Final answer:
Using kinematic equations and the given conditions, it has been determined that the initial speed of the object thrown vertically upwards was 68 m/s.
Step-by-step explanation:
To find the initial speed of the object thrown vertically upwards, we need to apply the principles of kinematic equations for uniformly accelerated motion. The problem states that the object attains a velocity of 34 m/s at one fourth of its maximum height. Since the only acceleration acting on the object is due to gravity, we will use the following equation which relates velocity, acceleration, and displacement:
v^2 = u^2 + 2as
Where:
- v is the final velocity (34 m/s)
- u is the initial velocity (what we are looking for)
- a is the acceleration due to gravity (-9.8 m/s^2)
- s is the displacement (1/4 of the maximum height H)
At the maximum height, the velocity is 0 m/s. Thus, we can apply the same equation to find the maximum height H:
0 = u^2 + 2(-9.8)(H) ---->(1)
Also, we know that at 1/4H the velocity is 34 m/s:
34^2 = u^2 + 2(-9.8)(H/4) ---->(2)
Dividing equation (2) by equation (1), we obtain:
(34^2) / (u^2) = (2(-9.8)(H/4)) / (2(-9.8)(H))
After simplifying, we find that u^2 is four times 34^2, or:
u^2 = 4 * 34^2
u = sqrt(4 * 34^2)
u = 2 * 34
u = 68 m/s
So, the initial velocity was 68 m/s.