lafrite/2020-2021
1
0
Fork 0
Code Issues Pull Requests Releases Wiki Activity

Feat: QF pour les TSTsti2d
All checks were successful
continuous-integration/drone/push Build is passing
Details

Browse Source
This commit is contained in:
Bertrand Benjamin 2021-02-28 21:06:30 +01:00
parent 208bfdbfde
commit 63c12ae2eb
4 changed files with 112 additions and 0 deletions
Show Stats Download Patch File Download Diff File Expand all files Collapse all files

BIN
TST_sti2d/Questions_Flash/P4/QF_21_03_01-1.pdf Normal file
View File

Binary file not shown.

55
TST_sti2d/Questions_Flash/P4/QF_21_03_01-1.tex Executable file
View File

@ -0,0 +1,55 @@
\documentclass[14pt]{classPres}
\usepackage{tkz-fct}
\author{}
\title{}
\date{}
\begin{document}
\begin{frame}{Questions flashs}
\begin{center}
\vfill
Terminale ST \\ Spé sti2d
\vfill
30 secondes par calcul
\vfill
\tiny \jobname
\end{center}
\end{frame}
\begin{frame}[fragile]{Calcul 1}
Retrouver la valeur de $V_0$
\[
234 = V_0 e^{-0.4\times 0} + 2
\]
\vfill
\end{frame}
\begin{frame}{Calcul 2}
Démontrer que
\[ F(x) = (x^2 + x)e^{2x} + 100
\]
est une primitive de
\[
f(x) = (2x^2 + 4x + 1)e^{2x}
\]
\end{frame}
\begin{frame}{Calcul 3}
Soit
\[
z = -\sqrt{2}- \sqrt{2}i
\]
On donne $r = |z| = 2$.
Déterminer l'argument de $z$.
\end{frame}
\begin{frame}{Fin}
\begin{center}
On retourne son papier.
\end{center}
\end{frame}
\end{document}

BIN
TST_sti2d/Questions_Flash/P4/QF_21_03_01-2.pdf Normal file
View File

Binary file not shown.

57
TST_sti2d/Questions_Flash/P4/QF_21_03_01-2.tex Executable file
View File

@ -0,0 +1,57 @@
\documentclass[14pt]{classPres}
\usepackage{tkz-fct}
\author{}
\title{}
\date{}
\begin{document}
\begin{frame}{Questions flashs}
\begin{center}
\vfill
Terminale ST \\ Spé sti2d
\vfill
30 secondes par calcul
\vfill
\tiny \jobname
\end{center}
\end{frame}
\begin{frame}[fragile]{Calcul 1}
Soit $f(x) = a e^{0.1x} + 2$.
On suppose que $f(0) = 5$.
Retrouver la valeur de $a$.
\vfill
\end{frame}
\begin{frame}{Calcul 2}
Démontrer que
\[ F(x) = (2x+1)e^{-0.5x} + 10
\]
est une primitive de
\[
f(x) = (-x+1.5°e^{-0.5x}
\]
\end{frame}
\begin{frame}{Calcul 3}
Soit
\[
z = -\sqrt{3}- i
\]
On donne $r = |z| = 2$.
Déterminer l'argument de $z$.
\end{frame}
\begin{frame}{Fin}
\begin{center}
On retourne son papier.
\end{center}
\end{frame}
\end{document}