![SOLVED: Let u be the solution to the initial boundary value problem for the Heat Equation, d,ult,x) = 2dkult,x), t e(0,m), x €(0,3); with initial condition u(0,x) = f(x), where f(0) = SOLVED: Let u be the solution to the initial boundary value problem for the Heat Equation, d,ult,x) = 2dkult,x), t e(0,m), x €(0,3); with initial condition u(0,x) = f(x), where f(0) =](https://cdn.numerade.com/ask_images/7eab8e26980e48439d562441ec97a5ac.jpg)
SOLVED: Let u be the solution to the initial boundary value problem for the Heat Equation, d,ult,x) = 2dkult,x), t e(0,m), x €(0,3); with initial condition u(0,x) = f(x), where f(0) =
![The value of $\\int\\limits_\\pi ^{2\\pi } {[2\\sin x]dx} $ is equal to (where[.] is the G.I.F.)A. $ - \\pi $B. $ - 2\\pi $C. $ - \\dfrac{{5\\pi }}{3}$D. $\\dfrac{{5\\pi }}{3}$ The value of $\\int\\limits_\\pi ^{2\\pi } {[2\\sin x]dx} $ is equal to (where[.] is the G.I.F.)A. $ - \\pi $B. $ - 2\\pi $C. $ - \\dfrac{{5\\pi }}{3}$D. $\\dfrac{{5\\pi }}{3}$](https://www.vedantu.com/question-sets/81a6a607-6f3b-42d1-bdc3-6feedb76da524897162654211039244.png)
The value of $\\int\\limits_\\pi ^{2\\pi } {[2\\sin x]dx} $ is equal to (where[.] is the G.I.F.)A. $ - \\pi $B. $ - 2\\pi $C. $ - \\dfrac{{5\\pi }}{3}$D. $\\dfrac{{5\\pi }}{3}$
![tikz pgf - How to smooth the graph $\chi(t)=\sen(\pi t)\exp \left(\dfrac{-1}{\sen^2(\pi t)}\right)$ - TeX - LaTeX Stack Exchange tikz pgf - How to smooth the graph $\chi(t)=\sen(\pi t)\exp \left(\dfrac{-1}{\sen^2(\pi t)}\right)$ - TeX - LaTeX Stack Exchange](https://i.stack.imgur.com/eFhst.jpg)
tikz pgf - How to smooth the graph $\chi(t)=\sen(\pi t)\exp \left(\dfrac{-1}{\sen^2(\pi t)}\right)$ - TeX - LaTeX Stack Exchange
![If : f(x) `{:(=x.sin x ", ... " 0 lt x le pi/2),(=pi/2 sin (pi+x)", ... "pi/2ltxltpi):}` , then - YouTube If : f(x) `{:(=x.sin x ", ... " 0 lt x le pi/2),(=pi/2 sin (pi+x)", ... "pi/2ltxltpi):}` , then - YouTube](https://i.ytimg.com/vi/FLRyUQdEhI8/maxresdefault.jpg)