How to read some English numbers ten thousand 100000 one hundred and fifty thousand Two hundred thousand three hundred and fifty thousand How to read it in English
ten thousand
one hundred thousand
one hundred and fifty thousand
two hundreds thousand
three hundreds and fifty thousand
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- 1. How to read English numbers How to read 17600 and 17060? Should we add and between 7 and 6?
- 2. How to read numbers in English 325500470 is read as: three hundred and twenty five, five hundred and four hundred and seven or three hundred and twenty five, five hundred, four hundred and seven
- 3. Let f (x) = cosx be expanded into a power series of X + π / 6,
- 4. The function f (x) = 1 / (x2-x-6) is expanded into a power series of X
- 5. How to read 6.30
- 6. 6: How to say 30 in English
- 7. 6: How to say in English
- 8. 1.6:30 (English) 2. At 7:05 3. At 9:45
- 9. 6: 30 how to write in English
- 10. How to read 6:40 in English
- 11. How to read numbers in English 801702 is read as: eight hundred and one thousand, seven hundred and two?
- 12. Stipulation: 0.1 = 1 / 10 = 10 to the - 1st power, 0.01 = 1 / 100 = 10 to the - 2nd power, can 0.000001768 be expressed as a times 10 to the n power?
- 13. Fill in the blanks with the code: the coefficients of each item in the expansion of the nth power of (a + b) are very regular. These coefficients form the famous Yang Hui triangle The following program gives the calculation method of the nth coefficient of the m-th layer, try to perfect it (m, n are calculated from 0) \x05public static int f(int m,int n) \x05{ \x05\x05if(m==0) return 1; \x05\x05if(n==0 || n==m) return 1; \x05\x05return __________________________ ;
- 14. How many positive integers is it to find the 12 power of n = 2 multiplied by the 8 power of 5?
- 15. The number of digits of the nth power of a positive integer The number of digits of positive integer power is regular. When the number of digits of positive integer a is 0,1,5,6, the number of digits of a ^ n is still 0,1,5,6; when the number of occurrences of a is 4,9, the number of digits of power will appear repeatedly every time the exponent of a increases by 2; when the number of digits of a is 2,3,7,8, the number of digits of power will appear repeatedly every time the exponent increases by 4 If the single digit of a ^ k is a, then the last digit of a ^ 4m + k is also a (k is a positive integer, M is a non negative integer) Example 1 find the number of 2003 ^ 2005 2003^2005=2003^4×501+1. Because the single digit of 2003 ^ 1 is the same as that of 3 ^ 1, the single digit of 2003 ^ 2005 is 3 Example 2 find the integer x satisfying the equation x ^ 5 = 656356768 ∵ 10 ^ 5 is 6 digits. 100 ^ 5 = 10 ^ 10 is 11 digits Because x ^ 5 is 9 digits. So 10
- 16. Given that n is a positive integer and the nth power of (the 2nd power of x) is 9, find the 2nth power of the 2nd power of (- 1 / 3 times the 3nth power of x) - 3 (- the 2nd power of x)
- 17. The nth power of 2.8 * the nth power of 16 = the 22nd power of 2 to find the value of positive integer n
- 18. Let n be a positive integer and n ^ 2 + 1085 be a positive integer power of 3
- 19. Comparison: SN = 1 / 2 + 2 / 4 + 3 / 8 + 4 / 16 +The power of N / 2 (n is a positive integer) and the size of 2
- 20. Compare Sn = 12 + 24 + 38 + 416 + +N2n (n is any natural number) and the size of 2______ .