Given:
Initial Velocity of the mailbag = 1.08 m/s
Let's solve for the following:
(a). Speed of the mailbag after 4.00s.
To find the speed after 4.00 seconds, apply the motion formula:
v = u + at
Where:
v is the speed after 4.00s
u is the initial velocity = -1.08 m/s (negative because it is descending)
a is the acceleration due to gravity acting on the bag = -9.81 m/s².
t is the time = 4.00 s
Hence, we have:
v = -1.08 + -9.81 x 4.00
v = -1.08 - 39.24
v = -40.32 m/s
Therefore, the speed after 4.00 s is 40.32 m/s.
• (b). , How far is it below the helicopter.
To find the distance between the bag and the helicopter, apply the formula:
Where d is the distance.
u = -1.08 m/s
g = 9.81 m/s²
t = 4.00 s
Plug in values into the equation and solve:
For the dipslacement of the heliopter, we have:
Where:
a = 0 m/s^2
Now, to find the distance, we have:
Distance = (-82.8 m) - (-4.32 m) = -82.8 + 4.32 = 78.48 m
The distance between the bag and the helicopter is 78.48 m
The negative sign is just to indicate the bag is below the helicopter.
• (c.) If the helicopter is risng at 1.08 m/s.
(c.) i) What is the speed of the mailbag?
Apply the fomrula:
v = u - at
Where:
u = 1.08 m/s
a = 9.81 m/s²
t = 4.00 s
Hence, we have:
v = 1.08 - 9.81(4.00)
v = 1.08 - 39.24
v = -38.16 m/s
Therefore, the new speed if the helicoter is rising steadily is 38.16 m/s
(c) ii) The distance.
Apply the fomula:
Where:
u = 1.08 m/s
t = 4.00 s
g = 9.81 m/s^2
Hence, we have:
For the displacement:
Distance = -74.16 m - 4.32 m = -78.48 m
Therfore, the distance between the bag and helicopter if the helicopter is rising steadily is 78.48 m.
ANSWER:
• (,a) 40.32 m/s
,
• (b). 78.48 m
• (c). a) 38.16 m/s
b) d = 78.48 m