3 2525 What is the hundredth digit after the decimal point?

This is a simple calculation problem, 100 2 = 50, so the hundredth digit is 5 first, listen carefully to the teacher's lecture. This is the main reason why I got good results. When listening to lectures, you should pay full attention, concentrate on it, follow the teacher's train of thought, and do not desert, and do not listen to lectures while speaking.

Secondly, we should pay attention to every word that the teacher says, because mathematics is known for its rigor, and the difference between one word is not trivial, and there are infinite hidden mysteries between each word. Also take notes when listening to lectures. Once, the teacher told me a difficult geometry problem, I didn't understand it for a while, thanks to me writing down the problem and the solution, and after going home, I pondered it carefully, and finally understood it thoroughly, so that in a competition, I easily solved a similar problem and got a valuable 10 points.

You should also actively raise your hand to speak in class, and there are many benefits of raising your hand to speak! It can reinforce what you have learned in class. I exercised my eloquence.

Those vague ideas and mistakes can be taught by the teacher. It's a triple win. In short, we should listen to lectures with our hands, mouth, eyes, ears, and hearts.

Second, extracurricular exercises. Confucius said: "Learn and learn." Homework is also an important part of learning and consolidating math. I pay a lot of attention to the precision and speed of problem solving. Precision is accuracy.

Concentrate on completing homework independently, strive to be accurate the first time, and correct mistakes in time. And speed is to exercise one's concentration and sense of urgency. I often do this by setting an alarm when I start doing my homework and putting it out of my sight to help speed up my work.

When it comes to exams, you won't be nervous, and you won't lose sight of one or the other.

, the 100th decimal place is 5

The hundredth place after the decimal point is the number 5, which is a pure cyclic decimal 25, the number of post-decimal places is 2, the even number is 5, and the hundredth place is the even number, so it is 5.

The 100th digit after the decimal point of three points is five. 2525 is a group of four numbers. 100 4 is divisible. So the 100th digit after the decimal point is five.

It is an infinite loop of 25, the odd number is 2, the even number is 5, and the hundredth place after the decimal point is an even number, so the corresponding number should be the number 5.

The decimal is an infinite loop decimal number, and the parts that are constantly looping are 2 and 5, that is, the first place after the decimal point is 2, the second place is 5, the third place is 2, and the fourth place is 5,..

The law of this cycle is that the odd digits after the decimal point are 2 and the even digits are 5.

Because it is the hundredth digit and 100 is an even number, the hundredth digit is 5.

Hope it helps!

Because the decimal is a cyclic decimal number, and the cyclic knots are 32, two digits, so there are a total of 100 numbers, that is, there are 100 2=50 cyclic knots.

So the 100th slag and the number is 2.

The loop is 32, and the even digits after the decimal point are 2, so the 100th digit is 2.

Start with four digits per elimination key, cycle 532532532, and repeat every three digits.

2021 3 = 673 and 2/3, 2/3 is the second out of every three, 532, and the third is 3

A: The 2021st decimal place is 3

After calculation, the result of 1 7 is that this number is a circular decimal number, and its decimal part has six vertical royal markers, and these six digits will be repeated in a loop. Therefore, the number can be obtained to the third hundredth decimal place of the number is 4. This is because the 6 numbers in the loop section are in the order of the loop.

Each time these six digits are repeated, it is equivalent to an extension of 6 decimal places. In order to get the third hundredth digit, one needs to divide 300 by 6 to take the remainder, and the result is 0, i.e., in the first position of the cycle section, so the sum of the third hundredth digit after the decimal point is 4. Demolition of locust.

7 , 1 7 is equal to the infinite loop of the Chong family. 300 6 = 50 whole wax division, so the first dispersion 300 bit i is 7

Because for the 321 cycle.

Formula: 50 3=16....Douso....2, therefore, there are 16 groups of such slag rings, and there are also the top 2 of this cycle.

So, the sum of the first 50 digits is:

If you don't understand, please ask about the empty beam calendar, please solve it, it's not easy to answer the question, thank you for your support!

This does not show that the false belief in the number of gods is a cycle.

This decimal is.

That cycle is 345

The number in the fiftieth digit of the blind round part is 4

Summary. Dear,This is a rule.,First of all,The title says the 500th digit after the decimal point 5,The sum is 1816.

What is the 500th digit after the decimal point in this number? The number after the decimal point.

Hello, trouble.

What is the 500th digit after the first comma in this number? After the decimal Zheng Chan pointed, this number shouted what the sum of the dust was.

Dear,This is a rule.,First of all,The title says the 500th digit after the decimal point 5,The sum is 1816.

Specifically, it is calculated like this, 25713 in the number of Chi Ling is a cycle of 99 times to the end of the 100th cycle to 5, the sum is 25713, the sum of these numbers is x99, and there are 3 9s in front of it, and the sum of three 9s needs to be added, in addition to the 2 and 5 of the hundredth cycle, the sum of the front 25713 is 18x99, which is equal to Xiaodan, which refers to 1782 + 27 + 2 + 5 is equal to 1816

Take a look.

2003 bits were 6

Pi is 3000 decimal places.