Associer coefficient directeur et vecteur directeur équivalents Exercice

\overrightarrow{u}(7{,}3)

\overrightarrow{v}(2{,}8)

\overrightarrow{w}(\dfrac{1}{2}, 4)

\overrightarrow{a}(2, \sqrt{2})

\overrightarrow{b}(3{,}1)

m=\dfrac{3}{7}

m=4

m=8

m = \dfrac{\sqrt{2}}{2}

m=\dfrac{1}{3}

\overrightarrow{u}(3{,}5)

\overrightarrow{v}(4{,}6)

\overrightarrow{w}(\dfrac{3}{2}, 7)

\overrightarrow{a}(7, \sqrt{3})

\overrightarrow{b}(\dfrac{1}{7},\dfrac{5}{6})

m=\dfrac{5}{3}

m=\dfrac{3}{2}

m=\dfrac{14}{3}

m = \dfrac{\sqrt{3}}{7}

m=\dfrac{35}{6}

\overrightarrow{u}(3,\dfrac{3}{4})

\overrightarrow{v}(-\dfrac{4}{3},4)

\overrightarrow{w}(\dfrac{6}{7}, 3)

\overrightarrow{a}(\dfrac{\sqrt{3}}{3}, \sqrt{3})

\overrightarrow{b}(\dfrac{4}{3},\dfrac{9}{2})

m=\dfrac{1}{4}

m=-3

m=\dfrac{7}{2}

m = 3

m=\dfrac{27}{8}

\overrightarrow{u}(\dfrac{1}{3},\dfrac{3}{4})

\overrightarrow{v}(-\dfrac{4}{9},-3)

\overrightarrow{w}(\dfrac{11}{8}, \dfrac{9}{10})

\overrightarrow{a}(\dfrac{\sqrt{7}}{2}, \dfrac{\sqrt{2}}{2})

\overrightarrow{b}(\dfrac{1}{8},\dfrac{4}{3})

m=\dfrac{9}{4}

m=\dfrac{27}{4}

m=\dfrac{36}{55}

m = \dfrac{\sqrt{2}}{\sqrt{7}}

m=\dfrac{32}{3}

\overrightarrow{u}(\dfrac{2}{7},\dfrac{4}{5})

\overrightarrow{v}(-\dfrac{18}{11},6)

\overrightarrow{w}(\dfrac{7}{6}, \dfrac{7}{8})

\overrightarrow{a}(\dfrac{\sqrt{10}}{5}, \dfrac{\sqrt{5}}{10})

\overrightarrow{b}(\dfrac{25}{9},\dfrac{26}{5})

m=\dfrac{14}{5}

m=-\dfrac{11}{3}

m=\dfrac{3}{4}

m = \dfrac{\sqrt{5}}{2\sqrt{10}}

m=\dfrac{234}{125}