Final answer:
The time in the air and the distance a cannon shell travels can be calculated using projectile motion equations, factoring in the initial velocity and angle of launch.
Step-by-step explanation:
Calculating Projectile Motion Parameters
For the given problem where a cannon fires a shell at 1500 m/s and 55-degrees, we can calculate the time in the air and the distance it travels through projectile motion equations.
The time of flight (T) for a projectile launched at an angle θ with initial velocity v0 is given by:
T = (2 * v0 * sin(θ)) / g
, where g is the acceleration due to gravity (9.81 m/s
2
).
The horizontal range (R) can be calculated using the formula:
R = (v0
2
* sin(2 * θ)) / g
.
Let's calculate these for the given problem:
- Calculate the vertical component of the initial velocity: v0y = v0 * sin(θ).
- Calculate the time of flight: T = (2 * v0y) / g.
- Calculate the horizontal component of the initial velocity: v0x = v0 * cos(θ).
- Calculate the horizontal range: R = v0x * T.
By substituting the values, we can find the time the shell is in the air and the distance it traveled.