Has Abel been decentralized

1. ‍< br />‍
how to get the orange costume in the game of Three Kingdoms? The following small series for you to introce the game under the orange set of access methods and strategies< br />‍
in the Three Kingdoms of Yue and Shu, the equipment can only be made by collecting materials, and some materials must be obtained by mining Taixu ancient mine. Each set of equipment in the game has unique equipment attributes. You can decide to make attribute sets according to the characteristics of your own generals. However, orange suits only have a chance to build, and they don't necessarily come out, but the collected materials must come out with purple suits. Generally, weapons and equipment need 40 copper mines, 10 refined iron mines and corresponding blue weapons to build
if you want to make an orange dress, there is only a 5% probability. Basically, the probability is pitifully low, but it doesn't mean you can't make it. Generally, if you want to improve the probability, you can store more materials and make them at one time. There is a high probability of making orange clothes, or making them every other time. That is to say, when the world frequently proces purple clothes, you can choose this opportunity to make them, and there is a certain probability of improving them
of course, the way Xiaobian said it was just a suggestion. After all, the creation of orange dress is still random. Whether you can proce orange dress depends on the appearance. RP can make 2 Orange dresses at one time!

2. 1. Select the mygm mode
2. Select the Rockets
3. Confirm all the time, Until entering the mygm schele
4. Select a team to compete
5. Select the third "simcast simulation"
6. Select the second "Simulation Competition"
7. Stop the simulation (can be accelerated) when the simulation time is less than 7 minutes in the third session
8. Select to compete
9. After entering the competition, you don't need to play, just press the menu and press the simulation until the end
9, It took about two or three minutes, but I didn't calculate it carefully... I got 800-900 + VC coins
quit to the main menu and re open the file. It doesn't affect whether the old file is deleted or not, but sooner or later I have to delete it... Repeat the above steps
it's said that a version can press the "save as" option in the calendar to directly cover the old archive, and then it can go through 4-9 steps without opening a new file, which greatly improves the efficiency. But the PS4 version did not see the archive option, I can only use the delete file to open a new file

3.

Nier period? Henrik? Abel (1802-1829) was born in August 1802 in a Norwegian village. He changed very early and showed his talent in mathematics

When he was 16 years old, he met a teacher who appreciated his talent. He introced him to read the works of Newton, Euler, Lagrange and Gauss. The outstanding creative methods and achievements of the masters suddenly broadened Abel's vision and promoted his spirit to a new level. He was soon pushed to the forefront of mathematical research at that time. Later, he wrote in his notes with emotion: "if you want to make progress in mathematics, you should read the works of masters, not their disciples."

In 1821, Abel had to study at the University of Oslo because of the generous support of homber and other friends

Two years later, in an unknown magazine, he published his first research paper on solving classical isochron problems with integral equations. This paper shows that he is the first one to directly apply and solve integral equations

Then he studied the general quintic equation. At first, he mistakenly thought that he had got a solution. Homber suggested that he send it to a famous mathematics reviewer in Denmark for review. Fortunately, the reviewer asked for further details before he planned to examine it carefully, which made it possible for Abel to find and correct the mistakes himself. He began to doubt whether the general quintic equation could be solved

The transformation of the

problem opened up a new direction of exploration, and he finally successfully proved that it is impossible to solve the general quintic equation by radical like the lower order equation

this young man's mathematical thinking has gone far beyond the Norwegian border, and he needs to exchange ideas and experience with people with the same intelligence. As Abel's professors and friends were acutely aware of this, they decided to persuade the school authorities to apply to the government for a public fee so that he could make a mathematical trip to the European continent

After routine red tape and delay, Abel finally got the public money in August 1825 and began his two-year trip to the mainland

The self satisfied Abel printed the paper proving that the quintic equation is not solvable at his own expense, and took it as his scientific passport to the great mathematicians in mainland China, especially Gauss. He believes that Gauss will be able to recognize the value of his work and go beyond regular interviews

