If it is accurate to ten thousand bits, the approximate value of 80600 is taken as
80600 is 80600, but you need to be accurate to 10000, that's 80000
RELATED INFORMATIONS
- 1. Take the approximate value of 605087 to ten thousand bits, which is about () with the rounding method!
- 2. According to the requirements in brackets, use the rounding method to approximate 1022.0099, where the error is () (a) 1022.01 (accurate to 0.01) (A) 1022.01 (accurate to 0.01) (b) 1.0 × 103 (2 significant digits reserved) (C) 1020 (to the tenth) (d) 1022.010 (to the thousandth) Why is option a wrong and why does option B keep two significant numbers instead of counting after the decimal point
- 3. The third power of 8.8x10 is accurate to the tenth place. Are there two significant numbers wrong? Then why is the fourth power of 1.61x10 accurate to the hundredth place
- 4. For a seven digit number, the number on each digit is different, and the sum is 36. What is the maximum number of the seven digit number?
- 5. There is a seven digit number. The sum of the numbers in each digit is 55. After adding 2 to this number, we get a new number. The sum of the numbers in each digit of the new number is 3 What's the original number
- 6. For a seven digit number, it is 5 in millions and 100000, 3 in thousands, and 0 in all other digits. (2) (3) (1)
- 7. For a four digit number, the number on one digit is 5, the number on ten digit is 8, and the sum of any three adjacent digits is 20. What is the four digit number
- 8. For an eight digit number, the high order is 7, the difference between any adjacent digits is 3, and the lowest order is 7______ .
- 9. How to calculate the fifth power of a × the sixth power of B
- 10. Seven fifths of a square kilometer equals () square kilometer () hectare
- 11. The approximate value of 0.03658 to 0.001 is obtained by rounding method
- 12. 3.3 is the approximate value of 3 and 1 / 3, of which 3 and 1 / 3 is called true value. The approximate number obtained by the rounding method is 27, and the following numbers () may be true values (1):26.48 (2):26.54 (3):27.59 (4):26.96 (5):27.04
- 13. There is a formula, the box on the left is all integers, and the answer on the right is only the approximate value of rounding: a few thirds + a few fifths + a few sevens ≈ 1.16
- 14. Using the rounding method, the accuracy is 0.01, and the approximate value of 5.649 is 0.01______ .
- 15. Take the approximate value of 10304 (accurate to hundreds) according to the requirements of rounding method
- 16. 11377 use the rounding method to keep the approximate value of two significant numbers There is also a question: use scientific counting method to express 89900000, and keep two significant numbers
- 17. Round off each of the following approximate numbers ① 6328 (accurate to 0.01) ② 372300 (accurate to thousands) ③ 003499 (two significant digits reserved)
- 18. I would like to ask the next approximation and accurate number how they round to what place Take the approximate number, generally use the method of rounding, rounding to which place, say the approximate number is accurate Make sure who you are
- 19. Use the rounding method to approximate the following numbers 003 56 (accurate to 0.0001) 566.123 5 (accurate to individual) 3.896 3 (accurate to 0.01) 0.057 1 (accurate to thousandth)
- 20. The sixth power of 4A × the sixth power of B-the sixth power of 8A × the sixth power of B