Find the integral: ∫ ( − 1 2 t 2 + 5 2 t + 3 2 sin ⁡ ( 2 t ) − 3 cos ⁡ ( t ) 2 + 1 ) d t.

Question

Find the integral:   ∫  (  −      1          2              t                  2                      +      5          2      t        +      3    2    sin  ⁡  (  2  t  )  −            3      cos      ⁡      (      t      )        2    +  1  )  d  t.

Gallichi5mtwt · Accepted Answer

Remove parentheses.∫-12t2+52t+32⋅sin(2t)-3cos(t)2+1dtSplit the single integral into multiple integrals.∫-12t2dt+∫52tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtSince&amp;nbsp;-1&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;-1&amp;nbsp;out of the integral.-∫12t2dt+∫52tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtSince&amp;nbsp;12&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;12&amp;nbsp;out of the integral.-(12∫1t2dt)+∫52tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtApply basic rules of exponents.-12∫t-2dt+∫52tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtBy the Power Rule, the integral of&amp;nbsp;t-2&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;-t-1.-12(-t-1+C)+∫52tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtSince&amp;nbsp;52&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;52&amp;nbsp;out of the integral.-12(-t-1+C)+52∫1tdt+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtThe integral of&amp;nbsp;1t&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;ln(|t|).-12(-t-1+C)+52(ln(|t|)+C)+∫32⋅sin(2t)dt+∫-3cos(t)2dt+∫dtSince&amp;nbsp;32&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;32&amp;nbsp;out of the integral.-12(-t-1+C)+52(ln(|t|)+C)+32∫sin(2t)dt+∫-3cos(t)2dt+∫dtLet&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.-12(-t-1+C)+52(ln(|t|)+C)+32∫sin(u)12du+∫-3cos(t)2dt+∫dtCombine&amp;nbsp;sin(u)&amp;nbsp;and&amp;nbsp;12.-12(-t-1+C)+52(ln(|t|)+C)+32∫sin(u)2du+∫-3cos(t)2dt+∫dtSince&amp;nbsp;12&amp;nbsp;is constant with respect to&amp;nbsp;u, move&amp;nbsp;12&amp;nbsp;out of the integral.-12(-t-1+C)+52(ln(|t|)+C)+32(12∫sin(u)du)+∫-3cos(t)2dt+∫dtSimplify.-12(-t-1+C)+52(ln(|t|)+C)+34∫sin(u)du+∫-3cos(t)2dt+∫dtThe integral of&amp;nbsp;sin(u)&amp;nbsp;with respect to&amp;nbsp;u&amp;nbsp;is&amp;nbsp;-cos(u).-12(-t-1+C)+52(ln(|t|)+C)+34(-cos(u)+C)+∫-3cos(t)2dt+∫dtSince&amp;nbsp;-1&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;-1&amp;nbsp;out of the integral.-12(-t-1+C)+52(ln(|t|)+C)+34(-cos(u)+C)-∫3cos(t)2dt+∫dtSince&amp;nbsp;32&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;32&amp;nbsp;out of the integral.-12(-t-1+C)+52(ln(|t|)+C)+34(-cos(u)+C)-(32∫cos(t)dt)+∫dtThe integral of&amp;nbsp;cos(t)&amp;nbsp;with respect to&amp;nbsp;t&amp;nbsp;is&amp;nbsp;sin(t).-12(-t-1+C)+52(ln(|t|)+C)+34(-cos(u)+C)-32(sin(t)+C)+∫dtApply the constant rule.-12(-t-1+C)+52(ln(|t|)+C)+34(-cos(u)+C)-32(sin(t)+C)+t+CSimplify.12t+5ln(|t|)2-3cos(u)4-3sin(t)2+t+CReplace all occurrences of&amp;nbsp;u&amp;nbsp;with&amp;nbsp;2t.12t+5ln(|t|)2-3cos(2t)4-3sin(t)2+t+CReorder terms.12t+52ln(|t|)-34cos(2t)-32sin(t)+t+C

Find the integral: − 1 <mrow> 2 t 2

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