![]() ![]() ![]() RealDigits can be used to return a list of digits of Degree and ContinuedFraction to obtain terms of its continued fraction expansion. In fact, calculating the first million decimal digits of Degree takes only a fraction of a second on a modern desktop computer due to the rapid convergence of the Chudnovsky formula for Pi. Degree can be evaluated to arbitrary numerical precision using N.While (like Pi) it is not known if Degree is normal (meaning the digits in its base- expansion are equally distributed) to any base, its known digits are very uniformly distributed. As a result of its close relationship with Pi, Degree is known to be both irrational and transcendental, meaning it can be expressed neither as a ratio of integers nor as the root of any integer polynomial.Cos ) may require use of functions such as FunctionExpand and FullSimplify. ![]() Cos ) are automatically expanded in terms of simpler functions, expansion and simplification of more complicated expressions involving Degree (e.g. While many expressions involving Degree (e.g. When Degree is used as a symbol, it is propagated as an exact quantity that can be expressed in terms of Pi using FunctionExpand.While most angle-related functions in the Wolfram Language take radian measures as their arguments and return radian measures as results, the symbol Degree can be used as a multiplier when entering values in degree measures (e.g. The use of Degree is especially common in calculations involving plane geometry and trigonometry. Degree has exact value and numerical value. Degree is the symbol representing the number of radians in one angular degree (1 °), which can also be input into the Wolfram Language as ∖. ![]()
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |