A bullet of mass mb is fired horizontally with speed vi at a wooden block of mass mw resting on a frictionless table. The bullet hits the block and becomes completely embedded within it. After the bullet has come to rest relative to the block, the block, with the bullet in it, is traveling at speed vf. (Figure 1) Figure Before collision *10€ mw After collision V₁ Ⓒ 1 of 1 Part A Which of the following best describes this collision? ▸ View Available Hint(s) Submit ▾ Part B perfectly elastic partially inelastic perfectly inelastic Which of the following quantities, if any, are conserved during this collision? ▸ View Available Hint(s) Part C Submit kinetic energy only momentum only kinetic energy and momentum neither momentum nor kinetic energy Uf = What is the speed of the block/bullet system after the collision? Express your answer in terms of vi, mw, and mb. ▸ View Available Hint(s) Templates Symbols undo redo reset keyboard shortcuts help, Submit Provide Feedback

College Physics
11th Edition
ISBN:9781305952300
Author:Raymond A. Serway, Chris Vuille
Publisher:Raymond A. Serway, Chris Vuille
Chapter1: Units, Trigonometry. And Vectors
Section: Chapter Questions
Problem 1CQ: Estimate the order of magnitude of the length, in meters, of each of the following; (a) a mouse, (b)...
icon
Related questions
Question
**Text and Diagram Transcription for Educational Website:**

### Educational Exercise on Collisions

**Scenario:**
A bullet of mass \( m_b \) is fired horizontally with speed \( v_i \) at a wooden block of mass \( m_{\text{w}} \) resting on a frictionless table. The bullet hits the block and becomes completely embedded within it. After the bullet has come to rest relative to the block, the block—with the bullet inside—is traveling at speed \( v_f \). 

**Diagram Explanation:**
There is a diagram labeled "Figure," which is divided into two parts: "Before collision" and "After collision."

- **Before Collision:**
  - A bullet with mass \( m_b \) and speed \( v_i \) moves towards the block.
  - The block is stationary with mass \( m_{\text{w}} \).

- **After Collision:**
  - The bullet and block are combined and move together at speed \( v_f \).

### Questions

**Part A:**
Which of the following best describes this collision?

- Perfectly elastic
- Partially inelastic
- Perfectly inelastic

**Part B:**
Which of the following quantities, if any, are conserved during this collision?

- Kinetic energy only
- Momentum only
- Kinetic energy and momentum
- Neither momentum nor kinetic energy

**Part C:**
What is the speed of the block/bullet system after the collision? Express your answer in terms of \( v_i \), \( m_{\text{w}} \), and \( m_b \).

- \( v_f = \)

**Options:**
- View Available Hint(s)
- Submit

**User Input:**
There is a field for expressing the answer symbolically.

This exercise aims to help students understand the conservation principles in physics, particularly in collision scenarios.
Transcribed Image Text:**Text and Diagram Transcription for Educational Website:** ### Educational Exercise on Collisions **Scenario:** A bullet of mass \( m_b \) is fired horizontally with speed \( v_i \) at a wooden block of mass \( m_{\text{w}} \) resting on a frictionless table. The bullet hits the block and becomes completely embedded within it. After the bullet has come to rest relative to the block, the block—with the bullet inside—is traveling at speed \( v_f \). **Diagram Explanation:** There is a diagram labeled "Figure," which is divided into two parts: "Before collision" and "After collision." - **Before Collision:** - A bullet with mass \( m_b \) and speed \( v_i \) moves towards the block. - The block is stationary with mass \( m_{\text{w}} \). - **After Collision:** - The bullet and block are combined and move together at speed \( v_f \). ### Questions **Part A:** Which of the following best describes this collision? - Perfectly elastic - Partially inelastic - Perfectly inelastic **Part B:** Which of the following quantities, if any, are conserved during this collision? - Kinetic energy only - Momentum only - Kinetic energy and momentum - Neither momentum nor kinetic energy **Part C:** What is the speed of the block/bullet system after the collision? Express your answer in terms of \( v_i \), \( m_{\text{w}} \), and \( m_b \). - \( v_f = \) **Options:** - View Available Hint(s) - Submit **User Input:** There is a field for expressing the answer symbolically. This exercise aims to help students understand the conservation principles in physics, particularly in collision scenarios.
Expert Solution
trending now

Trending now

This is a popular solution!

steps

Step by step

Solved in 2 steps with 1 images

Blurred answer
Knowledge Booster
Collisions
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, physics and related others by exploring similar questions and additional content below.
Similar questions
Recommended textbooks for you
College Physics
College Physics
Physics
ISBN:
9781305952300
Author:
Raymond A. Serway, Chris Vuille
Publisher:
Cengage Learning
University Physics (14th Edition)
University Physics (14th Edition)
Physics
ISBN:
9780133969290
Author:
Hugh D. Young, Roger A. Freedman
Publisher:
PEARSON
Introduction To Quantum Mechanics
Introduction To Quantum Mechanics
Physics
ISBN:
9781107189638
Author:
Griffiths, David J., Schroeter, Darrell F.
Publisher:
Cambridge University Press
Physics for Scientists and Engineers
Physics for Scientists and Engineers
Physics
ISBN:
9781337553278
Author:
Raymond A. Serway, John W. Jewett
Publisher:
Cengage Learning
Lecture- Tutorials for Introductory Astronomy
Lecture- Tutorials for Introductory Astronomy
Physics
ISBN:
9780321820464
Author:
Edward E. Prather, Tim P. Slater, Jeff P. Adams, Gina Brissenden
Publisher:
Addison-Wesley
College Physics: A Strategic Approach (4th Editio…
College Physics: A Strategic Approach (4th Editio…
Physics
ISBN:
9780134609034
Author:
Randall D. Knight (Professor Emeritus), Brian Jones, Stuart Field
Publisher:
PEARSON