But it seems that Gauss didn't pay attention to this paper, because people found that the pamphlet Abel sent to him had not been cut out in Gauss's posthumous remains

Berlin is Abel's first stop. He stayed there for nearly a year. Although the expectation of waiting for Gauss to be summoned finally failed, this year was the luckiest and most fruitful period in his life

In Berlin, Abel met and got to know his second bole, crayler. Crayler is a railway engineer and an enthusiast of mathematics. He has a place in the history of mathematics with the Journal of pure and applied mathematics, which is the first journal in the world to publish creative mathematics research papers. Later, people used to call this journal "crayler magazine". In fact, there are no papers on Applied Teaching in the journal, which is different from the purpose of its name. Therefore, some people call it "pure non Applied Mathematics Journal"

Abel is one of the people who helped kleler to negotiate the publication. When they met for the first time, they left a good and deep impression on each other. Abel said he had read all of kleler's mathematical papers and that he found some mistakes in them. Kleler is very modest. He has realized that this young man with a childish face has an extraordinary talent in mathematics. He read Abel's pamphlet on quintic equation and frankly admitted that he didn't understand it

However, at this time, he has decided to implement the proposed publication plan immediately and put Abel's paper into the first issue. So Abel's research papers, kleler magazine can graally improve its reputation and expand its influence

It was ring this period that Abel's most important work, the extensive study of elliptic function theory, was completed. On the contrary, in the past, it was this work that was treated coldly, experienced hardships, and failed to get fair evaluation for a long time

It is now generally recognized that Abel's work (and later Jacobi's (1804-1851) developed this theory) is one of the two highest achievements of function theory in the first half of the 19th century

The elliptic function studied by Abel is derived from elliptic integral. As early as the 18th century, from the study of many problems in physics, astronomy and geometry, we often derived some integrals that can not be expressed by elementary functions. These integrals and the integrals for calculating the length of elliptic arc often have some formal commonalities, which is the name of elliptic integral

At the beginning of the 19th century, the authority of elliptic integral was Legendre (1752-1833), a senior member of the French Academy of Sciences. He studied this subject for 40 years. He drew many new inferences from his predecessors' work and organized many conventional mathematical topics, but he did not enhance any basic ideas. He led this research to the situation of "mountains and rivers are complex, and there is no way out". It was Abel who eclipsed all Legendre's research in this field and opened up a bright future

The key comes from a simple analogy. There is a well-known formula in calculus. The inverse function of the indefinite integral on the left side of the formula is trigonometric function. It is not difficult to see that the elliptic integral and the above indefinite integral have some form of correspondence

Therefore, if we consider the inverse function of elliptic integral, it should have some form of correspondence with trigonometric function. Since it is much easier to study trigonometric function than inverse trigonometric function expressed as indefinite integral, shouldn't it be much easier to study inverse function of elliptic integral (later called elliptic function) than elliptic integral itself

"reverse", this idea is very beautiful, and it is really very simple and ordinary. But after 40 years of hard thinking, Le Jean never thought of it. There is no lack of such examples in the history of Science: "beautiful, simple, profound and fruitful ideas need not the simple accumulation of knowledge and experience, not the deliberate reasoning, not the repeated chewing of research subjects, but a kind of extraordinary insight that can penetrate all obstacles and go deep into the root of problems. This is probably what people call genius

the idea of "upside down" is like a flash of lightning to illuminate the mystery of this subject. With this idea, Abel has a strategic position to promote his research. He obtained the basic properties of elliptic function, and found the relationship between elliptic function and trigonometric function π The periodicity of elliptic function is proved by the constant K with similar action

he established the addition theorem of elliptic functions. With the help of this theorem, he extended elliptic functions to the whole complex field and found that these functions are Bi periodic, which is a new discovery; He further proposed a more general and difficult type of integral Abel integral, and obtained a key theorem in this respect, namely the famous Abel basic theorem, which is a very wide extension of the addition theorem of elliptic integral

