→ Balanced forces do not cause any change of state of an object. Balanced forces are equal in magnitude and opposite in direction.
→ Balanced forces can change the shape and size of an object.
For example: When forces are applied from both sides over a balloon, the size and shape of balloon is changed.
→ If the resultant of applied forces are greater than zero, the forces are called unbalanced forces.
→ An object in rest can be moved because of applying unbalanced forces.
• Unbalanced forces can do the following:
→ Move a stationary object
→ Increase the speed of a moving object
→ Decrease the speed of a moving object
→ Stop a moving object
→ Change the shape and size of an object
Laws of Motion
• Galileo Galilei: Galileo first of all said that object move with a constant speed when no foces act on them.
→ This means if an object is moving on a frictionless path and no other force is acting upon it, the object would be moving forever. That is, there is no unbalanced force working on the object.
→ But practically it is not possible for any object. Because to attain the condition of zero, unbalanced force is impossible.
→ Force of friction, force of air and many other forces are always acting upon an object.
Newton’s Laws of Motion
→ Newton studied the ideas of Galileo and gave the three laws of motion. These laws are known as Newton’s laws of motion.
Gelileo's experiments of motion of an objects on a inclined plane
Galileo made observations about friction and Newton built on these observations.
Galileo observed balls rolling down different curves.
The ball will run down one side of the curve then up the other. Galileo noticed that if smooth surfaces were used, the ball got closer to its original height (its height at the starting point). Galileo reasoned that the ball would get to the original height if there were no friction. The ball would get to the original height if there were no outside force (unbalanced force).
Regardless of the angles, the ball will always move towards its original height. If the incline of the second curve is less than that of the first, then the ball will travel a greater distance but still will not reach its original height due to friction – ie, the ball encountering resistance from the surface it is running along. Without friction, the ball would roll up the opposite slope to its original height even if the two ramps had different slopes.
With no friction a rolling ball will carry on forever.
Galileo concluded that if the curve ended with no incline then the ball would carry on forever were it not for friction eventually stopping it.
Newton used these observations to conclude that a force is not needed to keep an object in motion. It is in fact an external force that prevents the ball continuing.
What made Newton so radical was that before his first law of motion, scientists had said an object came to a stop because there was no force acting on it.
Newton’s First Law of Motion (Law of Inertia)
→ Any object remains in the state of rest or in uniform motion along a straight line, until it is compelled to change the state by applying external force.
Explanation: If any object is in the state of rest, then it will remain in rest until a external force is applied to change its state. Similarly, an object will remain in motion until any external force is applied over it to change its state.This means all objects resist to in changing their state. The state of any object can be changed by applying external forces only.
• Newton’s First Law of Motion in Everyday Life
(i) A person standing in a bus falls backward when bus starts moving suddenly.
→ This happens because the person and bus both are in rest while bus is not moving, but as the bus starts moving, the legs of the person start moving along with bus but rest portion of his body has the tendency to remain in rest. Because of this, the person falls backward; if he is not alert.
(ii) A person standing in a moving bus falls forward if driver applies brakes suddenly.
→ This happens because when bus is moving, the person standing in it is also in motion along with bus. But when driver applies brakes the speed of bus decreases suddenly or bus comes in the state of rest suddenly, in this condition the legs of the person which are in contact with the bus come in rest while the rest part of his body have the tendency to remain in motion. Because of this person falls forward if he is not alert.
(iii) Before hanging the wet clothes over laundry line, usually many jerks are given to the clothes to get them dried quickly. Because of jerks, droplets of water from the pores of the cloth falls on the ground and reduced amount of water in clothes dries them quickly.
→ This happens because when suddenly clothes are made in motion by giving jerks, the water droplets in it have the tendency to remain in rest and they are separated from clothes and fall on the ground.
(iv) When the pile of coin on the carom-board is hit by a striker, coin only at the bottom moves away leaving rest of the pile of coin at same place.
→ This happens because when the pile is struck with a striker, the coin at the bottom comes in motion while rest of the coin in the pile has the tendency to remain in the rest and they vertically falls the carom-board and remain at same place.
Mass and Inertia
→ The property of an object because of which it resists to get disturb its state is called inertia.
→ Inertia of an object is measured by its mass. Inertia is directly proportional to the mass. This means inertia increases with increase in mass and decreases with decrease in mass.
