Let f be a continuous odd function on straight real numbers. If integral subscript negative 5...

Estimate the minimum number of subintervals needed to approximate the integral integral subscript 0 superscript 4...

Estimate the minimum number of subintervals needed to approximate the integral integral subscript 0 superscript 4 open parentheses 7 x squared minus 4 x close parentheses d x with an error of magnitude less than 10-4 using Simpson's Rule. Error Estimates in the Simpson's Rule: If f(4) is continuous and M is any upper bound for the values of |f(4)| on [a, b], then the error ES in the Simpson's Rule approximation of the integral of f from a to...

Let f(x) be a function that is continuous for all real numbers and assume all the...

Let f(x) be a function that is continuous for all real numbers and assume all the intercepts of f, f' , and f” are given below. Use the information to a) summarize any and all asymptotes, critical numbers, local mins/maxs, PIPs, and inflection points, b) then graph y = f(x) labeling all the pertinent features from part a. f(0) = 1, f(2) = 0, f(4) = 1 f ' (2) = 0, f' (x) < 0 on (−∞, 2), and...

Which of the following statements is/are CORRECT? A. If random variables X and Y are independent,...

Which of the following statements is/are CORRECT? A. If random variables X and Y are independent, then f subscript Y vertical line x end subscript left parenthesis y right parenthesis equals f subscript Y left parenthesis y right parenthesis must hold. B. Given a legitimate f subscript X vertical line y end subscript left parenthesis x right parenthesis , integral subscript negative infinity end subscript superscript plus infinity end superscript f subscript X vertical line y end subscript left parenthesis...

Let B = { f: ℝ  → ℝ | f is continuous } be the ring of...

Let B = { f: ℝ  → ℝ | f is continuous } be the ring of all continuous functions from the real numbers to the real numbers. Let a be any real number and define the following function: Φa:B→R f(x)↦f(a) It is called the evaluation homomorphism. (a) Prove that the evaluation homomorphism is a ring homomorphism (b) Describe the image of the evaluation homomorphism. (c) Describe the kernel of the evaluation homomorphism. (d) What does the First Isomorphism Theorem for...

let F : R to R be a continuous function a) prove that the set {x...

let F : R to R be a continuous function a) prove that the set {x in R:, f(x)>4} is open b) prove the set {f(x), 1<x<=5} is connected c) give an example of a function F that {x in r, f(x)>4} is disconnected

Let f(x) be a continuous, everywhere differentiable function. What kind information does f'(x) provide regarding f(x)?...

Let f(x) be a continuous, everywhere differentiable function. What kind information does f'(x) provide regarding f(x)? Let f(x) be a continuous, everywhere differentiable function. What kind information does f''(x) provide regarding f(x)? Let f(x) be a continuous, everywhere differentiable function. What kind information does f''(x) provide regarding f'(x)? Let h(x) be a continuous function such that h(a) = m and h'(a) = 0. Is there enough evidence to conclude the point (a, m) must be a maximum or a minimum?...

6. Let ?(?) be a continuous function defined for all real numbers, with?'(?)=(?−1)2(?−3)3(?−2) and ?''(?) =...

6. Let ?(?) be a continuous function defined for all real numbers, with?'(?)=(?−1)2(?−3)3(?−2) and ?''(?) = (? − 1)(3? − 7)(2? − 3)(? − 3)2. On what intervals is ? increasing and decreasing? Increasing on: Decreasing on: Find the x-coordinate(s) of all local minima and maxima of ?. Local min at x=__________________ Local max at x=_________________ c. On what intervals if ? concave up and concave down? Concave up on: Concave down on: d. Find the x-coordinate(s) of points of...

Let D={ (x,y) : x2+y2 ≤ 4x+5 and y≥ 0 } . Express the double integral...

Let D={ (x,y) : x2+y2 ≤ 4x+5 and y≥ 0 } . Express the double integral I = f(x, y) dA D as an iterated integral. I = f(x, y) dx dy=?

Let f be a continuous function. Suppose theres a sequence (x_n) in [0,1] where lim f(x_n))=5....

Let f be a continuous function. Suppose theres a sequence (x_n) in [0,1] where lim f(x_n))=5. Prove there is a point x in [0,1] where f(x)=5.

Let X and Y be continuous random variables with joint density function f(x,y) and marginal density...

Let X and Y be continuous random variables with joint density function f(x,y) and marginal density functions fX(x) and fY(y) respectively. Further, the support for both of these marginal density functions is the interval (0,1). Which of the following statements is always true? (Note there may be more than one)    E[X^2Y^3]=(∫0 TO 1 x^2 dx)(∫0 TO 1 y^3dy)    E[X^2Y^3]=∫0 TO 1∫0 TO 1x^2y^3 f(x,y) dy dx    E[Y^3]=∫0 TO 1 y^3 fX(x) dx   E[XY]=(∫0 TO 1 x fX(x)...