An object oscillates along a vertical line, and its position in centimeters is given by y(t)=30(sint - 1), where t ≥ 0 is measured in seconds and y is positive in the upward direction.​
At what times and positions is the velocity zero?

Velocity is the rate of change of an object's position with respect to time. In calculus, it is often represented as the derivative of the position function. For the given function y(t) = 30(sin(t) - 1), the velocity can be found by differentiating this function with respect to time t, yielding v(t) = dy/dt.

Critical points occur where the derivative of a function is zero or undefined. In the context of the velocity function, finding when the velocity is zero will help identify the times at which the object is momentarily at rest. These points are essential for analyzing the motion of the object and determining its behavior over time.

Oscillation refers to the repetitive variation in position around a central point, often described by sinusoidal functions. In this case, the position function y(t) = 30(sin(t) - 1) indicates that the object oscillates vertically, with its motion influenced by the sine function, which varies between -1 and 1. Understanding oscillation helps in predicting the object's motion and identifying key characteristics such as amplitude and period.