(x / x2-9) - (1 / x2 + 6x + 9) calculation
(x/x2-9)-(1/x2+6x+9)=x/(x+3)(x-3)-1/(x+3)²
=[x(x+3)-(x-3)]/(x-3)(x+3)²
=[x²+3x-x+3]/(x-3)(x+3)²
=(x²+2x+3)/(x-3)(x+3)²
RELATED INFORMATIONS
- 1. [compare the size of X2 (square of x) - 4x + 3 and X2 (square of x) - 6x + 9] Compare the size of x2-4x + 3 and x2-6x + 9
- 2. X2-6x + 9-y2~~
- 3. x2-y2-6x+9
- 4. Finding the minimum value of Y & # 178; + 4Y + 8 Read the process below Solution: Y & # 178; + 4Y + 8 = y & # 178; + 4Y + 4 + 4 = (y + 2) 178; + 4 ≥ 4 The minimum value of Y & # 178; + 4Y + 8 is four The minimum value of a & # 178; + A + 1 can be obtained by imitating it
- 5. Read the following solution process, find the minimum value of Y square + 4Y + 8. Solution: y square + 4Y + 8 = y square + 4Y + 4 + 4 = (y + 2) square + 4 ≥ 4, so the minimum value of Y square + 4Y + 8 is 4. Follow the above solution process, find the minimum value of m square + m + 1 and the maximum value of 4 - (x square) + 2x ~ ~ ~ urgent, everyone help me
- 6. Read the following questions and their solutions: find the minimum value of Y & # 178; + 4Y + 8 Solution: Y & # 178; + 4Y + 8 = y & # 178; + 4Y + 4 + 4 = (y + 2) 178; + 4 ≥ 4, so the minimum value of Y & # 178; + 4Y + 8 is 4. Follow the above solution process to find the minimum value of M & # 178; + m + 1
- 7. Y & # 178; + 4Y + 8 = y & # 178; + 4Y + 4 + 4 = (y + 2) & # 178; + 4 ≥ 4, so the minimum value of Y & # 178; + 4Y + 8 is the minimum value of M & # 178; + m + 4
- 8. It is known that the root of the equation x + 9x + 4 = 0 is α β 1? 2. The quadratic equation with square root of α and square root of β is?
- 9. To solve the quadratic equation of one variable (1) x2 + 3x + 1 = 0 (2) x2-10x + 9 = 0 (3) (2x-1) 2 = (3x + 2) 2 (4) (x-1) (x + 2) = 2 (x + 2)
- 10. 4X square - 4Y square - 4x + 4Y + 11 = 2
- 11. Find the maximum and minimum value of function f (x) in the interval [- π / 4, π / 4] f(x)=sin(2x+π/3)+sin(2x-π/3)+2cos²x-1,x∈R
- 12. If the function y = - x + 6x + 9 has a maximum value of 9 and a minimum value of - 7 in the interval [a, b] (a < B < 3), then a =?, B =?
- 13. The function y = - x ^ 2 + 6x + 9 is in the interval [A.B] (A
- 14. The function f (x) = - x ^ 2-6x + 9 in the interval a, B, (a)
- 15. Find the maximum and minimum value of the function y = x2 + 6x-7 in the interval [- 8,3]
- 16. The function y = - X & # 178; + 6x + 9 is in the interval [A.B] (A
- 17. What is the factorization of the square of a + AB?
- 18. Factorization of a ^ 2-5ab-24b ^ 2
- 19. Factorization a ^ 2 + 6B ^ 2-5ab-2ac + 6BC Ask for detailed explanation
- 20. Image and properties of exponential function If the image of function f (x) = X-1 power of a + 3 (a > 0 and a ≠ 1) passes through the fixed point P, try to find the coordinates of point P