Given that a plus B equals three and ab equals one, find the value of a plus a and B of B

a+b=3,ab=1,a/b+b/a =(a^2+b^2)/(ab) =(a^2+2ab+b^2)/(ab)-2 =(a+b)^2/(ab)-2 =3^2/1-2 =7

RELATED INFORMATIONS

1. What is the difference between the product of 7 / 15 and 5 / 2 minus the quotient of 7 / 58 divided by 29 / 5?
2. A positive integer, if 100 is a perfect square, if 168 is another perfect square, then the positive integer is______ ．
3. In the calculation of the value of (x + y) (x-2y) - my (nx-y) (m.n are all constants) Calculate the value of (x + y) (x-2y) - my (nx-y) (m.n are constants). When substituting the value of X and Y into the calculation, careless Xiaoming and Xiaoliang misjudged the value of Y, but the calculation results were all equal to 25. Careful Xiaomin substituted the correct value of X and y into the calculation, and the result was exactly 25. In order to find out, she arbitrarily took 2009 as the value of Y, and you say it's strange, the result was still 25 (1) According to the above situation, try to explore the mystery; (2) Can you determine the values of M, N and X?
4. Let the sum of the first n terms of the sequence {an} be Sn, and 2An = Sn + 2n + 1 (n ∈ n *) (I) find A1, A2, A3; (II) prove that the sequence {an + 2} is an equal ratio sequence; (III) find the sum of the first n terms of the sequence {n · an} and TN
5. Given AB = 1, a is not equal to 1, find 1 + 1 / A + 1 + 1 / b
6. How much is (one third) + two fifths? It's one fifteenth
7. How many odd divisors are there from 360 to 630?
8. Let the series ∑ (n = 1) UN converge and ∑ UN = u, then the series ∑ (UN + U (n + 1)) =?
9. Let the positive series ∑ UN converge and the sequence {VN} be bounded. It is proved that the series ∑ UN} is absolutely convergent
10. Let the positive series ∑ UN diverge and Sn be the partial sum sequence of UN. It is proved that the series ∑ UN / Sn ^ 2 converges
11. Let {an} satisfy a1 + 3a2 + 3 & # 178; A3 +... + 3 ^ (n-1) an = n / 3, n ∈ n + * (1) find the general term of {an}; (1) Find the general term of the sequence {an}; (2) let BN = n / an, find the first n term and Sn of the sequence {BN} a1+3a2+3^2a3+······+3^(n-1)an=n/3 a1+3a2+3^2a3+······+3^(n-2)a(n-1)=(n-1)/3 Subtraction of two formulas 3^(n-1)an=n/3-(n-1)/3 3^(n-1)an=(n-n+1)/3 3^(n-1)an=1/3 an=1/3^n bn=n/an =n/(1/3^n) =n*3^n Why? a1+3a2+3^2a3+······+3^(n-1)an=n/3 a1+3a2+3^2a3+······+3^(n-2)a(n-1)=(n-1)/3 Subtraction of two formulas 3^(n-1)an=n/3-(n-1)/3 How do you get this by subtracting 3 ^ (n-1) an = n / 3 - (n-1) / 3 Subtraction is not to get 3 ^ (n-1) an-3 ^ (n-2) a (n-1) = n / 3 - (n-1) / 3. How can it be transformed into 3 ^ (n-1) an = n / 3 - (n-1) / 3
12. If x ^ n = 2, y ^ n = 3, (x ^ 2Y ^ 3) ^ n=
13. If you add 100 to a positive integer, it is a perfect square number. If you add 168, it is another perfect square number Who can know the answer, please write down the process
14. [8 / 15 minus (7 / 12 minus 2 / 5)] × 15 / 14 If it's good, there's a reward for wealth I also want
15. Given a + B = 3, ab = 1, then the value of AB + Ba is equal to______ ．
16. In sequence an, A1 = 1 / 4, when n > = 2, there is (3N ^ 2-2n-1) an = a1 + A2 + a3 +. + a (n-1) (1) . find an (2) . find the first n terms and Sn
17. If x ^ n = 2, y ^ n = 3, find the value of (x ^ 2Y) ^ 2n
18. A positive integer, if 100 is a perfect square, if 168 is another perfect square, then the positive integer is______ ．
19. Subtract a number from the difference between seven eighths and a quarter to get two fifths. What's the number?
20. If AB = m (a > 0, b > 0, m ≠ 1) and logm (b) = 2, then logm (a)=