It is proved that limx approaches 0, the power of X + a of e minus the power of a of e divided by the power of a of x = E
RELATED INFORMATIONS
- 1. How does the SiNx power e of limx approaching 0 x come out I know the zero power of the answer e, but e doesn't know how to get it out
- 2. The limit of (LN Tan 7x) / (LN Tan 2x) when x approaches 0 Why not directly (1 / tan7x) / (1 / tan2x) = tan2x / tan7x = 2 / 7?
- 3. The limit of [sin (SiNx)] / x, X → 0
- 4. The limit of limln (sin3x) / ln (SiNx) when x tends to 0 +
- 5. Ln (1 + 2x) divided by sin3x, X tends to 0, evaluated
- 6. Y = (x + 1) * ln (x + 1) / x, when x infinitely approaches 0, what is the limit of Y? The answer is 1. I want to deduce the process
- 7. (e ^ x ^ 2 + 2cosx-3) / x ^ 4 x tends to 0, and the limit is 7 / 12
- 8. Find the solution set of (x + 2) > = 0 under the root sign of inequality (x-1) * and seek the help of God
- 9. Find LIM (n → + ∞) (1 + n) [ln (1 + n) - ln n]
- 10. What is the second power of X divided by the second power of X?
- 11. Finding the limit: x ^ - 1-e of LIM (x-0) (1 + x) divided by X
- 12. Ln (1 + 2x ^ 2) / ln (1 + 3x ^ 3) Lim tends to be positive infinity. The limit of Ln (1 + 2x ^ 2) / ln (1 + 3x ^ 3) Lim is obtained by using the law of lobita
- 13. Can the spring force change suddenly?
- 14. How to explain the problem that spring force can't change suddenly
- 15. The Weierstrass theorem (1) draw diagram of cases in which a feasible set (budget set) is not closed or not bunded,but a solution to the optimization problem exists. (in the case of drawing a graph, one of the feasible sets (budget set) is not closed or bunded, but there is a solution to the optimization problem.) (2)show f(x)=1,g(x)=x are continuous functions. It is shown that f (x) = 1, G (x) = x are continuous functions (3)Does the following function has a maximum on the inverval [-1,1]?If not,explan why. Does the following function have a maximum interval [- 1,1]? If not, please explain the reason f(x)= 1/x,x=/=0; 0,x=0.
- 16. What is the intermediate value principle of continuous function?
- 17. What function is f (x) = sgnx? What is the image like?
- 18. Find the left and right limit of function f (x) = [x] at x = 0
- 19. Functions are bounded, unbounded, convergent, divergent, with and without limits. What are the relations between these relations?
- 20. X tends to 0, the limit of sin1 / x ^ 2-1 / sin2x (not SiNx ^ 2, sin2x)