解析 Exponential functions have a horizontalasymptote. The equation of the horizontalasymptote is ( y=0). HorizontalAsymptote: ( y=0)结果一 题目 Find the Asymptotes (e^x)/(1-e^x) 答案 Exponential functions have a horizo
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 . (b) Find the value of p. (c) Write down the equation of the horizontal asymptote of the graph of f. 相关知识点: 试题来源: 解析 q=3p=7y=7 ...
To find the horizontal asymptote, you need to see what happens when x gets must larger (to oo) or much (to -oo). With the numerator and denominator expanded, f(x)=(2x^(2)+5x-3)/(x^(2)+6x+9). Divide both by x^(2) to see that y approaches 2 as x gets much
Section:Chapter Questions format_list_bulleted Problem1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,... See similar textbooks Related questions Question State the equation of the horizontal asymptote. ...
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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 ...
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...
Find the equation of horizontal asymptote: f(x) = 3 + 5x / x^2 + x + 3. Determine, if any, the equation of the horizontal asymptote of the following function: f(x) = \dfrac{3x^5 - 20x^3}{32}. How do you find the y-intercept of a horizontal asymptote?
Before we can find the vertical asymptotes of this function, if any exist, we need to determine this function's domain. This is the set of all numbers... Learn more about this topic: Vertical Asymptote | Equation, Formula & Rules
相关知识点: 试题来源: 解析 水平渐近线是 y = 2。 该函数的分子和分母最高次项都是 x^2,且系数分别为 2 和 1。当 x 趋向于无穷大时,函数的值将趋向于分子和分母最高次项系数的比值,即 2/1。因此,水平渐近线为 y = 2。反馈 收藏