Post a New Question

Calculus

posted by .

Evaluate the following limit. lim e^(tanx) as x approaches the righter limit of (pi/2)

  • Calculus -

    tanx -> -infinity as x->pi/2+
    so, e^tanx -> 0

Respond to this Question

First Name
School Subject
Your Answer

Similar Questions

  1. Calculus

    Could someone please help me with these questions;I was having trouble with these four questions. Evaluate each limit, if it exists, using any appropriate technique. 1.) The limit as u approaches 4; u^2-16/u^3-64 2.) The limit as x …
  2. calculus

    evaluate each limit, if it exists Lim as x approaches -2 (x^4 - 16) / (x+2)
  3. calculus

    evaluate the limit Lim as x approaches 3 (1r3 - 1rx ) / (x - 3)
  4. calculus verify answer

    Evaluate the limit: Limit as x approaches 6 from the right: Sq.root of (x - 6). I know the limit is 0, but how do I show this?
  5. Calculus

    Find the limit lim as x approaches (pi/2) e^(tanx) I have the answer to be zero: t = tanx lim as t approaches negative infi e^t = 0 Why is tan (pi/2) approaching negative infinity is my question?
  6. AP Calculus

    if i define the function f(x)= x^3-x^2-3x-1 and h(x) = f(x)/g(x), then evaluate the limit (3h(x)+f(x)-2g(x), assuming you know the following things about h(x): h is continuous everywhere except when x = -1 lim as x approaches infinity …
  7. calculus

    if i define the function f(x)= x^3-x^2-3x-1 and h(x) = f(x)/g(x), then evaluate the limit (3h(x)+f(x)-2g(x), assuming you know the following things about h(x): h is continuous everywhere except when x = -1 lim as x approaches infinity …
  8. Calculus. Limits. Check my answers, please! :)

    4. lim (tanx)= x->pi/3 -(sqrt3) 1 (sqrt3) ***-1 The limit does not exist. 5. lim |x|= x->-2 -2 ***2 0 -1 The limit does not exist. 6. lim [[x]]= x->9/2 (Remember that [[x]] represents the greatest integer function of x.) 4 …
  9. Calculus

    Evaluate the limit. as x approaches infinity, lim sqrt(x^2+6x+3)-x
  10. Calculus

    Let f be a function defined for all real numbers. Which of the following statements must be true about f?

More Similar Questions

Post a New Question