Final answer:
The glider will be 0.12 m to the left of its equilibrium position and have a velocity of -0.75 m/s after 1.0 second.
Step-by-step explanation:
The glider's position after 1.0 second can be determined using the equation for simple harmonic motion:
x = A * cos(2πft),
where x is the displacement from equilibrium, A is the amplitude, f is the frequency, and t is the time. In this case, the glider is pulled to the right by 12 cm, which corresponds to an amplitude of 0.12 m. Plugging in the values:
x = 0.12 m * cos(2π * 0.50 Hz * 1.0 s) = 0.12 m * cos(π) = -0.12 m,
Therefore, 1.0 second after its release, the glider will be 0.12 m to the left of its equilibrium position.
To find the velocity at this point, we can use the equation:
v = -2πAf * sin(2πft),
where v is the velocity. Plugging in the values:
v = -2π * 0.12 m * 0.50 Hz * sin(2π * 0.50 Hz * 1.0 s) = -0.75 m/s.
Therefore, the glider will have a velocity of -0.75 m/s (to the left) 1.0 second after its release.