A point object is moving on the cartesian coordinate plane according to: $\to r (t) = b^{2} t {ˆ u}_{x} + (c t^{3} - q_{0}) {ˆ u}_{y}$ $vecr(t)=b^2thatu_x+(ct^3−q_0)hatu_y$ . Determine: a) The equation of the trajectory of object on the cartesian plane b) The magnitude and direction of the velocity?

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A point object is moving on the cartesian coordinate plane according to: $\to r (t) = b^{2} t {ˆ u}_{x} + (c t^{3} - q_{0}) {ˆ u}_{y}$ $vecr(t)=b^2thatu_x+(ct^3−q_0)hatu_y$ . Determine: a) The equation of the trajectory of object on the cartesian plane b) The magnitude and direction of the velocity?

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Answer 1 · 2016-06-04T10:39:35

trajectory $y = (\frac{c}{b^{6}}) x^{3} - q_{0}$ $y = (c/(b^6))x^3-q_0$
velocity magnitude $∥ ∥ \to v (t) ∥ ∥ = \sqrt{b^{4} + 9 c^{2} t^{4}}$ $norm (vec v(t)) = sqrt(b^4+9c^2t^4)$
velocity normalized direction $\frac{\to v (t)}{∥ ∥ \to v (t) ∥ ∥} = \frac{{b^{2}, 3 c t^{2}}}{\sqrt{b^{4} + 9 c^{2} t^{4}}}$ $(vec v(t))/(norm (vec v(t)) ) = {{b^2,3c t^2}}/sqrt(b^4+9c^2t^4)$

Explanation:

Making $\to r (t) = {x (t), y (t)}$ $vec r(t) = {x(t),y(t)}$ we have

${x (t), y (t)} = {b^{2} t, c t^{3} - q_{0}}$ ${x(t),y(t)} = {b^2t, ct^3-q_0}$

which is the so called movement parametric equation.
Eliminating $t$ $t$ we get

$y = (\frac{c}{b^{6}}) x^{3} - q_{0}$ $y = (c/(b^6))x^3-q_0$

which is the trajectory equation.

Velocity determination is done differentiating $\to r (t)$ $vec r(t)$ regarding $t$ $t$ so

$\to v (t) = {b^{2}, 3 c t^{2}}$ $vec v(t) = {b^2,3c t^2}$

so $∥ ∥ \to v (t) ∥ ∥ = \sqrt{b^{4} + 9 c^{2} t^{4}}$ $norm (vec v(t)) = sqrt(b^4+9c^2t^4)$ is the velocity magnitude and

$\frac{\to v (t)}{∥ ∥ \to v (t) ∥ ∥} = \frac{{b^{2}, 3 c t^{2}}}{\sqrt{b^{4} + 9 c^{2} t^{4}}}$ $(vec v(t))/(norm (vec v(t)) ) = {{b^2,3c t^2}}/sqrt(b^4+9c^2t^4)$ is the normalized direction

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A point object is moving on the cartesian coordinate plane according to: →r(t)=b2tˆux+(ct3−q0)ˆuyvecr(t)=b^2thatu_x+(ct^3−q_0)hatu_y. Determine: a) The equation of the trajectory of object on the cartesian plane b) The magnitude and direction of the velocity?

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Explanation:

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