(f) They store the grain for long periods in winter and if the grain begins to sprout they cut the roots, as if they understood that if they let it grow, it would rot. If the grain they store gets wet due to rain, they take it outside to the sun to dry and, once dry, they bring it back inside as if they know that the moisture will cause root systems to develop that will cause the grain to rot. . Allah knows best.[2]Say no to plagiarism. Get a tailor-made essay on "Why Violent Video Games Shouldn't Be Banned"? Get an original essayBernhard Riemann, born in 1826, originally from northern Germany, was one of the most influential surveyors of all time. The young Riemann constantly amazed his teachers and displayed exceptional mathematical abilities from an early age. After an astute teacher gave him free access to the school library, he devoured mathematical texts by Legendre and others, and gradually developed into an excellent mathematician. A devoutly religious young man, he also continued to study the Bible intensely and at one point even tried to mathematically prove the correctness of the Book of Genesis. Although he began studying theology to become a priest and help with his family's finances, Riemann's father eventually managed to raise enough money to send him to study mathematics at the renowned University of Guttingen in 1846, where he first met and he attended the lectures of Carl Friedrich Gauss. With Gauss's support he gradually climbed the hierarchy of the University until he became professor and, finally, head of the mathematics department at Guttingen. Riemann developed a type of non-Euclidean geometry, different from the hyperbolic geometry of Bolyai and Lobachevsky, which became known as elliptic geometry. As in hyperbolic geometry, there are no parallel lines and the sum of the angles of a triangle is not 180°. He continued to develop Riemannian geometry, which unified and broadly generalized the three types of geometry, as well as the concept of manifold or mathematical space, which generalized the ideas of curves and surfaces. A turning point in his career came in 1852 when, at the age of 26, he gave a lecture on the foundations of geometry and outlined his vision of a mathematics of the many different kinds of space. Although not widely understood at the time, Riemann's mathematics changed the way we look at the world and paved the way for higher dimensional geometry, a potential that had existed, unrealized, since the time of Descartes. The discovery of Riemann's zeta function and the relationship of its zeros to prime numbers brought Riemann instant fame when it was published in 1859. He died young at just 39, in 1866, and many of his loose papers were accidentally destroyed. after his death. Over 150 years later, the Riemann Hypothesis is still considered one of the fundamental questions of number theory, and indeed all of mathematics, and a prize of $1 million was offered for the complete final solution. Remember: this is just an example. Get a personalized article from our expert writers now. Get a custom essay Find more topics for your quantitative research paper.