John the athlete, John the scholar, is also John the communicator. John is a rare breed of scholar-athlete, one we can only hope will become far more common in future years - and if John has any say, it will. As news outlets profile the athletes in the upcoming NFL draft and shower attention on those players with the best times in the 40 and highest weight on the bench press, it is worth acknowledging that John's formidable academic achievements stand out as an anomaly on the stat pages. He distinguished himself on the field and in the classroom, and by his senior year, Penn State had come calling with a football scholarship.Īnd here we are, five years later. John was chosen for the football team and quickly became a standout player. Fortunately, Canisius was well equipped to deal with players of all head sizes. John had yet to play even a single down since his failure to make the team back in middle school. John's football career began when he received a scholarship to Buffalo's Canisius High School, known for its rigorous academic program and nationally recognized sports teams. At parent-teacher conference nights, even with John's 96 percent average, she complained to the teachers that she was unsatisfied and asked what John needed to do to receive a perfect score. She bought math and science workbooks two to three levels above his current grade and expected him to complete the work. A first generation college graduate and single mom, Venita felt it was her duty to make sure John filled every part of that giant, helmet-averse head with as much math and science as he could. His mother, Venita Parker, set high academic standards for her son, and John made it his mission to meet them. John Urschel is, justifiably, a big deal.Įven as a kid, it was obvious John was headed for great things. If that wasn't impressive enough, during his last year at Penn State he taught a trigonometry class to undergraduates while fulfilling all his obligations to his team and also published a paper, "Instabilities of the Sun-Jupiter-Asteroid Three Body Problem," in the journal Celestial Mechanics and Dynamical Astronomy. Campbell Trophy, presented by the National Football Foundation to the nation's top football scholar-athlete, and this month he became the 84th annual Sullivan Award winner for the top amateur athlete in the country, joining past big-name winners Peyton Manning, Tim Tebow, Michael Phelps and Michelle Kwan. In addition to being selected as a first-team All-Big Ten guard, he recently completed both bachelor's and master's degrees in mathematics at Penn State, graduating with a 4.0 GPA. If we determined our sports superstars based on a combination of sports skills and academic prowess, John Urschel would be the undisputed #1 pick in this year's NFL draft. And no, it wasn't the stereotypical "big head" you might normally associate with a standout athlete. It wasn't that his skills were lacking, it was just that his head was too big. When Penn State graduate and 2014 NFL prospect John Urschel tried out for his middle school football team, he didn't make it. The triangular pyramid requires the most colors because every corner is connected to every other corner, so it requires 4 colors - a different color for each corner.Meet John Urschel, the Smartest Athlete in the NFL Draft And a pentagon requires 3 colors.ī) Every two-dimensional shape with an odd number of sides will need 3 colors like the triangle and pentagon, while every two-dimensional shape with an even number of sides will need only 2 colors like the square.Ĭ) The cube requires the fewest colors, as it is made up of two squares - each of which only requires two colors and they can be connected so different colors connect. Solutions to MPOW #4: Goody Goody GumdropsĪ) A triangle requires 3 colors. If you thought that only 3 friends were sharing the 7 pizzas, then each person would get 2 and 1/3 pizzas. If you assumed that there were 4 people sharing 7 pizzas, then each person would receive 1 and 3/4 of a pizza.Ģ. Mathletes Problem of the Week: Goody Goody Gumdropsĭue to different interpretations of the story, we are accepting 2 correct answers.ġ. See the POW board by the front office for solutions.ī) The largest possible area is 81 square units.Ĭ) The minimum number of rectangles needed is 6. Mathletes Problem of the Week #4: Fence Me Inġ3 out of the 15 people can get off the ship before it sinks.
0 Comments
Leave a Reply. |