→ A heavy object will have more inertia than the lighter one. In other words, the natural tendency of an object that resists the change in state of motion or rest of the object is called inertia.
→ Since a heavy object has more inertia, thus it is difficult to push or pull a heavy box over the ground than the lighter one.
Momentum
→ Momentum is the power of motion of an object.
→ The product of velocity and mass is called the momentum. Momentum is denoted by ‘p’.
→ Therefore, Momentum of the object = Mass × Velocity (p = m × v)
where, p = momentum, m = mass of the object and v = velocity of the object.
• Some explanations to understand the momentum:
→ A person get injured in the case of hitting by a moving object, such as stone, pebbles or anything because of momentum of the object.
→ Even a small bullet is able to kill a person when it is fired from a gun because of its momentum due to great velocity.
→ A person get injured severely when hit by a moving vehicle because of momentum of vehicle due to mass and velocity.
Momentum and Mass
→ Since momentum is the product of mass and velocity (p = m × v) of an object. This means momentum is directly proportional to mass and velocity. Momentum increases with increase of either mass or velocity of an object.
→ This means if a lighter and a heavier object is moving with same velocity, then heavier object will have more momentum than the lighter one.
→ If a small object is moving with great velocity, it has tremendous momentum. And because of momentum, it can harm an object more severely.
Example: a small bullet having a little mass even kills a person when it is fired from a gun.
→ Usually, road accidents prove more fatal because of high speed than in slower speed. This happens because vehicles running with high speed have greater momentum compared to a vehicle running with slower speed.
Momentum of an object which is in the state of rest
Let an object with mass ‘m’ is in the rest.Since, object is in rest, therefore, its velocity, v = 0
Now we know that,
Momentum = mass × velocity⇒ p = m × 0 = 0
Thus, the momentum of an object in the rest i.e. non-moving, is equal to zero.
Unit of momentum
→ SI unit of mass = kg
→ SI unit of velocity = m/s
We know that,Momentum (p) = m × v
∴ p = kg × m/s ⇒ p = kgm/s
Numerical Problems Based on Momentum
Type I: Calculation of Momentum
Example 1: What will be the momentum of a stone having mass of 10 kg when it is thrown with a velocity of 2 m/s?
Solution
Mass (m) = 10 kg
Velocity (v) = 2 m/s
We know that,
Momentum (p) = Mass (m) × Velocity (v)
∴ p = 10 kg × 2 m/s = 20 kg m/s
Thus, the momentum of the stone = 20 kg m/s.
Example 2: Calculate the momentum of a bullet of 25 g when it is fired from a gun with a velocity of 100 m/s.
Solution
Given,
Velocity of the bullet (v) = 100 m/s
Mass of the bullet (m) = 25 g = 25/1000 kg = 0.025 kg
Since, p = m × v∴ p = 0.025 × 100 = 2.5 kg m/s
Momentum of the bullet = 2.5 kg m/s.
Example 3: Calculate the momentum of a bullet having mass of 25 g is thrown using hand with a velocity of 0.1 m/s.
Solution
Given,
Velocity of the bullet (v) = 0.1 m/s
Mass of the bullet (m) = 25 g = 25/1000 kg = 0.025 kg
Momentum (p) = Mass (m) × Velocity (v)
∴ p = 0.025 kg × 0.1 m/s⇒ p = 0.0025 kg m/s
Momentum of the bullet = 0.0025 kg m/s
Example 4: The mass of a goods lorry is 4000 kg and the mass of goods loaded on it is 20000 kg. If the lorry is moving with a velocity of 2 m/s, what will be its momentum?
Solution
Given,
Velocity (v) = 2 m/s
Mass of lorry = 4000 kg
Mass of goods on the lorry = 20000 kg
∴ Total mass (m) on the lorry = 4000 kg + 20000 kg = 24000 kg
Momentum (p) = Mass (m) × Velocity (v)
∴ p = 24000 kg × 2 m/s⇒ p = 48000 kg m/s
Momentum of the lorry = 48000 kg m/s.
Example 5: A car having mass of 1000 kg is moving with a velocity of 0.5 m/s. What will be its momentum?
