The following formula is correct: a. √ A & # 178; = a B. √ a ·√ B = √ AB C. √ AB = √ a '√ B D. √ A / b = √ A / √ B

RELATED INFORMATIONS

• 1. It is known that a is the smallest positive integer, B and C are rational numbers, and have | 2 + a | + (a + C) & # 178; = 0. Find the value of 4AB + C / - a # 178; + C & # 178; + 4
• 2. (1) 3 () 2; (2) - 2 () 0; (3) a & # 178; () 0; (4) - A & # 178; () 0 [use unequal sign to connect the following numbers or formulas] （1）3（）2；（2）-2（）0；（3）a²（）0；（4）-a²（）0 What language in life can be replaced by these unequal symbols (1) <: less than___________________ (2) Greater than___________________ (3) ≥: greater than or equal to________________ (4) ≤: less than or equal to________________
• 3. Given a set, a = {x | X & # 178; - # 8722; 1} = 0, then the following formula is correct () ①1∈A ②{-1}∈A ③φ ⊆A④{ 1,−1}⊆A A. 1 B.2 C.3 D.4 That box is about subsets of symbols, I do not know how to make summer self-study Especially the third one is not to be added{
• 4. b> A > 0 proves B-A / b
• 5. Let a and B be positive numbers, and prove the following inequality (1.) B / A + A / b ≥ 2 (2.) a + 1 / a ≥ 2
• 6. Prove the inequality a ^ 5 + B ^ 5 ≥ a ^ 3B ^ 2 + A ^ 2B ^ 3 (a > 0, b > 0)
• 7. A proof of mathematical inequality P ≥ 0, Q ≥ 0, P + q = 1 AP + BQ and √ (A & # 178; P + B & # 178; q) ratio
• 8. Algebraic inequality 1 Let x, y, Z ∈ R +, prove: X √ [x / (1 + YZ)] + y √ [y / (1 + ZX)] + Z √ [Z / (1 + XY)] ≥ 3 / √ (1 + XYZ)
• 9. A proof of inequality Given that a, B and C are positive real numbers and ab + BC + Ca = 3, it is proved that a ^ 2 + B ^ 2 + C ^ 3 + 3ABC ≥ 6 That's right!
• 10. Prove 1-p (a ~) - P (b ~)
• 11. If a-178; - A
• 12. It is proved that [2 [under radical (n + 1) - 1]] < 1 + 1 / radical 2 + 1 / radical 3 + +Thank you very much RT
• 13. Prove by definition: if a > b > 0, C
• 14. It is known that a > b > 0, C > d > 0, a of B = C of D. it means that ① (a + b) / a = (c + D) / C. ② (a-b) / b = (C-D) / d Please use the eighth grade knowledge of Shandong education press to answer, thank you
• 15. To prove x ＞ y a ＜ B and all of them are positive numbers to prove X / x + a > y / y + B requires seven solutions to do the difference method, the quotient method and the reciprocal method. I can prove the remaining four At least 5 solutions can add 100 points
• 16. What is reciprocal
• 17. What is the reciprocal method
• 18. Given that A-B = B-C = 3 / 4, the square of a + the square of B + the square of C = 1, what is the value of AB + BC + Ca
• 19. Given that a + B + C = 12, the square of a + the square of B + the square of C = 60, find the value of AB + BC + Ca, and ask for the help of God
• 20. If a > b > C is known, it is proved by analysis or synthesis that 1 / (a + b) + 1 / (B-C) > = 4 / (A-C)