As for the inversion of Abelian integral, Abelian function, was first proposed and studied by Riemann (1826-1866). In fact, Abel found a vast fertile soil, which he could not complete in a short time. In the words of Hermite, Abel's follow-up work "could keep mathematicians busy for 500 years". Abel put these rich achievements into a long paper on the general properties of a class of transcendental functions

at this time, he had put Gauss behind him, gave up his plan to visit goengen, and pinned his hope on the French mathematicians. After he politely declined kleler's suggestion to settle in Berlin, he left for Paris

in the most prosperous metropolis in the world, there are many famous digital giants, such as Cauchy (1789-1857), Legendre, Laplace (1749-1827), Fourier (1768-1830) and Poisson (1781-1840). Abel believes that he will find a bosom friend there

Abel arrived in Paris in July 1826. He met all the famous mathematicians there. They all received him politely, but no one was willing to listen to him carefully about his work. On the noble scale of these celebrities, how much weight can this shy, poorly dressed young man from a remote and backward country have

In his letter to homber about Paris, Abel said: "the French are much more worldly to strangers than the Germans. It's more difficult for you to be close to them. To be honest, I don't expect any glory now

In the end, any pioneer who wants to attract attention here will have to encounter huge obstacles. Although Abel is very confident, he has deep doubts about whether this work can be reasonably evaluated

Abel submitted his paper to the French Academy of sciences through normal channels. Fourier, the Secretary of the Academy of Sciences, read the introction of the paper and commissioned Legendre and Cauchy to review it. When Cauchy took the manuscript home, he couldn't remember where it was. It was not until two years later that Abel died that the original manuscript of the missing paper was found again, and the official publication of the paper was delayed for 12 years

Abel had been waiting in Paris for nearly a year. The landlord he lived in was very mean. He only had two meals a day, but he charged a high rent

One day, he felt very uncomfortable and was diagnosed with lung disease by the doctor. Although he stubbornly didn't believe it, the truth was that he was exhausted. Abel had no choice but to leave Paris and return home with a lonely heart and a sick body. When he returned to Berlin, he was out of pocket. Thanks to the timely remittance of some money, he was able to return home after a short rest in Berlin

Who should be responsible for Abel's misfortune? People will naturally think of Corsi and Legendre who reviewed Abel's thesis. At that time, Cauchy was 38 years old. He was full of energy and creativity. He was busy with his own affairs and neglected others. He made a big mistake. How's Le Jean doing? At that time, he could not be as busy with research as Cauchy, so he should have more responsibility for training and recruiting the young generation of scientific talents

However, the main point is that the theme of Abel's thesis is exactly what Legendre is familiar with. In a sense, it is his hereditary territory. Although there are many novel and difficult concepts in this paper, the basic ideas leading to these concepts are simple

A layman may not be able to appreciate the beauty and profundity of this simple thought, but Legendre is by no means a layman when he is right about the problem he is discussing

5. In 1824, Abel made the first correct proof that the general quintic equation is not solvable by radical. A more detailed proof was published in the first issue of kreal magazine in 1826. The title is "proof of the impossibility of algebraic solution of general equation higher than quartic", Abel discusses and corrects the defects in rufini's argument. Rufini's "proof" lacks the concept of domain, so it is impossible to work under the basic domain and domain expansion determined by the coefficients of known equations. In addition, rufini's "proof" also uses a key proposition which is not proved, later known as Abel's theorem, If an algebraic equation can be solved by radical, then every radical appearing in the expression of the root must be expressed as a rational function of the roots of the equation and some unit roots. Abel uses this theorem to prove that a general equation higher than quartic cannot have radical solutions.

the Abel theorem mentioned above is also the idea of "permutation group"

as mentioned above, Abel's theorem should be this! The details are as follows http://ke..com/view/1651836.htm