Solution
Given,
Velocity of the car (v) = 0.5 m/s
Mass of the car (m) = 1000 kg
Momentum (p) = Mass (m) × Velocity (v)
∴ p = 1000 kg × 0.5 m/s = 500 kg m/s
Momentum of the car = 500 kg m/s.
Statement of Second Law of Motion
→ Rate of change of momentum of an object is proportional to applied unbalanced force in the direction of force.
Mathematical expression
Suppose,
Mass of an object = m kg
Initial velocity of an object = u m/s
Final velocity of an object = v m/s
∴ Initial momentum, p1 = mu
Final momentum, p2 = mv
∴ Change in momentum = Final momentum – Initial momentum
= mv – mu
= m(v – u)
∴ Rate of change of momentum = Change in momentum/Time taken
= m(v-u)/t
• According to 2nd law, this rate of change is momentum is directly proportional to force.
We know that, a = (v-u)/t (From 1st equation of motion)
∴ F = kma
where, k is a constant. Its value can be assumed as 1.
∴ F = 1 × m × a = ma
• SI unit = kg m/s 2 or Newton
1 Newton: When an acceleration of 1 m/s2 is seen in a body of mass 1 kg, then theforce applied on the body is said to be 1 Newton.
Proof of Newton’s First Law of Motion from Second Law
→ First law states that if external force F = 0, then a moving body keeps moving with the same velocity, or a body at rest continues to be at rest.
∴ F = 0
We know, F = m(v-u)/t
(i) A body is moving with initial velocity u then,
m(v-u)/t = 0 ⇒ v – u = 0
∴ v = u
Thus, final velocity is also same.
(ii) A body is at rest i.e., u = 0
Therefore, from above u = v = 0
So, the body will continue to be at rest.
Third Law of Motion
→ For every action there is an equal an opposite reaction.
Applications
(i) Walking is enabled by 3rd law.
(ii) A boat moves back when we deboard it.
(iii) A gun recoils.
(iv) Rowing of a boat.
Law of Conservation of Momentum
→ When two (or more) bodies act upon one another, their total momentum remains constant (or conserved) provided no external forces are acting.
• Initial momentum = Final momentum
Suppose, two objects A and B each of mass m1 and mass m2 are moving initially with velocities u1 and u2, strike each other after time t and start moving with velocities v1 and v2 respectively.
Now,
Initial momentum of object A = m1u1
Initial momentum of object B = m2u2
Final momentum of object A = m1v1
Final momentum of object B = m2v2
So,
Rate of change of momentum in A,
F1 = (m1v1 - m1u1)t = m1(v1 - u1)/t ....(i)
Rate of change of momentum in B,
F2 = (m2v2 - m2u2)t = m2(v2 - u2)/t ....(ii)
We know from 3rd law of motion,
F1 = −F2
So, m1(v1 - u1)/t = -m2(v2 - u2)/t
⇒ m1v1 – m2u2 = −m2v2 + m1u1
⇒ m1u1 + m2u2 = m1v1 + m2v2
Thus, Initial momentum = Final momentum
Example 1: A bullet of mass 20 g is fired horizontally with a velocity of 150 m/s from a pistol of mass 2 kg. Find the recoil velocity of the pistol.
Solution
Mass (m1) of bullet = 20 g = 0.02 kg
Mass (m2) of pistol = 2 kg
Initially bullet is inside the gun and it is not moving.
∵ Mass = m1+m2 = (0.02 + 2) kg = 2.02 kgand u1 = 0
∴ Initial momentum = 2.02 × 0 = 0 ....(i)
Let the velocity of pistol be v2 and v1 for bullet = 150
∴ Final momentum = m1v1 + m2v2 = 0.02×150 + 2v2 ...(ii)
We know that,
Initial momentum = Final momentum
∴ (0.02×150)/100 + 2v2 = 0 [From equations (i) and (ii)]
⇒ 3 + 2v2 = 0
⇒ 2v2 = −3
⇒ v2 = −1.5 m/s
(−)ve sign indicates that gun recoils in direction opposite to that of the bullet.
Example 2: Two hockey players viz A of mass 50 kg is moving with a velocity of 4 m/s and another one B belonging to opposite team with mass 60 kg is moving with 3 m/s, get entangled while chasing and fall down. Find the velocity with which they fall down and in which direction?
Solution
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