14. If a function is discontinuous at x = n then a) The function has an...

Plot f(x,y)=1 if 0<y<x^2; 0 otherwise. Prove that the function is discontinuous at the origin even...

Plot f(x,y)=1 if 0<y<x^2; 0 otherwise. Prove that the function is discontinuous at the origin even though its partial derivatives exist there.

When finding the limit of a function, the limit ________________ a specific value for the function....

When finding the limit of a function, the limit ________________ a specific value for the function. A. is greater than B. equals C. approaches D. is less than If the left hand limit and the right hand limit do not equal each other, the limit __________________. A. does not exist B. exists and is equal to 1 C.exists and is equal to 10 A. is zero

Given the function,     , state whether the graph of the function has been reflected across the...

Given the function,     , state whether the graph of the function has been reflected across the x-axis or y-axis by filling in the blanks. Determine if there is a reflection: Does a reflection exist in the function? Type yes or no: . Determine the axis for the reflection:  If there is no reflection type N/A and if there is more than one reflection type x,y axes. The graph has been reflected about the . Determine the value of the exponential function....

sketch a neat, piecewise function with the following instruction: 1. as x approach infinity, the limit...

sketch a neat, piecewise function with the following instruction: 1. as x approach infinity, the limit of the function approaches an integer other than zero. 2. as x approaches a positive integer, the limit of the function does not exist. 3. as x approaches a negative integer, the limit of the function exists. 4. Must include one horizontal asymtote and one vertical asymtote.

Let h(x)=(x2+2x-3)(x2+4x+4)-1 Select one: a. The function has a loc. max. at x=-3 and an inflection...

Let h(x)=(x2+2x-3)(x2+4x+4)-1 Select one: a. The function has a loc. max. at x=-3 and an inflection pt at x=-1 b. The function has a horizontal asymptote y=1 and a vertical asymptote x=-3. c. The function has a horizontal asymptote y=1 and a vertical asymptote x=-2. d. The function has an abs. min. at x=-1 and is concave up on (-∞, ∞). e. The function has an abs. min. at x=-1 and is concave down on (-∞, ∞)

2. Consider the following function. f(x) = x2 + 9     if x ≤ 1 5x2 −...

2. Consider the following function. f(x) = x2 + 9     if x ≤ 1 5x2 − 1     if x > 1 Find each value. (If an answer does not exist, enter DNE.) f(1)= lim x→1− f(x) = lim x→1+ f(x) = Determine whether the function is continuous or discontinuous at x = 1. Examine the three conditions in the definition of continuity. The function is continuous at x = 1.? or The function is discontinuous at x = 1. ?

1. For n exists in R, we define the function f by f(x)=x^n, x exists in...

1. For n exists in R, we define the function f by f(x)=x^n, x exists in (0,1), and f(x):=0 otherwise. For what value of n is f integrable? 2. For m exists in R, we define the function g by g(x)=x^m, x exists in (1,infinite), and g(x):=0 otherwise. For what value of m is g integrable?

In C programming language write a function that takes two arrays as input m and n...

In C programming language write a function that takes two arrays as input m and n as well as their sizes: size_m and size_n, respectively. Then it checks for each element in m, whether it exists in n. The function should update a third array c such that for each element in m: the corresponding position/index in c should be either 1, if this element exists in m, or 0, if the element does not exist in n

MY NOTES Determine the limit of the trigonometric function (if it exists). (If an answer does...

MY NOTES Determine the limit of the trigonometric function (if it exists). (If an answer does not exist, enter DNE.) lim x→1/2 4x2 tan πx

1. You are given the function f(x) = x/(1−x) a) Find the x and y- intercepts....

1. You are given the function f(x) = x/(1−x) a) Find the x and y- intercepts. b) Find the horizontal asymptote(s). c) Find the vertical asymptote(s) and do a limit analysis of the behavior of f on either side of each vertical asymptote. d) Find the critical number(s) of f. e) Find the interval(s) of increase and decrease of f. f) Find the relative maximum and minimum value(s) of f. g) Find the hypercritical number(s) of f. h) Find the...