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Author(s) Philippe Delsarte, Manon Oreins
Deadline No deadline
Submission limit No limitation
Category tags Int

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Primitives et intégrales - Q13

Calculer

Question 1:
Hint Add answer
exex1dx
  • General
  • Symbols
  • Geometry
$\frac{\square}{\square}$$\sqrt{\square}$$\sqrt[3]{\square}$3$\sqrt[\square]{\square}$$\int_{\square}^{\square}$$\square^2$2$\square_2$2$\left(\square\right)$()
$\times$×$\div$÷$\pm$±$\pi$π$\infty$$\varnothing$$\ne$$\ge$$\le$$>$>$<$<$\cup$$\cap$
$\angle$$\parallel$$\perp$$\triangle$$\parallelogram$
Question 2:
Hint Add answer
1ex1dx
  • General
  • Symbols
  • Geometry
$\frac{\square}{\square}$$\sqrt{\square}$$\sqrt[3]{\square}$3$\sqrt[\square]{\square}$$\int_{\square}^{\square}$$\square^2$2$\square_2$2$\left(\square\right)$()
$\times$×$\div$÷$\pm$±$\pi$π$\infty$$\varnothing$$\ne$$\ge$$\le$$>$>$<$<$\cup$$\cap$
$\angle$$\parallel$$\perp$$\triangle$$\parallelogram$
Question 3:
Hint Add answer
1(ex1)2dx
  • General
  • Symbols
  • Geometry
$\frac{\square}{\square}$$\sqrt{\square}$$\sqrt[3]{\square}$3$\sqrt[\square]{\square}$$\int_{\square}^{\square}$$\square^2$2$\square_2$2$\left(\square\right)$()
$\times$×$\div$÷$\pm$±$\pi$π$\infty$$\varnothing$$\ne$$\ge$$\le$$>$>$<$<$\cup$$\cap$
$\angle$$\parallel$$\perp$$\triangle$$\parallelogram$
Question 4:
Hint Add answer
x3sinx2dx
  • General
  • Symbols
  • Geometry
$\frac{\square}{\square}$$\sqrt{\square}$$\sqrt[3]{\square}$3$\sqrt[\square]{\square}$$\int_{\square}^{\square}$$\square^2$2$\square_2$2$\left(\square\right)$()
$\times$×$\div$÷$\pm$±$\pi$π$\infty$$\varnothing$$\ne$$\ge$$\le$$>$>$<$<$\cup$$\cap$
$\angle$$\parallel$$\perp$$\triangle$$\parallelogram$