百度试题 结果1 题目Find the Asymptotes f(x)=ae^(-2x)( f(x)=ae^(-2x)) 相关知识点: 试题来源: 解析 Exponential functions have a horizontalasymptote. The equation of the horizontalasymptote is ( y=0). HorizontalAsymptote: ( y=0)反馈 收藏 ...
Asymptote Algebra Examples y 7 ex Exponential functionshave ahorizontalasymptote. Theequationof thehorizontalasymptoteisy=7y=7. HorizontalAsymptote:y=7y=7 y=7−exy=7-ex ( ) | [ ] √ ≥ 7 8 9 ...
百度试题 结果1 题目Write the equation of the horizontal asymptote for function.y=(23)^(x-1) 相关知识点: 试题来源: 解析 y=0 反馈 收藏
Precalculus Examples y=(12)xy=(12)x Exponential functionshave ahorizontalasymptote. Theequationof thehorizontalasymptoteisy=0y=0. HorizontalAsymptote:y=0y=0 Enter a problem...
Let f(x)=p+ 9(x-q), for x≠ q. The line x=3 is a vertical asymptote to the graph of f.(a) Write down the value of q. The graph of f has a y-intercept at (0,4). (b) Find the value of p. (c) Write down the equation of the horizontal asymptote of the graph of ...
What is the asymptote of the curve (x + 1)/x? What is the horizontal asymptote of \dfrac{x^3}{x^2 + 3x - 10}? What is the horizontal asymptote of f(x) = (-2x)/(x + 1)? What is the equation of the vertical asymptote of h(x) = 6log_4(x - 3) - 5?
If y=a is a horizontal asymptote of the function y=f(x), then EITHER limlimits _(x→ ∞ )f(x)=a OR limlimits _(x→ -∞ )f(x)=a. Because either of these is sufficient for a horizontal asymptote at y=a, (A) might be true, but does not have to be true. (B) is one ...
B.There is no vertical asymptote. (c)What is the equation of the horizontal or oblique asymptote ofR(x)?Select the correct choice below and fill in any answer boxes within your choice. A.y=◻(Simplify your answer.)
Give the equation of the horizontal asymptote of the following function. If the function has no horizontal asymptote, write "No Asymptote." y = \frac{3(x - 1)^2(x - 2)^3}{x^4(2x - 3)} Give the equation of the horizontal asymptote of the following function. If the function has ...
Because the graph will be nearly equal to this slanted straight-line equivalent, the asymptote for this sort of rational function is called a slant (or "oblique") asymptote. The equation for the slant asymptote is the polynomial part of the rational that you get after doing the long division...