Connaissances:

• Changement de variable
• Trigonométrie
• Trigonométrie notation anglosaxonne

\(\begin{align*} I & = \int \frac{\sqrt{tanx}}{sin(2x)}dx  \end{align*}\)

Posons le changement de variable:
\(\begin{align*} & \begin{cases} u = \sqrt{tanx} \Rightarrow tan x = u² \\
sec²x.dx =2u.du \Rightarrow dx = \frac{2u.du}{sec²x} \end{cases} \\
I & = \int   \frac{u}{sin(2x)}\frac{2u.du}{sec²x} \\ 
& = \int   \frac{u}{\cancel{2}sinx.\cancel{cosx}} \times cos^{\cancel{2}}x.\cancel{2}u.du \\ 
& = \int \frac{u²cosx}{sinx}du \\
& = \int \frac{u²}{tanx}du \\
& = \int \frac{u²}{u²}du = \int du \\
& = u + C = \sqrt{tanx}+C
 \end{align*}\)

\[\boxed {\begin{align*} I & = \sqrt{tanx}+C(\in \mathbb R) \end{align*}}\]

Connaissances:

• Changement de variable
• Astuce du -1/+1
• Décomposition en éléments simples

\(\begin{align*} I & = \int \sqrt{1+e^x}dx  \end{align*}\)

Posons le changement de variable:
\(\begin{align*} & \begin{cases} u = \sqrt{1+e^x} \Rightarrow e^x = u²-1 \\
e^x dx =2u.du \Rightarrow dx = \frac{2u.du}{e^x} = \frac{2u}{u²-1}du \end{cases} \\
I & = \int u \times \frac{2u}{u²-1}du\\ 
& = 2 \int \frac{u²}{u²-1}du =2 \int \frac{u²-1+1}{u²-1}du\\
& = 2 \int du + 2\int\frac{1}{u²-1}du = \\
& = 2 \int du + 2\int\frac{1}{(u-1)(u+1)}du  \\ \end{align*}\)

Décomposition en éléments simples:
\(\begin{align*} & \frac{1}{(u-1)(u+1)} = \frac{a}{u-1} + \frac{b}{u+1} \\ \\
& \begin{cases} \times (u-1) \text{ et }u=1 & \Rightarrow & a=1/2 \\ 
\times (u+1) \text{ et }u=-1 & \Rightarrow & b=-1/2
\end{cases} \\ \\
I & = 2 \int du + 2\int\frac{1}{(u-1)(u+1)}du \\
& = 2 \int du + \cancel{2}\int\frac{1/\cancel{2}}{(u-1)}du -\cancel{2} \int \frac{1/\cancel{2}}{u+1}du \\
& = 2u+ln(u-1) - ln(u+1) +C \\
& = 2\sqrt{1+e^x}+ln(\sqrt{1+e^x}-1) - ln(\sqrt{1+e^x}+1) +C \\
 & = 2\sqrt{1+e^x}+ln \bigg(\frac{\sqrt{1+e^x}-1}{\sqrt{1+e^x}+1}\bigg)+C \end{align*}\)

\[\boxed {\begin{align*} I & = 2\sqrt{1+e^x}+ln \bigg(\frac{\sqrt{1+e^x}-1}{\sqrt{1+e^x}+1}\bigg)+C(\in \mathbb R) \end{align*}}\]

Connaissances:

• Méthode 1:
  • astuce de calcul (+1/-1)
  • Reconnaissance de la forme \(u'/u\)
• Méthode 2:
  • Changement de variable
  • Décomposition en éléments simples

Methode 1:

\(\begin{align*} I & = \int \frac{1}{1+e^x}dx  \\
& = \int \frac{1+e^x-e^x}{1+e^x}dx  \\
& = \int \frac{1+e^x}{1+e^x}dx- \int \frac{e^x}{1+e^x}dx  \\
& = \int dx- \int \frac{e^x}{1+e^x}dx  \\
& = \boxed{x-ln(1+e^x) + C} \end{align*}\)

Méthode 2:

Posons: \(u=1+e^x\)
\( \Rightarrow \begin{cases} e^x = u-1  \\  e^xdx =du \Rightarrow dx = \frac{du}{e^x}= \frac{du}{u-1}\end{cases}    \)
\(\begin{align*} I & = \int \frac{1}{1+e^x}dx  \\
&  = \int \frac{1}{u(u-1)}du \end{align*}\)

Décomposition en éléments simples:
\(\begin{align*} & \frac{1}{u(u-1)} = \frac{a}{u} + \frac{b}{u-1} \\
& \begin{cases} \times (u-1) \text{ et }u=1 & \Rightarrow & b=1 \\ 
\text {si } u =-1 \Rightarrow 1/2 = -a-1/2 & \Rightarrow & a=-1
\end{cases} \\ \\
I & = \int -\frac{1}{u}du + \int \frac{1}{u-1}du \\
& = -lnu + ln(u-1) +C \\
& = -ln(1+e^x) + ln(\cancel{1}+e^x-\cancel{1}) +C \\
& = \boxed{x-ln(1+e^x) + C} \end{align*}\)

\[\boxed {\begin{align*} I & = x-ln(1+e^x) + C(\in \mathbb R) \end{align*}}\]

Connaissances:

• Primitive de \(x^n\)

\(\begin{align*} I & = \int \sqrt[4]x.dx  \\
& = \int x^{1/4}dx \\
& = \frac{4}{5}x^{5/4}+C \end{align*}\)

\[\boxed {\begin{align*} I & = \frac{4}{5}x^{5/4}+C(\in \mathbb R) \end{align*}}\]