10 = () + () = () + () fill in the appropriate prime number
Prime numbers within 10 are only 2, 3, 5 and 7
The above equation can only be filled in 3 + 7
If you can fill in the same, 5 + 5 is also considered
RELATED INFORMATIONS
- 1. 10 = () × (), fill in the appropriate prime number
- 2. Fill in the brackets with the appropriate prime number 20 = () + ()
- 3. What are the prime numbers within 20 What is prime
- 4. What are the prime numbers of 20?
- 5. The difference between prime number and prime number
- 6. What are prime numbers and prime numbers? What is their relationship?
- 7. Prime = prime?
- 8. Is the 71st power of 2 + 1 prime It is helpful for the responder to give an accurate answer
- 9. a. B and C are three prime numbers within 100, which satisfy a + B = C______ Group
- 10. Given 100 ^ a = 3100 ^ B = 5, find the value of (1) 100 ^ 2A + 100 ^ 3b and (2) 100 ^ 2A + 3B
- 11. Fill in the appropriate prime number in (). 10 = () + () = () + () 20 = () + () = () + ()
- 12. The prime number between 10 ` 20 has () where () digit is still a prime number after swapping position with digit on ten digit
- 13. The sum of two prime numbers is 20 and the product is 51. What's the difference between them
- 14. a. B is two different prime numbers. If a + B = 20, a * b = 51, then what are a and B respectively a. B is two different prime numbers. If a + B = 20, a * b = 51, then what are a and B respectively, the formula, method and idea should all be adopted,
- 15. a. B is two different prime numbers. If a + B = 20 and a * b = 51, what are the values of a and B?
- 16. Given that the quadrilateral ABCD is a convex quadrilateral, ab = 2, BC = 4, CD = 7, then the value range of segment ad is A: 0 < AC < 7 B: 2 < ad < 7 C: 0 < ad < 13 D: 1 < ad < 13 need to explain the reason
- 17. Given that a, B, C are prime numbers and a + B + C = 86, ab = BC = AC = 971, find a, B, C I found that I had the wrong number. It should be ab + BC + AC = 971... I was wrong =. =
- 18. Let a, B, C be prime numbers, and a + B + C = 68, AB + BC + AC = 1121, find the value of ABC It's urgent. Please hurry up
- 19. If a, B and C are prime numbers, then is ab + BC + AB necessarily prime
- 20. Given that three different prime numbers a, B and C satisfy ABC + a = 2000, then a + B + C=______ .