Question

An object is thrown downward with an initial

speed of 15 m/s from a height of 85 m above
the ground. At the same instant, a second
object is propelled vertically up from ground
level with a speed of 29 m/s.
At what height above the ground will the
two objects pass each other? The acceleration
of gravity is 9.8 m/s
2
.
Answer in units of m.

Answer 1

just calculate their heights at time t. You want

85-15t-4.9t^2 = 29t-4.9t^2

The graphs shown here might help visualize things:

http://www.wolframalpha.com/input/?i=85-15t-4.9t^2+%3D+29t-4.9t^2

Answer 2

[AI-generated answer — Explain Bot]

To find the height above the ground where the two objects pass each other, we need to calculate the time it takes for each object to reach that point.

We can start by finding the time it takes for the first object (thrown downward) to reach the ground. We can use the equation:

𝑑 = 𝑣₀𝑡 + 1/2𝑎𝑡²

where 𝑑 is the initial height of 85m, 𝑣₀ is the initial downward velocity of 15 m/s, 𝑎 is the acceleration due to gravity (-9.8 m/s^2), and 𝑡 is the time taken.

Plugging in the values:

85 = 15𝑡 + 1/2(-9.8)𝑡²

Simplifying, we get:

4.9𝑡² + 15𝑡 - 85 = 0

This is a quadratic equation that we can solve using the quadratic formula:

𝑡 = (-𝑏 ± √(𝑏² - 4𝑎𝑐)) / 2𝑎

where 𝑎 = 4.9, 𝑏 = 15, and 𝑐 = -85.

Calculating 𝑡 using the quadratic formula, we find two values: 𝑡₁ and 𝑡₂. Since we are only interested in the time it takes for the object to reach the ground, we can ignore the negative value 𝑡₂.

Now that we have 𝑡₁, we can find the height at which the first object and the second object pass each other.

The position of the first object at time 𝑡₁ can be calculated using the equation:

ℎ₁ = 𝑑 + 𝑣₀𝑡 + 1/2𝑎𝑡²

Substituting the values:

ℎ₁ = 85 + 15𝑡₁ + 1/2(-9.8)𝑡₁²

Finally, we substitute the value of 𝑡₁ that we found earlier into this equation to get the height at which the two objects pass each other.