calculus

posted by .

If f has domain [0, infinity) and has no horizontal asymptotes, then lim_(x->infinity) f(x) = infinity or lim_(x->infinity) f(x) = -infinity.

Can someone please clarify whether this statement is true or false?

Thank you

  • calculus -

    Examine whether f(x)=sin(x) satisfies the requirements for f(x), and decide if the statement is true or false.

Respond to this Question

First Name
School Subject
Your Answer

Similar Questions

  1. Algebra

    Given f(x)=rootsignx-2 and g(x) = x-7 what is the domain of the quotient function?
  2. Algebra

    Given f(x)=rootsignx-2 and g(x) = x-7 what is the domain of the quotient function?
  3. Algebra

    Given f(x)=rootsignx-2 and g(x) = x-7 what is the domain of the quotient function?
  4. Algebra

    f(x)=root sign, and inside that x-2 and g(x)x-7. Which of the following is the domain of the quotient function?
  5. Math

    f(x)=root sign, and inside that x-2 and g(x)x-7. Which of the following is the domain of the quotient function?
  6. Algebra

    I know what the answer is just not how to exopress it. Can someone help me please?
  7. Algebra

    I know what the answer is just not how to exopress it. Can someone help me please?
  8. Calculus

    Find the horizontal asymptote of f(x)=e^x - x lim x->infinity (e^x)-x= infinity when it's going towards infinity, shouldn't it equal to negative infinity, since 0-infinity = - infinity lim x-> -infinity (e^x)-x= infinity
  9. MATH

    I have been trying to do this problem for a couple of days but i cant seem to get the answer. Any help would be greatly appreciated. For each of the following forms determine whether the following limit type is indeterminate, always …
  10. Calculus

    Sketch the graph of the function that has the following properties. f is continuous on (-infinity, infinity). points: (-1,2), (0, 0), (-1,0) f'(x)>0 at (-infinity, -1) f'(-1)=0 f'(x)<0 at (-1, 1) f'(1)=0 f'(x)>0 on (1, infinity) …

More Similar Questions