Find the integral: ∫ ( 5 t 3 2 + 3 t 3 − sin ⁡ ( t ) 2 − 2 cos ⁡ ( 2 t ) + 2 ) d t.

Question

Find the integral:   ∫  (            5              t                  3                      2    +      3          t              3              −            sin      ⁡      (      t      )        2    −  2  cos  ⁡  (  2  t  )  +  2  )  d  t.

Oswaldo Rosales · Accepted Answer

Remove parentheses.∫5t32+3t3-sin(t)2-2cos(2t)+2dtSplit the single integral into multiple integrals.∫5t32dt+∫3t3dt+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtSince&amp;nbsp;52&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;52&amp;nbsp;out of the integral.52∫t3dt+∫3t3dt+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtBy the Power Rule, the integral of&amp;nbsp;t3&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;14t4.52(14t4+C)+∫3t3dt+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtSince&amp;nbsp;3&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;3&amp;nbsp;out of the integral.52(14t4+C)+3∫1t3dt+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtApply basic rules of exponents.52(14t4+C)+3∫t-3dt+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtBy the Power Rule, the integral of&amp;nbsp;t-3&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;-12t-2.52(14t4+C)+3(-12t-2+C)+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtSimplify.52(14t4+C)+3(-12t2+C)+∫-sin(t)2dt+∫-2cos(2t)dt+∫2dtSince&amp;nbsp;-1&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;-1&amp;nbsp;out of the integral.52(14t4+C)+3(-12t2+C)-∫sin(t)2dt+∫-2cos(2t)dt+∫2dtSince&amp;nbsp;12&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;12&amp;nbsp;out of the integral.52(14t4+C)+3(-12t2+C)-(12∫sin(t)dt)+∫-2cos(2t)dt+∫2dtThe integral of&amp;nbsp;sin(t)&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;-cos(t).52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)+∫-2cos(2t)dt+∫2dtSince&amp;nbsp;-2&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;-2&amp;nbsp;out of the integral.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-2∫cos(2t)dt+∫2dtLet&amp;nbsp;u=2t. Then&amp;nbsp;du=2dt, so&amp;nbsp;12du=dt. Rewrite using&amp;nbsp;u&amp;nbsp;and&amp;nbsp;du.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-2∫cos(u)12du+∫2dtCombine&amp;nbsp;cos(u)&amp;nbsp;and&amp;nbsp;12.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-2∫cos(u)2du+∫2dtSince&amp;nbsp;12&amp;nbsp;is constant with respect to&amp;nbsp;u, move&amp;nbsp;12&amp;nbsp;out of the integral.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-2(12∫cos(u)du)+∫2dtSimplify.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-∫cos(u)du+∫2dtThe integral of&amp;nbsp;cos(u)&amp;nbsp;with respect to&amp;nbsp;u&amp;nbsp;is&amp;nbsp;sin(u).52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-(sin(u)+C)+∫2dtApply the constant rule.52(14t4+C)+3(-12t2+C)-12(-cos(t)+C)-(sin(u)+C)+2t+CSimplify.5t48-32t2+cos(t)2-sin(u)+2t+CReplace all occurrences of&amp;nbsp;u&amp;nbsp;with&amp;nbsp;2t.5t48-32t2+cos(t)2-sin(2t)+2t+CReorder terms.58t4-32t2+12cos(t)-sin(2t)+2t+C

Find the integral: <mrow> 5 t 3 </mrow

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