If a & # 178; - B & # 178; - 4 - () = A & # 178; + B & # 178; + AB, then the formula in () is? 1.8-8x/1.2-1.3-3x/2=5x-0.4/0.3
If a-b-178; - 4 - (- 2b-178; - ab-4) = a-178; + b-178; + ab
RELATED INFORMATIONS
- 1. Please use the square difference formula: (a + b) (a-b) = A & # 178; - B & # 178;, calculate: 100 & # 178; - 99 & # 178; + 98 & # 178; - 97 & # 178; +... + 2 & # 178; - 1 & # 178;
- 2. The results of (a + b) 178; - (a-b) 178; are calculated
- 3. (a-b) (A & # 178; + B & # 178;) (a ^ 4 + B ^ 4) (a + b) how to use the square difference formula
- 4. If we want to make 16x & # 178; + 1 a complete square, we should add the following formula
- 5. The following formula can be calculated by the square difference formula: A. (a + b) (- a-b) B. (a-b) (B-A) C. (a-b) ^ D. (- A + b) (- a-b)
- 6. If the trinomial square difference formula (a + B-C) becomes a square difference formula, which formula should it multiply with
- 7. If a = B, then the following formula does not hold: A & # 178; + B & # 178; = A & # 178; B & # 178; a & # 178; = B & # 178; AC = BC, a-c = c-b
- 8. If A-B = B-C = 3 / 5 and a & # 178; + A & # 178; + A & # 178; = 1, find the value of AC + BC + AC
- 9. If AC & # 178; < BC & # 178;, then the relation between a and B is a___ b. (if C is 0, then the inequality does not hold)
- 10. AB-AC + bc-b & #178; factorization
- 11. If we know (a + b) 178; = m, (a-b) 178; = n, then ab=_____
- 12. Given (a + b) 178; = m, (a-b) 178; = n, find the value of: (1) (A & # 178; + B & # 178;) / AB; (2) ab It's represented by m, n
- 13. If a + B = m, ab = n, find the value of a & # 178; + B & # 178
- 14. Sin & # 178; a + cos & # 178; a = 1. What other formulas like this?
- 15. With the four numbers of 1, 5, 6 and 7, through four operations and parentheses, what is the formula of 21?
- 16. According to the requirements, fill 1,2,2 / 1 in the brackets respectively, 5 / 8 divided by (), 5 / 8 divided by (), 5 / 8 divided by ()
- 17. In the formula 6 × 4 + 18 ÷ 6 + 8, the minimum result is______ .
- 18. How to add the bracket 1.7 × 0.9 + 1.2 △ 0.3-0.2 = 48.8 to make the formula hold! 1.7×0.9+1.2÷0.3-0.2=48.8 2.7×0.9+1.2÷0.3-0.2=18.3 3.7×0.9+1.2÷0.3-0.2=75 4.7 × 0.9 + 1.2 △ 0.3-0.2 = 47.6, there are four,
- 19. Add, key, multiply, divide, bracket and other symbols in the following formula to make the number equal to 1. (1) 1 2 3 4 = 1 (2) 1 2 3 4 5 6 = 1
- 20. Fill in the circle and box with the seven numbers 0, 1, 2, 3, 4, 5 and 6. Each number appears just once, forming an integer formula with only two digits and two digits