百度试题 结果1 题目Identify the interval(s) where the function is (1) increasing (2) decreasing (3)constant 相关知识点: 试题来源: 解析 (1)(-∞,-3) ∪ (-1,3) (2)(-3,-1) (3)(3,∞) 反馈 收藏
Name the interval(s) where the following functions are increasing, decreasing, or constant. Write answers using interval notation. Assume all endpoints have integer values. 相关知识点: 试题来源: 解析 : : constant: none 反馈 收藏
If a functiong is decreasing on the interval (−∞,a), increasing on the interval (a,∞), and g(a)=b, thenA:bis a minimum valueB:bis a maximum valueC:ais a maximum valueD:ais a minimum value 相关知识点: 试题来源: 解析 A None ...
Answer to: Find the interval on which f is increasing and decreasing. Superimpose the graphs of f and f' to verify your work. f(x)= -4+x^2 By...
Given f(x) = x^4 - 50x^2 + 9 , find the interval on which f is decreasing. f(x) = -(x - 1)^2 use f'(x) to find the decreasing interval. Find intervals where the function f(x) = x is increasing or decreasing. Find the interval on which f(x) = xe^{-x} is in...
Find the interval(s) where the following functions are increasing and decreasing. {eq}f(x)= \frac{x}{4} + \frac{4}{x} {/eq} Increasing and decreasing intervals Almost all function with one independent variable has increasing interval(s) and/or decreasi...
Increasing and Decreasing Interval of a Function:A function is said to be increasing on an interval if the slope of the function is greater than zero whereas the function is said to be decreasing on an interval if the slope of the function is...
Increasing time interval and decreasing allergen dose interval improves ex vivo desensitization of human blood basophilsallergybasophil granulocytesdesensitizationBackground: Desensitization is a method for inducing temporary tolerance to allergen. The mechanism underlying desensitization is yet to be established....
f{f(x)} is decreasing in [−π/2,0] and increasing in [0,π/2] B f{f(x)} s invertible in [−π/2,π/2] C f(x) is increasing in the interval [−π/2,π/2] D f{f(x)} is increasing in the interval [−π/2,π/2] ...
The interval in which the first derivative of the function is negative, the function is decreasing and increasing when first derivative of the function is positive. Answer and Explanation:1 Given {eq}f(x) = \dfrac{1}{x-5} {/eq}