If in the function y = 2-m / 3x + (m ^ 2-4), X is inversely proportional to y, then M=
M ^ 2-4 = 0 and 2-m ≠ 0
M = - 2
RELATED INFORMATIONS
- 1. Where y is the inverse proportion function of X, a.x (Y-1) = 1 b.y = 1 / x + 1 C.Y = 1 / X squared D D.Y = 1 / 3x Why?
- 2. The monotone increasing interval of function y = 2tan (3x + π / 6) is?
- 3. Monotone increasing interval of function y = 2tan (3x + π / 4)
- 4. The function g (x) = - 2lnx + ax - (3a + 2) / X is not monotone in the interval [1,4], and the range of a is obtained Using derivative to do classification discussion
- 5. The maximum and minimum values of F (x) = 2x4-3x2 + 1 on [12,2] are______ .
- 6. Finding the maximum value of the function FX = x ^ 2-2ax-1 in the interval [0,2]
- 7. Given the function FX = x & sup2; - 2aX + 3 (1 ≤ x ≤ 3), find the minimum value H (a) of function FX and write the monotone interval of function H (a)
- 8. Given the function f (x) = (2ax-1) / (2x + 1) (1) a = 1, the monotone interval (2) f (x) of F X is the range of increasing function to find a in (negative infinity, - 1 / 2)
- 9. Given the function f (x) = x2-2ax, find the minimum value g (a) of F (x) in the interval [- 1,1]
- 10. Let the derivative function of F [x] on R be f "[x], and 2F [x] + XF" [x] > x ^ 2. Find the size relation of F [x] and X, and the sum of F [x] Suppose that the derivative of F [x] on R is f '' [x], and 2F [x] + XF '' [x] > x ^ 2, find the size relationship between F [x] and X, and the size of F [x] and X That's the title Do it yourself.
- 11. Given the function y = K (3x + 4) - 5, when x = 1, y = 2 (1) find the value of K (2) if (m, - 2) on this function image, find the value of M
- 12. Given the function y = [2m + 1] x + M-3, if the image of the function is parallel y = 3x-3, find the value of M
- 13. Given that function x ^ 3 + 3mx ^ 2 + NX + m ^ 2 has extreme value 0 when x = - 1, find m and n
- 14. If f (x) = ax ^ 3 + 3mx ^ 2 + NX + m ^ 2 has an extreme value of 0 when x = - 1, then M + n =? Note that the third power of X is preceded by A
- 15. Given that the function f (x) = x ^ 3 + 3mx ^ 2 + NX + m ^ 2 has an extreme value of 0 when x = - 1, then M + n =? I will try 11 and 4, but the correct answer is only 11 Why give up 4?
- 16. It is known that x = 1 is an extreme point of the function f (x) = MX ^ 3-3 (M + 1) x ^ 2 + NX + 1
- 17. It is known that x = 1 is an extreme point of the function f (x) = mx3-3 (M + 1) x2 + NX + 1, where m, n ∈ R It is known that x = 1 is an extreme point of the function f (x) = mx3-3 (M + 1) x2 + NX + 1, where m, n ∈ R, M > 0 (1) Find the expression of the relationship between M and n; (2) Finding monotone interval of F (x); detailed process
- 18. Given that the function f (x) = X3 + MX2 + NX + 1 has extremum at x = two-thirds and x = 1, find the value of real number m, N and the monotone decreasing interval of function f (x) (...) Given that the function f (x) = X3 + MX2 + NX + 1 has extremum at x = two-thirds and x = 1, find the value of real number m, N and the monotone decreasing interval of function f (x) (necessary steps)
- 19. If f (x) satisfies f (x + 2) = f (x), f (2 + x) = f (2-x), and X belongs to [2,3], f (x) = (X-2) ^ 2, find the expression of F (x) in the interval [4,6]
- 20. If f (x) = cos (3x - α + π / 6) is odd, then Tan α is equal to