Converse of Rolle’s Theorem:- Let f be continuous on [a, b] and differentiable on (a, b). If there exists c in (a, b) such that f '(c) = 0, does it follow that f (a) = f (b)? Explain

Q: Is f continuous at (0,0)? Is f continuous everywhere?

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Q: 18. Continuous extension Let sin (x – y) f(x, y) = { |x| + \y[| |x| + ]y] + 0 0, (x, y) = (0, 0). Is…

A: The given function is

Q: Discuss the continuity of the function. f(x, y, z)= sin(z) ex + ex continuous except at (0, 0, 0)…

A: Our Aim is to discuss the continuity of the function given below:-f(x,y,z)=sin (z)ex+ey -(i)

Q: 5. Prove that following theorem: Suppose that f is integrable on both [a, c] and [c, b]. Then f is…

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Q: r cos(y) + y(e² - 1) x + 0 f (x, y) = ry x = 0.

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Q: how that f(z) is differentiable and Evaluate f'(z) if f(2) = u(x,y) + iv(x, y), where %3D u(x, y) =…

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Q: 55 Prove that the functio: probability density F Given f(x)= 2(1-x) and (0<x< ضافة ملف

A: Solution

Q: 2) Let f be continuous on [a, b], differentiable on (a, b) and positive (i.e., > 0) for all x € (a,…

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Q: 5. Define f : (0, 1) → R by f(x) = x+1 Can one define f(0) to make f continuous Vx at 0? Explain.

A: Note: As per our guidelines we are supposed to answer only one question. Kindly repost other…

Q: The mean value c of Cauchy's theorem f 1 and g(x)= 1 in the inte f(x)=

A: Introduction: Cauchy's mean-value theorem is a broadening of the standard mean-value theorem. If…

Q: 2) Let f be continuous on [a, b], f' (c) exists c = (a, b) such that- f(c) differentiable on (a, b)…

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Q: Discuss the continuity of the function. sin(z) ex + ey f(x, y, z) = continuous except at (0, 0, 0)…

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Q: The integration of an odd integrable function f on a symmetric interval[-a, a] is always zero.…

A: Given the integration of odd function  f on a symmetric interval [-a ,a]

Q: 2. a) Let f be absolutely continuous on [a, b]. Will the function |f| be absolutely continuous on…

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Q: # Determine whether the function z = f(x, y) = { (why or why not) for for (x, y) = (0,0) (x, y) =…

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Q: Integrals of nonpositive functions Show that if f is integrable, then f(x) < 0 on [a, b] f(x) dr <…

A: Given that the function f is integrable and fx≤0 on a,b. Rule used: Max-Min inequality: If f has a…

Q: 1. Define the function [In(x + 1)] cosh x + tan x ,x > 0 (sinh x) sec-(x - 2) f(x) = , X < 0 a. Show…

A: Here, the given function is: f(x)=[ln(x+1)] cosh x+tan x, x≥0(sinh x)sec-1(x-2).       x&lt;0

Q: 3. Supposef is a bounded real-valued function on [ab] such that f is Riemann Integrable. Question:…

A: Riemann integration

Q: If f is a continuous function on a, b), there exists a number c between a and b such that | f (x) dæ…

A: If fx is a continuous function on the interval a, b, there exist a number c on the interval a, b…

Q: Suppose f and g are integrable functions on [a, b] and that for every interval [x, y] ⊂ [a, b] there…

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Q: Let f: [a, b]→R be a non-negative function and so that C ≤ f(x)for all x ∈ [a, b], where C ∈ R is a…

A: we have been given the mapping from f: [a,b]→R and is a non-negative function s.t C≤f(x) ∀x where  C…

Q: If fis integrable on [a, b], then a. f(x) dx = S-rx) dx c. - f(x) dx = S"f(x) dx b. F(x) dx = - ,…

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Q: (A) a continuous function f that is defined on the entire ry-plane and has no absolute extrema on…

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Q: 64. Continuous extension Define f(0, 0) in a way that extends x² - y? f(x, y) = xy x² + y? to be…

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Q: 3. Let f be integrable on [a, b] and let F(x) f f(t)dt (by Thcorem*, F is well-defined on la, b).…

A: So we have to prove 3.(a) and 3.(b) using Sub-interval Theorem

Q: All polynomials are Riemann Integrable on any interval [a, b]. All bounded functions on [a, b] are…

A: This is a question from Reimann Integration and Darboux Integration.

