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Mikrodalga ile pişirme, geleneksel pişirme yöntemlerinden hem daha hızlıdır hem de pişirme sürecinde yalnızca besin pişer, fırın ve ortam ısınmaz. [1] Mikrodalgalar, iyonize edici dalgalar değildir. Besin içinde ısıya dönüşür. Fırın kapandığında, fırında kaplarda ya da besin içinde bir radyasyon kalması vb. bir ...
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Restriction of a convex function to a line f : Rn → R is convex if and only if the function g : R → R, g(t) = f(x+tv), domg = {t | x+tv ∈ domf} is convex (in t) for any x ∈ domf, v ∈ Rn can check convexity of f by checking convexity of functions of one variable
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6.8.3 Apply the divergence theorem to an electrostatic field. We have examined several versions of the Fundamental Theorem of Calculus in higher dimensions that relate the integral around an oriented boundary of a domain to a "derivative" of that entity on the oriented domain. In this section, we state the divergence theorem, which is the ...
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Friends Central is a collaborative encyclopedia for everything related to NBC's Friends and its spin-off Joey. The wiki format allows anyone to create or edit articles, so we can all work together to create a comprehensive database for fans. We are currently editing 1,568 articles since March 15th, 2006 and you can help!
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Here we get that, no two elements of the domain has the same image and no element of co-domain is the image of more than one element in the domain. ∴ f is one-one. Function f:X→Y is onto if, for any y∈Y there exist x∈X such that f(x)=y. Let's prove that f(x)=x 2 is not onto. Let's take an example y=3∈N.
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I N T R O D U C T I O N T O C O M P U T E R I N F O R M A T I O N S Y S T E M S| S T E I N B E R G G E O F F R E Y, From My Mother: Surviving And Thriving In A Family Ravaged By Genetic Disease|Darcy Leech, The Treasure Trove Series: Travesty By R.H. Stoddard (Hardcover) 1875|William M. Thackery, The King Is Dead (A Samantha Adams …
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Limits and continuity for f : Rn → R (Sect. 14.2) I The limit of functions f : Rn → R. I Example: Computing a limit by the definition. I Properties of limits of functions. I Examples: Computing limits of simple functions. I Continuous functions f : Rn → R. I Computing limits of non-continuous functions: I Two-path test for the non-existence of limits. I The sandwich …
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17/38 Epigraph and sublevel set -sublevel set of f : Rn!R: C = fx 2dom fjf(x) g sublevel sets of convex functions are convex (converse is false) epigraph of f : Rn!R: epi f = f(x;t) 2Rn+1jx 2dom f;f(x) tg f is convex if and only if epi f is a convex set Epigraph and sublevel set
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A body of mass m is moving in a circle of radius r with a constant speed v. The force on the body is m v 2 r and is directed towards the centre. What is the work done by this force in moving the body over half the circumference of the circle
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