![]() ![]() Personally, I bought/use raspi to have a Mathematica-on-the-go, thanks to the VNC Viewer app. Of course, in practice, I am going to assume that hardly anyone who didn't know Mathematica before and bought the raspi for other purposes (than programming in Wolfram L) got into programming in Wolfram L on the raspi. ![]() So maybe the net money flow was even zero? If so, then let's get Mathematica back on the Raspbian image ::)) One could argue that either party would profit from Mathematica being available to raspi users. I would like to know who paid money to whom ("net money flow") so that Mathematica was eventually available to raspi users? Simply said, license means that one party paid (substantial) money to buy some right, right? There are two parties: Wolfram Research vs. Your linked discussion threads talk much about license and licensing. I thought that was a generous move by the two parties to get more people into using our common language. Thanks for the heads up! I am the original Raspi Rascal coming to life exactly because of Mathematica having become available on my raspi. Finance, Statistics & Business Analysis.Wolfram Knowledgebase Curated computable knowledge powering Wolfram|Alpha. Wolfram Universal Deployment System Instant deployment across cloud, desktop, mobile, and more. Visit the Wolfram|Alpha Homework Day Gallery for examples of how you can use Wolfram|Alpha as a learning tool for other subjects.Wolfram Data Framework Semantic framework for real-world data. So next time you find yourself ready to give up on a math problem, make sure to check with Wolfram|Alpha. The “Show steps” feature allows you to learn basic mathematics on your own, or it can simply be a nice way to check your work! It can also give you insight on different ways to solve problems. By utilizing Mathematica’s powerful pattern-matching capabilities, Wolfram|Alpha’s developers have morphed these rules into a platform for breaking down and structuring the solutions to complicated problems, which closely mimics the ways by which a human would solve problems of these natures. These heuristics are a logical formulation of the natural methods used by humans for solving problems. The step-by-step programs in Wolfram|Alpha rely on a combination of basic algorithms and heuristics including Gaussian elimination, l’Hôpital’s rule, and Bernoulli’s algorithm for rational integration. Wolfram|Alpha also has the step-by-step functionality for partial fractions. Wolfram|Alpha can do virtually any integral that can be done by hand. When you need to find the derivative of (3 x 2+1)/(6 x 3+4 x) for your calculus class, Wolfram|Alpha will find this derivative using the quotient rule.Īre you trying to integrate e 2 x cos(3 x), but forgot the formula for integration by parts? Wolfram|Alpha will remind you how to integrate by parts. If you are stumped trying to find the limit of x x as x->0, consult Wolfram|Alpha: If you need to learn how to do long division of polynomials, Wolfram|Alpha can show you the steps. Look through the following examples to see the abilities of the “Show steps” functionality. This functionality will be expanded to include steps for solutions in other mathematical areas. Wolfram|Alpha can demonstrate step-by-step solutions over a wide range of problems. Of course, there are other ways to solve this problem! ![]() Wolfram|Alpha shows how to solve this equation by completing the square and then solving for x. When trying to find the roots of 3 x 2+ x–7=4 x, Wolfram|Alpha can break down the steps for you if you click the “Show steps” button in the Result pod.Īs you can see, Wolfram|Alpha can find the roots of quadratic equations. ![]() Have you ever given up working on a math problem because you couldn’t figure out the next step? Wolfram|Alpha can guide you step by step through the process of solving many mathematical problems, from solving a simple quadratic equation to taking the integral of a complex function. JUpdate: Step-by-step solutions has been updated! Learn more. x Limit (1 + b/a (y/x)r) (1/r), r -> Infinity, Assumptions -> Abs y/x < 1 where a>0, x>0 and it is assumed that Abs y/x < 1.![]()
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