Why should the algorithm of power be specified (m, n are positive integers)
You just started, so start with positive integers
In fact, later you will know that it's OK not to be a positive integer
RELATED INFORMATIONS
- 1. Logarithmic property The solution of cubic equation of one variable
- 2. Question: Let log567 = a denote the following expressions with a (1)log56 8 (2)log56 2 (PS: 56 is base, 8 and 2 and 7 are true)
- 3. If the positive integer m satisfies 10m-1 < 2512 < 10m, then M=______ .(lg2≈0.3010)
- 4. (1) It is proved that Logan = logcnlogca (where a > 0, a ≠ 1, n > 0, C > 0, C ≠ 1). (2) let a and B be positive numbers not equal to 1, it is proved that loganbm = mnlogab (m ∈ R, & nbsp; n ∈ R, & nbsp; n ≠ 0)
- 5. The derivation of logarithm operation property 3 Use ^ to express the power and log (a) (b) to express the logarithm of B with a as the base log(a)(M^n)=nlog(a)(M) I want to know the derivation process of this formula!
- 6. (3) Logamn = nlogam (n ∈ R). How to prove this
- 7. Why is a function f (x) equal to the LNF (x) power of E
- 8. Given that the function f (x) is a piecewise function, when x is greater than or equal to 0, f (x) = x ^ 2 + 1, when x is less than 0, f (x) = 1. Then the range of X satisfying the inequality f (1-x ^ 2) > F (2x) is?
- 9. Given that the power function satisfies: X ≥ 4, then f (x) = (1 / 2) ^ X; when x < 4, f (x) = f (x + 1), then f (2 + L, logarithm of 3 with 2 as the base) is,
- 10. Why lg5 · LG20 = lg5 (2lg2 + lg5) See the answer is written like this, but I even to (1 + LG2) (1 - LG2), ask for detailed explanation
- 11. It is known that the angle between the unit vector m and N is 60 degrees. It is proved that (2n-m) is perpendicular to m and its geometric meaning is explained thx/ .\
- 12. There are also logarithmic inequalities in solving the true number of logarithms. For example, how to solve (2 / 3) ^ logx ^ log2 ^ 3x
- 13. When x ∈ (1,2), the square of inequality (x-1) < with a as the base, the logarithm of X is constant, then what is the range of a?
- 14. If x satisfies the inequality, the logarithm of X with the base of half a bit is known. Find the maximum value of the function f (x) equal to the logarithm of X with the base of two
- 15. Let LG2 = A and Lg3 = B, then what is the logarithm of 3 with 2 as the base? Please use a and B to express the result
- 16. If LG2 = a, Lg3 = B, then Lg3 + log3 is the base √ 2 is the logarithm =?
- 17. A / b = (Lg3) ^ 2 / [2 * (LG2) ^ 2] = Lg3 & # 178 / / 2 * LG2 & # 178; the result should be the logarithm square of log2 as the base 3 / 2? Why not
- 18. What power of 1.1 equals 1000?
- 19. 2 to the power of 1000 is equal to
- 20. A = log 1 / 3 log 2 / 2 log B = log 1 / 2 log 3 log 4 / 3 log Then the size relation of a, B and C is