5.3 The Fundamental Theorem of Calculus/15: Difference between revisions

Use part 1 of the FTC to find the derivative of the function: ${\displaystyle y=\int _{0}^{tan(x)}{\sqrt {t+{\sqrt {t}}}}\,dt}$

FTC 1: ${\displaystyle {\frac {d}{dx}}\int _{a(x)}^{b(x)}f(t)\,dt=b^{\prime }{(x)}\cdot \,f(b(x))-\,a^{\prime }{(x)}\cdot \,f(a(x))}$

${\displaystyle {\begin{aligned}{\frac {d}{dx}}=\int _{0}^{tan(x)}{\sqrt {t+{\sqrt {t}}}}\,dt\\&=\sec ^{2}(x)\cdot {\sqrt {tan(x)+{\sqrt {t}}an(x)}})-0\cdot {\sqrt {0+{\sqrt {0}}}}\\&=\sec ^{2}(x)\cdot {\sqrt {tan(x)+{\sqrt {t}}an(x)}})\\\end{aligned}}}$

In this problem ${\displaystyle a^{\prime }{(x)}=0}$, so when it is multiplied by ${\displaystyle f(a(x))}$ it will result in 0 and doesn't need to be added.