6. Abel theorem
in the 16th century, Italian mathematicians tatalia and Kadang discovered the root formula of cubic equation. Two years after the formula was published, caldang's student Ferrari found the formula for finding the root of the quartic equation. At that time, mathematicians were very optimistic. They thought that they would be able to write the root formula of quintic equation, sextic equation and even higher order equation immediately. However, after hundreds of years, no one can find such a formula
is there such a root formula? Abel, a young Norwegian mathematician, replied, "No." Abel proved theoretically that no matter how to use addition, subtraction, multiplication, division and square root operations, no matter how to arrange the coefficients of the equation, it can never be the root formula of the general quintic equation
Abel was the first to solve this problem, so it became Abel's theorem

8. In the 16th century, Italian mathematicians tatalia and Kadang discovered the root formula of cubic equation. Two years after the formula was published, caldang's student Ferrari found the formula for finding the root of the quartic equation. At that time, mathematicians were very optimistic. They thought that they would be able to write the root formula of quintic equation, sextic equation and even higher order equation immediately. However, after hundreds of years, no one can find such a formula

is there such a root formula? Abel, a young Norwegian mathematician, replied, "No." Abel proved theoretically that no matter how to use addition, subtraction, multiplication, division and square root operations, no matter how to arrange the coefficients of the equation, it can never be the root formula of the general quintic equation

Abel was the first to solve this problem, so it became Abel's theorem

9. Error 678 refers to the broadband PPPoE dial-up error reporting under WinXP system, including the popular xDSL Internet access mode and FTTx + VLAN Internet access mode. There are many reasons for error 678 reporting. In other words, error 678 may appear in any link below DSLAM (including DSLAM), such as DSLAM equipment problem, user board problem in computer room, and handover box problem, The main cable problem, the distribution cable problem, the user line problem, the modem problem of the user end, the user computer network card problem, the user computer system problem, and so on, may lead to errors 678, So when dialing again, the network card can't get the
new IP address, and 678 will be prompted. The operation method is: turn off ADSL modem, enter the network connection of control panel, right-click local connection to select disable
, 5 seconds later, right-click local connection to select enable, and then turn on ADSL modem to dial
2. If the first step is invalid, disable the local connection (network card) even if the ADSL modem is turned off, restart the computer, then start the local connection (network card) and turn on the ADSL modem
3. If none of the above steps can be solved, check whether the NIC light is on. If the NIC light is not on, refer to the solution of "NIC light is not on or
often not on" in the dispatch order knowledge base
4. If the NIC light is normal, step 1 and step 2 cannot be solved, then lead the user to unload the NIC driver and re install the NIC driver. If the XP system of the user follows: Zhi
ID: 9973, How to set up ADSL dial-up connection method under WinXP to lead users to create dial-up connection, if 98 system suggests that users install rasppoe software or ehernet300 software to connect
5. If the above operation is invalid, contact the telecommunication department to confirm the port
6. ADSL modem failure is the main reason
7. If multiple computers use a router to access the Internet, try to remove the router and connect to Internet. If the network can be connected smoothly, the router is faulty.
the router should be removed or replaced with a new one
8. If you are an ADSL package year user, if this happens ring use, it may be e to phone calls. Please consult the customer service center. Some areas of China Telecom or China Unicom users, in the case of telephone arrears, can get through the phone, but can not access the Internet, at this time may also be the telephone arrears, because now some areas of the telecommunications department in the case of telephone arrears, not to stop the use of the phone, but to stop the use of the network
9. Insufficient power supply of some brands of modems is also easy to cause errors. 678: users can access the Internet through ADSL dial-up, and double-click the dial-up connection to prompt "error 764, no smart card reader installed", as shown in the figure: solution: right click "network neighborhood" to select "properties", right click "dial-up connection" to select "properties", as shown in the figure:
select "security" tab, Change "verify my identity as" "use smart card" to "allow password without security measures" and click OK. As shown in the figure:
this scheme is applicable to Windows XP system and vista system (the text prompt of setting interface is different).