Newton’s three laws and provides a deep understanding of their implications. Starting with Newton’s First Law of Motion, also known as the Law of Inertia, we delve into how objects behave when at rest or in uniform motion.
Newton’s Second Law of Motion, we unravel the relationship between mass, acceleration and external forces.
Newton’s Third Law of Motion, shedding light on the concept of action and reaction.
Newton’s First Law of Motion
Newton’s first law of motion states that objects persist in their current state of motion unless compelled to do otherwise by an external force. Whether an object is at rest or in uniform motion, it will continue in that state unless a net external force acts upon it.
One crucial insight provided by Newton’s First Law is that the object will maintain a constant velocity in the absence of a net force resulting from unbalanced forces acting on an object.
If the object is already in motion, it will continue moving at the same speed and direction. Likewise, if the object is at rest, it will remain stationary. However, introducing an additional external force will cause the object’s velocity to change, responding to the magnitude and direction of the force applied.
Newton’s Second Law of Motion
Newton’s Second Law of Motion, which provides a deeper understanding of how bodies respond to external forces.
The second law of motion describes the relationship between the force acting on a body and the resulting acceleration. According to Newton’s second law, the force acting on an object is equal to the product of its mass and acceleration.
Mathematically, we express Newton’s Second Law as follows:
\(\begin{array}{l}F=m\times a\end{array} \)
Here, F represents the force, m is the object’s mass and a is the acceleration produced. This equation reveals that the acceleration of an object is directly proportional to the magnitude of the net force applied in the same direction as the force and inversely proportional to the object’s mass.
By understanding Newton’s Second Law, we can determine how much an object will accelerate when subjected to a specific net force. The equation highlights the intricate relationship between force, mass, and acceleration, providing a quantitative framework for analysing the dynamics of objects in motion.
In the second law equation, a proportionality constant is represented by the letter “k.” When using the SI unit system, this constant is equal to 1. Therefore, the final expression simplifies to:
\(\begin{array}{l}F=m\times a\end{array} \)
The concise and powerful expression of Newton’s Second Law showcases the fundamental principle that governs the relationship between force and acceleration in physics. With this law, we gain a quantitative understanding of how external forces impact the motion of objects based on their mass and the resulting acceleration they experience.
Newton’s Third Law of Motion
Newton’s Third Law of Motion, revealing a fascinating relationship between forces exerted by interacting bodies.
Newton’s Third Law of Motion states that for every action, there is an equal and opposite reaction. When two bodies interact, they apply forces on each other that are equal in magnitude and opposite in direction. This law highlights the concept that forces always occur in pairs.
To illustrate this principle, consider the example of a book resting on a table. As the book applies a downward force equal to its weight on the table, the table, in turn, exerts an equal and opposite force on the book. This occurs because the book slightly deforms the table’s surface, causing the table to push back on the book, much like a compressed spring releasing its energy.
This third law of motion has profound implications, including conserving momentum.
Momentum is a property of moving objects determined by an object’s mass and velocity.
According to Newton’s third law, the total momentum of an isolated system remains constant. This means that in any interaction, the total momentum before and after the interaction remains the same, regardless of the forces involved.
Understanding Newton’s third law of motion deepens our comprehension of the interconnectedness and equilibrium within the physical world. It provides a framework for analysing and predicting the effects of forces in various scenarios, from everyday interactions to complex mechanical systems.
Laws of Motion Summary
The flowchart highlights the three laws of motion established by Sir Isaac Newton:
- Newton’s First Law of Motion: The law of inertia states that an object at rest will remain at rest, and an object in motion will continue moving with a constant velocity, unless acted upon by an external force.
- Newton’s Second Law of Motion: This law relates the force acting on an object to its mass and acceleration. The force is equal to the product of mass and acceleration, where acceleration is the rate of change of velocity.
- Newton’s Third Law of Motion: The law of action and reaction states that for every action, there is an equal and opposite reaction. When one body exerts a force on another body, the second body simultaneously exerts a force of the same magnitude but in the opposite direction on the first body.
By referring to this flowchart, you can quickly learn the fundamental principles of Newton’s Laws of Motion and understand how they govern the behaviour of objects in various scenarios. It serves as a useful tool for remembering Newton’s three laws of motion.
Laws of Motion Numericals
1. Suppose a bike with a rider on it having a total mass of 63 kg brakes and reduces its velocity from 8.5 m/s to 0 m/s in 3.0 seconds. What is the magnitude of the braking force?
Solution:
The combined mass of the rider and the bike = 63 kg
Initial Velocity = 8.5 m/s
Final Velocity = 0 m/s
The time in which the bike stops = 3 s
The net force acting on the body equals the rate of change of an object’s momentum.
\(\begin{array}{l}F=\frac{\Delta p}{\Delta t}\end{array} \)
The momentum of a body with mass m and velocity v is given by p = mv
Hence, the change in momentum of the bike is given by
\(\begin{array}{l}\Delta p=mv-mu=m(v-u)\end{array} \)
Hence, the net force acting on the bike is given by
\(\begin{array}{l}F=\frac{m(v-u)}{\Delta t}\end{array} \)
Substituting the value, we get
\(\begin{array}{l}F=\frac{63\,kg\times (0-8.5\,m/s)}{3.0\,s}\end{array} \)
\(\begin{array}{l}F=-178.5\,N\end{array} \)
The magnitude of the braking force is -178.5 N.
2. Calculate the net force required to give an automobile of mass 1600 kg an acceleration of 4.5 m/s2.
We calculate the force using the following formula.
F=ma
Substituting the values in the equation, we get
F=1600 x 4.5=7200 N
Frequently Asked Questions – FAQs
Q1
Who discovered the three laws of motion?
Sir Isaac Newton discovered the three laws of motion.
Q2
Why are the laws of motion important?
Newton’s laws are essential because they relate to everything we do or see in everyday life. These laws tell us how things move or stay still and why we don’t float out of our bed or fall through the floor of our house.
Q3
What are Newton’s laws of motion all about?
Newton’s laws of motion imply the relationship between an object’s motion and the forces acting on it. In the first law, we understand that an object will not change its motion unless a force acts on it. The second law states that the force on an object is equal to its mass times its acceleration. And finally, the third law states that there is an equal and opposite reaction for every action.
Q4
What is the difference between Newton’s laws of motion and Kepler’s laws of motion?
Newton’s laws of motion are general and apply to any motion, while Kepler’s laws apply only to planetary motion in the solar system.
Q5
What are some daily life examples of Newton’s 1st, 2nd and 3rd laws of motion?
- The motion of a ball falling through the atmosphere or a model rocket being launched up into the atmosphere are both excellent examples of Newton’s 1st law.
- Riding a bicycle is an excellent example of Newton’s 2nd law. In this example, the bicycle is the mass. The leg muscles pushing on the pedals of the bicycle is the force.
- You hit a wall with a certain amount of force, and the wall returns that same amount of force. This is an example of Newton’s 3rd law.