Prove that, if f(x) has a limit as x->a, then the limit is unique. In other...

Use the formal definition of limit (epsilon-delta definition) to prove that lim x--> 3 (x^2 +...

Use the formal definition of limit (epsilon-delta definition) to prove that lim x--> 3 (x^2 + 5x) = 24.

Let f be defined on the (0,infinity). Prove that the limit as x approaches infinity of...

Let f be defined on the (0,infinity). Prove that the limit as x approaches infinity of F(x) =L if and only if the limit as x approaches 0 from the right of f(1/x) = L. Does this hold if we replace L with either infinity or negative infinity?

prove the statement using the epsilon delta definition of a limit lim x-->2 (x^2-2x+7)=1

prove the statement using the epsilon delta definition of a limit lim x-->2 (x^2-2x+7)=1

Estimate the lim as f(x) approaches -infinity by graphing f(x)=sqrt{x^{2}+x+9}+x   (b) Use a table of values...

Estimate the lim as f(x) approaches -infinity by graphing f(x)=sqrt{x^{2}+x+9}+x   (b) Use a table of values of f(x) to guess the value of the limit. (Round your answer to one decimal place.) (c) Prove that your guess is correct by evaluating lim x→−∞ f(x).

Let f(x)=7x^2+7. Evaluate lim h→0 f(−1+h)−f(−1)/h (If the limit does not exist, enter "DNE".) Limit =

Let f(x)=7x^2+7. Evaluate lim h→0 f(−1+h)−f(−1)/h (If the limit does not exist, enter "DNE".) Limit =

The following statement is FALSE: If lim x!6 [f(x)g(x)] exists, then the limit must be f(6)g(6)....

The following statement is FALSE: If lim x!6 [f(x)g(x)] exists, then the limit must be f(6)g(6). Give an example of two functions f(x) and g(x) that demonstrate the falsity of this state- ment - that is, two functions f(x) and g(x) such that lim x!6 [f(x)g(x)] exists, but is not equal to f(6)g(6). Explain your answer.

f(x,y) = (x^4-y^2) / (x^4 + y^2). show the following limit does not exist, and explain...

f(x,y) = (x^4-y^2) / (x^4 + y^2). show the following limit does not exist, and explain why lim (x,y)->(0,0) f(x,y)

Suppose my utility function for asset position x is given by u(x)=ln x. I now have...

Suppose my utility function for asset position x is given by u(x)=ln x. I now have $10000 and am considering the following two lotteries: L1: With probability 1, I lose $2000. L2: With probability 0.8, I gain $0, and with probability 0.2, I lose $5000. What is expected utility of L1 and L2? Determine which lottery I prefer based on expected utility criterion. Select one: a. Expected utility of L1=9.072, Expected utility of L2=8.987, L1 is preferred. b. Expected utility...

Prove that lim x^2 = c^2 as x approaches c by appealing directly to the definition...

Prove that lim x^2 = c^2 as x approaches c by appealing directly to the definition of a limit.

a.) Find the following limit. lim x→−∞ x^3 - sqrt(4x^6-3x)/7x^3+x b.) Sketch the graph of a...

a.) Find the following limit. lim x→−∞ x^3 - sqrt(4x^6-3x)/7x^3+x b.) Sketch the graph of a function f(x) that has all of the following features: f ' (x) > 0 on the intervals (−∞, −4) ∪ (3,∞). f ' (x) < 0 on the intervals (−4, −1) ∪ (−1, 3). f '' (x) > 0 on the intervals (−∞, −4) ∪ (−4, −2) ∪ (−1, 4). f '' (x) < 0 on the intervals (−2, −1) ∪ (4,∞). x-intercepts when...