Integral 7 6 cos ⁡ ( 5 t ) ln ⁡ ( sin ⁡ ( 5 t ) + 2 ) with respect to t.

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Integral       7    6        ﻿    cos  ⁡  (  5  t  )  ln  ⁡  (  sin  ⁡  (  5  t  )  +  2  ) with respect to t.

Kylan Simon · Accepted Answer

Simplify.∫7cos(5t)ln(sin(5t)+2)6dtSince&amp;nbsp;76&amp;nbsp;is constant with respect to&amp;nbsp;t, move&amp;nbsp;76&amp;nbsp;out of the integral.76∫cos(5t)ln(sin(5t)+2)dtIntegrate by parts using the formula&amp;nbsp;∫udv=uv-∫vdu, where&amp;nbsp;u=ln(sin(5t)+2)&amp;nbsp;and&amp;nbsp;dv=cos(5t).76(ln(sin(5t)+2)(15sin(5t))-∫15sin(5t)5cos(5t)2+sin(5t)dt)Simplify.76(ln(sin(5t)+2)sin(5t)5-∫sin(5t)cos(5t)2+sin(5t)dt)Let&amp;nbsp;u2=sin(5t). Then&amp;nbsp;du2=5cos(5t)dt, so&amp;nbsp;15du2=cos(5t)dt. Rewrite using&amp;nbsp;u2&amp;nbsp;and&amp;nbsp;du2.76(ln(sin(5t)+2)sin(5t)5-∫u22+u2⋅15du2)Simplify.76(ln(sin(5t)+2)sin(5t)5-∫u25(2+u2)du2)Since&amp;nbsp;15&amp;nbsp;is constant with respect to&amp;nbsp;u2, move&amp;nbsp;15&amp;nbsp;out of the integral.76(ln(sin(5t)+2)sin(5t)5-(15∫u22+u2du2))Reorder&amp;nbsp;2&amp;nbsp;and&amp;nbsp;u2.76(ln(sin(5t)+2)sin(5t)5-15∫u2u2+2du2)Divide&amp;nbsp;u2&amp;nbsp;by&amp;nbsp;u2+2.76(ln(sin(5t)+2)sin(5t)5-15∫1-2u2+2du2)Split the single integral into multiple integrals.76(ln(sin(5t)+2)sin(5t)5-15(∫du2+∫-2u2+2du2))Apply the constant rule.76(ln(sin(5t)+2)sin(5t)5-15(u2+C+∫-2u2+2du2))Since&amp;nbsp;-1&amp;nbsp;is constant with respect to&amp;nbsp;u2, move&amp;nbsp;-1&amp;nbsp;out of the integral.76(ln(sin(5t)+2)sin(5t)5-15(u2+C-∫2u2+2du2))Since&amp;nbsp;2&amp;nbsp;is constant with respect to&amp;nbsp;u2, move&amp;nbsp;2&amp;nbsp;out of the integral.76(ln(sin(5t)+2)sin(5t)5-15(u2+C-(2∫1u2+2du2)))Multiply&amp;nbsp;2&amp;nbsp;by&amp;nbsp;-1.76(ln(sin(5t)+2)sin(5t)5-15(u2+C-2∫1u2+2du2))Let&amp;nbsp;u3=u2+2. Then&amp;nbsp;du3=du2. Rewrite using&amp;nbsp;u3&amp;nbsp;and&amp;nbsp;du3.76(ln(sin(5t)+2)sin(5t)5-15(u2+C-2∫1u3du3))The integral of&amp;nbsp;1u3&amp;nbsp;with respect to&amp;nbsp;u3&amp;nbsp;is&amp;nbsp;ln(|u3|).76(ln(sin(5t)+2)sin(5t)5-15(u2+C-2(ln(|u3|)+C)))Simplify.76(ln(sin(5t)+2)sin(5t)5-u25+2ln(|u3|)5)+CSubstitute back in for each integration substitution variable.76(ln(sin(5t)+2)sin(5t)5-sin(5t)5+2ln(|sin(5t)+2|)5)+CSimplify.7(sin(5t)ln(sin(5t)+2)-sin(5t)+2ln(|sin(5t)+2|))30+CReorder terms.730(sin(5t)ln(sin(5t)+2)-sin(5t)+2ln(|sin(5t)+2|))+C

Integral 7 6  </mrow> cos ⁡<!-- ⁡ 5 t <mo stret

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