What is exponential logarithm inequality?
Inequalities with known numbers in exponents
RELATED INFORMATIONS
- 1. Solutions to exponential inequality and logarithmic inequality
- 2. The problem of power function in high school mathematics It is known that the power function f (x) = x ^ (1 / 2p ^ 2 + P + 3 / 2), (P ∈ n), is an increasing function on (0, + ∞), and is an even function on the domain of definition (1) Find the value of P and write the explanation of the corresponding function f (x) (2) For the function f (x) obtained in (1), let g (x) = - Q [f (x)] + (2q-1) f (x) + 1, and ask whether there is a real number Q (q)
- 3. High school mathematics. Logarithmic inequality problem What are the answers to Log1 / 8 x 〉 1 / 3 and Log1 / 8 x 〈 - 1 / 3? How to solve this kind of logarithmic inequality, with fractions, negative numbers See dizzy. Have what method
- 4. (logarithm and inequality) Given that the real number m satisfies the inequality log3 (1-1 / M + 2) > 0, try to solve the inequality (x-1) [(M + 3) x-m] > 0
- 5. If the power functions f (x) and G (x) pass through the points (2, root 2), (- 2,4) respectively, ① find the analytic expressions of F (x) and G (x); ② find f (x)
- 6. Let f (x) = x ^ (3 / 2 + K · 1 / 2 k-square) [K ∈ Z] (1) If f (x) is an even function and an increasing function on (0, + ∞), the analytic expression of F (x) is obtained (2) If f (x) is a decreasing function on (0, + ∞), find the value range of K
- 7. Who can explain the inequality of solving fractional equation
- 8. When will inequality change its sign? for example -X is greater than or equal to - 9 Is it a success X is less than or equal to 3?
- 9. When does inequality change sign in calculation Is it necessary to change sign when adding, subtracting, multiplying and dividing negative numbers? For example?
- 10. High school inequality comparison size Given that a ≠ 0, compare the size of (a ^ 2 - √ 2A + 1) (a ^ 2 - √ 2A + 1) and (a ^ 2 + A + 1) (a ^ 2-A + 1) To write simplification, I forgot how to write simplification~
- 11. How to find the inequality of logarithm and exponent? The inequality 3x ^ 2 is known
- 12. Solving a logarithmic inequality log0.5log2(2x-1)>=0
- 13. Solve this logarithmic inequality log9 (x) < 1/2
- 14. Solving logarithmic inequality log3(3^x-1)*log3(3^(x+1)-3)
- 15. Solve the following logarithmic inequality, log1/2 ((4x^2)-x)>1
- 16. Fast solution to logarithmic inequality Log base 2 (x ^ - 2x + 2) logarithm > log base 2 (2x-1) logarithm
- 17. How to solve logarithmic inequality? The logax is less than - 1, where x is greater than 2008 and a is greater than 1
- 18. Inequality of logarithmic solution 1 / 2 power of logm2 > 1 M is the base 1 / 2 of 2 is true
- 19. Solving logarithmic inequality Log (x + 1 is base, (x ^ 2 + X-6) ^ 2 is true) > = 4
- 20. log2^x >= log4^(3x+4) How can log2 and log4 become the same base? Ah, it should be very simple for you. I hope some good people can help me, The base numbers are two and four