The x, y, and z coordinates (in meters) of a particle P as a function of time (in seconds) are x = sin 3t, y = cos t, and z = sin 2t. At t = 3 s, determine g) The unit normal vector ûn. h) The angles o, y, and ó that a makes with the x, y, and z axes. i) The tangential component at of the acceleration.

The x, y, and z coordinates (in meters) of a particle P as a function of time (in seconds) are x = sin 3t, y = cos t, and z = sin 2t. At t = 3 s, determine g) The unit normal vector ûn. h) The angles o, y, and ó that a makes with the x, y, and z axes. i) The tangential component at of the acceleration.

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The x, y, and z coordinates (in meters) of a particle P as a function of time (in seconds)
are x = sin 3t, y = cos t, and z = sin 2t. At t = 3 s, determine
g) The unit normal vector ûn.
h) The angles , Øy, and o₂ that a makes with the x, y, and z axes.
i) The tangential component a of the acceleration.

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