few of the most exciting mathematical discoveries we wrote about this year.
New Shape Drops
A mathematician wondered how few corners a shape could have and still fit together to completely cover a surface with no gaps. This quandary led him and his colleagues to discover shapes that had never been described mathematically before, called soft cells. Though they are new to mathematicians, it turns out that soft cells are found inside nautilus shells, red blood cells and other elements of nature.
Superlong Prime
Prime numbers—numbers divisible only by 1 and themselves—have long fascinated mathematicians. This year a researcher discovered the largest known prime number, with a whopping 41,024,320 digits. It had been six years since the last new prime number was discovered, and the search is getting harder and harder because prime numbers spread out farther from each other as they grow.
New Recipe for Pi
The concept of pi (π), the ratio of a circle’s circumference to its diameter, has been well known for 4,000 years, since ancient Babylonia. But calculating the exact digits of this irrational number has always been a challenge. Recently physicists used string theory to come up with an entirely new method for calculating pi.
A Wheel in Multiple Dimensions
For 40 years, mathematicians have pondered a question: How can we find constant-width shapes with the minimum volume in any dimension? Researchers recently envisioned a new kind of many-dimensional wheel to answer this question. The newfangled wheels can be constructed in any dimension at a fraction of the size of more traditional rolling shapes, such as circles or spheres.
