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Definitions: FSc Part 2 (Mathematics): PTB

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===== Unit 01 (Functions and Limits) ===== * **Function:** A function is a rule or correspondence, relating to two sets in such a way that each element in the firs... e and only one element in the second set. Or \\ A function from //X// to //Y// is a rule that assigns to eac... // in //Y//. \\ e.g. $A=x^2$, that is, //A// is a function of //x//. * **Domain:** In a function $f:X\to

Unit 01: Functions and Limits @fsc-part2-ptb:important-questions

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2016), BSIC Rawalpendi(2017)// * Determine the function $f(x)=x^3+x$ as an even or odd function.--- // BSIC Rawalpendi(2017)// * Evaluate $\lim\limits_{\theta \t... --- // BSIC Sargodha(2016)// * Determined the function is even or odd if $f(x)=x^3+x$.--- // BSIC Sargodha(2016)// * Define continuity of function at a point. --- // BSIC Sargodha(2016)// * $f(x

Unit 02: Differentiation @fsc-part2-ptb:important-questions

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nwala (2015)// * Find the extreme values of the function $f(x)=\sin x +\cos x$ occurring in the intial $[0... i}{2},\frac{\pi}{2})$ is increasing or decreasing function.--- // BSIC Rawalpandi (2017)// * If $x=\sin \t... dha(2016)// * Defined increasing and decreasing function. --- // BSIC Sargodha(2016)// * Prove that $y \... BSIC Sargodha(2017)// * What is the decreasing function. --- // BSIC Sargodha(2017)// * Find $\frac{dy}

Unit 05: Linear Inequalities and Linear Programming @fsc-part2-ptb:important-questions

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FBSIC (2016)// * Find the area bounded $\cos x$ function from $x=-\frac{\pi}{2}$ to $x=\frac{\pi}{2}$.---