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Answer to Question #242131 in Calculus for udith
Question #242131
Show that β2π β«2π π₯ 2 sin8 (π π₯ )ππ₯| β€ 16π3 /3
Expert's answer
The function "f(x)=x^2\\sin^8(e^x)" is continuous on "[-2\\pi, 2\\pi]." Then
"0\\leq|sin^8(e^x)|\\leq1=>|x^2\\sin^8(e^x)|\\leq x^2, x\\in\\R"
Then
"\\displaystyle\\int_{-2\\pi}^{2\\pi}x^2dx=[\\dfrac{x^3}{3}]\\begin{matrix}\n 2\\pi \\\\\n -2\\pi\n\\end{matrix}=\\dfrac{16\\pi^3}{3}"
Therefore
"\\leq\\displaystyle\\int_{-2\\pi}^{2\\pi}x^2dx=\\dfrac{16\\pi^3}{3}"
Therefore
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