Q: Determine the set of points at which the function is continuous.Carefully show your work. ryt {(1.…

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Q: If fis differentiable at x = a, then fis continuous at x = a.

A: (As per bartleby guidelines, for more than one questions asked, only the first one is to be solved.…

Q: 2) Let f be continuous on [a, b], differentiable on (a, b) and positive (i.e., > 0) for all x E (a,…

A: Given that f be continuous on [a,b] , differentiable on (a,b) and positive . Here we have to prove…

Q: True or false If f is integrable over [a, c], then for any b ∈ [a, c], R b a f(x)dx + R c b f(x)dx…

A: Consider the provided question,

Q: Determine if g is continuous at x=0 and if g is differentiable at x = 0 if, let g(x) = {x2sin(1/x)…

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Q: If a fuction is continuous at a point, it must be differentiable at that point?  A. True  B. False

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Q: True or false? i) If f is continuous on [a, b], then f is uniformly continuous on (a, b).

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Q: Which of the following correctly states the First Fundamental Theorem of Calculus? (Read carefully,…

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Q: Determine the set of points at which the function is continuous. ху if (x, y) + (0, 0) f(x, y) = +…

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Q: Consider the function f: R → R defined by ƒ(x) = 1⁄2x³. a) b) By using definition, explain whether f…

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Q: All functions thet are continuous on (0,J are bounded" Is this statement true or false Explain ypur…

A: Given the function is continuous on ( 0, 1] For checking the function is bounded or not Let's…

Q: true or false with reason if f is continuous in[a,b] then integrationba x f(x)dx= x…

A: we know that if fx is continuous on a,b then ∫abxfxdx≠x∫abfxdx as x is variable

Q: Determine whether f(x) is continuous at x = 0, where Scosz, x >0 COsx, f(x) = -cosT, x < 0

A: Continuous at x=0. f0=cos0=1 limx→0-fx=limx→0--cosx=-1 limx→0+fx=limx→0+cosx=1

Q: Supoose that g is continuous on [0,3] and differentiable on (0,3). Assume also that g has five zeros…

A: Given:Suppose that g is continuous on [0,3] and differentiable on (0,3). Assume also that g has five…

Q: Let f(x,y) = x2y4sin(1/sqrt(x2+y4) ) when (x,y) =/ (0,0) and f(0,0) = 0 Determine if f is…

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Q: # Determine whether the function z = f(x, y) = (why or why not) for for (x, y) = (0,0) (x, y) =…

A: A graph for a function that's smooth without any holes, jumps, or asymptotes is called continuous.…

Q: The function f : (,,0) → R given by f(x) = it is not uniformly continuous on (;, 0). 1 is continuous…

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Q: If fæ and fy are continuous at (a, b), then f is continuous at (a, b). If f is continuous at (a, b),…

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Q: Exercise#5 uniformly continuous on I. Is the converse true? Justify. Prove that if the function f: I…

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Q: We know that Weierstrass's theorem is relative to continuous functions on compacts. This exercise…

A: Consider the given equation: Given P and Q are polynomials such that ∥P - Q∥R &lt;∞. The objective…

Q: 46. Bound on an integral Let f be a continuously differentiable function on [a, b] satisfying " f(x)…

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Q: Give an example of a bounded function f that is not Riemann integrable on [0,1]. Justify your…

A: However, once we recall that Riemann integrable functions must be bounded, an example of a…

Minimization

In mathematics, traditional optimization problems are typically expressed in terms of minimization. When we talk about minimizing or maximizing a function, we refer to the maximum and minimum possible values of that function. This can be expressed in terms of global or local range. The definition of minimization in the thesaurus is the process of reducing something to a small amount, value, or position. Minimization (noun) is an instance of belittling or disparagement.

Maxima and Minima

The extreme points of a function are the maximum and the minimum points of the function. A maximum is attained when the function takes the maximum value and a minimum is attained when the function takes the minimum value.

Derivatives

A derivative means a change. Geometrically it can be represented as a line with some steepness. Imagine climbing a mountain which is very steep and 500 meters high. Is it easier to climb? Definitely not! Suppose walking on the road for 500 meters. Which one would be easier? Walking on the road would be much easier than climbing a mountain.  

Concavity

In calculus, concavity is a descriptor of mathematics that tells about the shape of the graph. It is the parameter that helps to estimate the maximum and minimum value of any of the functions and the concave nature using the graphical method. We use the first derivative test and second derivative test to understand the concave behavior of the function.