A sphere rolls down an elevated track and becomes airborne. 1 h₁ Range Height-1: h1 = 0.32 m Height-2: h2 = 1.14 m h₂ What is the Range of travel for the ball (Distance) after it has launched from the track? Give your answers in meters.
A sphere rolls down an elevated track and becomes airborne. 1 h₁ Range Height-1: h1 = 0.32 m Height-2: h2 = 1.14 m h₂ What is the Range of travel for the ball (Distance) after it has launched from the track? Give your answers in meters.
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A sphere rolls down an elevated track and becomes airborne.
Height-1: h1 = 0.32 m
Height-2: h2 = 1.14 m
What is the Range of travel for the ball (Distance) after it has launched from the track?
Give your answers in meters.
![### Projectile Motion of a Sphere
A sphere rolls down an elevated track and becomes airborne.
![Image depicting a sphere rolling down an elevated track and becoming airborne.]
#### Diagram Explanation:
The image illustrates a sphere moving along an elevated track. The sphere rolls off the track and launches into the air, following a parabolic trajectory before landing on a lower surface. Key dimensions in the diagram include:
- **Height-1 (h₁)**: The initial height from which the sphere begins to roll down, measured at 0.32 meters.
- **Height-2 (h₂)**: The height from which the sphere is launched into the air, measured at 1.14 meters.
The horizontal distance covered by the sphere from the point it leaves the track until it lands on the lower surface is labeled as "Range."
### Physics Problem:
**Given:**
- Height-1: \( h_1 = 0.32 \, \text{m} \)
- Height-2: \( h_2 = 1.14 \, \text{m} \)
**Question:**
What is the Range of travel for the ball (Distance) after it has launched from the track? Give your answers in meters.
Understanding the problem will involve applying principles of projectile motion to determine the horizontal distance (Range) traveled by the sphere.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fe77e1f08-afe7-4a66-b3a4-8fc9f2c917dc%2Fb73721ed-428b-46a0-a332-ae7fc6acf3f4%2Fd0a91i_processed.png&w=3840&q=75)
Transcribed Image Text:### Projectile Motion of a Sphere
A sphere rolls down an elevated track and becomes airborne.
![Image depicting a sphere rolling down an elevated track and becoming airborne.]
#### Diagram Explanation:
The image illustrates a sphere moving along an elevated track. The sphere rolls off the track and launches into the air, following a parabolic trajectory before landing on a lower surface. Key dimensions in the diagram include:
- **Height-1 (h₁)**: The initial height from which the sphere begins to roll down, measured at 0.32 meters.
- **Height-2 (h₂)**: The height from which the sphere is launched into the air, measured at 1.14 meters.
The horizontal distance covered by the sphere from the point it leaves the track until it lands on the lower surface is labeled as "Range."
### Physics Problem:
**Given:**
- Height-1: \( h_1 = 0.32 \, \text{m} \)
- Height-2: \( h_2 = 1.14 \, \text{m} \)
**Question:**
What is the Range of travel for the ball (Distance) after it has launched from the track? Give your answers in meters.
Understanding the problem will involve applying principles of projectile motion to determine the horizontal distance (Range) traveled by the sphere.
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