$$$\left(- \frac{4}{57}\right)\cdot \left\langle 5, 4, 4\right\rangle$$$
Tu aportación
Calcular $$$\left(- \frac{4}{57}\right)\cdot \left\langle 5, 4, 4\right\rangle$$$.
Solución
Multiplica cada coordenada del vector por el escalar:
$$${\color{Fuchsia}\left(- \frac{4}{57}\right)}\cdot \left\langle 5, 4, 4\right\rangle = \left\langle {\color{Fuchsia}\left(- \frac{4}{57}\right)}\cdot \left(5\right), {\color{Fuchsia}\left(- \frac{4}{57}\right)}\cdot \left(4\right), {\color{Fuchsia}\left(- \frac{4}{57}\right)}\cdot \left(4\right)\right\rangle = \left\langle - \frac{20}{57}, - \frac{16}{57}, - \frac{16}{57}\right\rangle$$$
Respuesta
$$$\left(- \frac{4}{57}\right)\cdot \left\langle 5, 4, 4\right\rangle = \left\langle - \frac{20}{57}, - \frac{16}{57}, - \frac{16}{57}\right\rangle\approx \left\langle -0.350877192982456, -0.280701754385965, -0.280701754385965\right\rangle$$$A