## ^Kinetic energy

^Kinetic energy

Kinetic means motion. A mass ‘m’ moving at

As both m & v2 are + ve & scalar, thus the KE of a body is always a +ve scalar quantity. Where as linear momentum is vector and always directed in the direction of velocity.

KE of a system of particles is the sum of kinetic energy of all of its constituent particles. i.e.

KE of a body depends upon the frame of reference. e.g. a person sitting in a moving bus has some KE w.r.t. the person standing at rest on road but no KE w.r.t. the persons in sitting in the same bus.

Actually KE is defined as the amount of work done to accelerate a body from rest.

Proof:

Rest means both linear momentum & KE zero. A body can’t have KE without linear momentum & vice – versa. Using the relation

we can say that

1. If the linear momentum of a body is doubled, then its KE becomes 4 times.
2. If the KE of a body is doubled, then its linear momentum becomes
3. If a light body and a heavy body have same linear momentum, then lighter body will have greater KE.
4. If a light body and a heavy body have same KE, then heavier body will have greater linear momentum.

## ^Death well & Rotor

^Death well & Rotor

Static friction balances the weight of person & normal reaction

(due to centrifugal force) provides the necessary centripetal force  i.e. f = mg

Using f = μs N, condition for

## ^Bending while turning

^Bending while turning

If anything is pressed straight down, its reaction is straight up & has no horizontal component. But if pressing is done at some angle, then the reaction force has both horizontal & vertical components.

This trick is the basis of bending while turning of a bike, aircraft, ice skater etc.

The vertical component of the reaction of the pressing force balances the weight of the system

i.e.  mg = Ncosθ

The horizontal component of the reaction of the pressing force provides centripetal force helping him to take turn (change the direction)

Dividing the two equations we can say that the required angle of bending of cyclist is

## ^Moderator

^Moderator

The neutrons produced in fission of 235U nuclei have average KE about 2 MeV. Such neutrons are called fast neutrons. These fast neutrons have more tendency to escape instead of triggering another fission reaction. Slow neutrons are more efficient in inducing fission in 92U235 nuclei than fast neutrons. By the use of a moderator, the fast neutrons are slowed to thermal velocities i.e. velocities » 2200 m/s & energies » 0.0235 eV, it is same as that of atoms and molecules at room temperatures, such slow moving neutrons are called thermal neutrons. Light target are better moderators. The commonly used moderator are water, heavy water (D2O), graphite and beryllium. About 25 collisions with deutrons (present in heavy water) or 100 collisions with carbon or beryllium are sufficient to slow down a neutron from 2 MeV to thermal energies.

A good moderator must have:

1. low atomic weight
2. should collide elastically with neutrons.
3. should not absorb the neutrons

## ^Comparison of α, β & ϒ  rays

Here IP = Ionizing power & PP = Penetrating power

Also All the three type of rays namely α, β & ϒ affect photographic plate  produce flourescence & artificial radioactivity.

## ^γ-decay

^γ-decay

Most radioisotopes, after an alpha decay or a beta decay, leave the daughter nucleus in an excited state, these excited nuclei make a transition to a state of lower energy by emitting a photon. These photons are charge less, mass less & high energy electromagnetic waves (of the order of million electron volt) & are called the gamma rays.

ZXA (unstable nuclei) → ZXA (stable nuclei) + γ

## ^β-decay

^β-decay

In the beta-minus decay, a neutron inside the nucleus transforms into a proton with the emission of an electron and anti-neutrino are emitted.

Note, the spins of the neutron, proton and electron are all 1/2. In the beta-plus decay, a proton inside the nucleus  transforms into a neutron with the emission of a positron and neutrino are emitted.

## ^α-decay

^α-decay

Consider the following decay

As a nucleus decays due to internal force of repulsion, there is no net external force on it, hence in any nuclear reaction linear momentum must be conserved.

Before disintegration, the nucleus can be assumed to be at rest, so the total momentum was zero. After disintegration let it be mava & mD vD for  alpha particle & daughter nuclei respectively. To conserve linear momentum the total vector momentum must still be zero i.e.  mava + mDvD = 0 or mava = -mDvD

i.e. momentum of a particle must be equal & opposite to that of daughter’s nucleus.

In magnitude, mava = mDvD

As mass of alpha particle is much lighter than thorium, thus the lighter α particle carries off most of the energy in the form its KE (about 98% of the total KE).

1.    A heavy unstable nucleus (e.g. Uranium, polonium, radium, thorium, actinium, etc.) disintegrates itself naturally, spontaneously & randomly without being forced by any external agent to do so until it acquires stability.

2.    The disintegration is independent of all physical and chemical conditions and so it can neither be accelerated nor retarded.

3.    The disintegration is random. It is purely a matter of chance for any atom to disintegrate first. It is not possible to predict whether a particular nucleus will decay in a given time interval.

4.    The activity (or rate of disintegration, A or R) of a radioactive sample at any instant is directly proportional to the number of undecayed nuclei present in the sample at that instant.

Here λ = disintegration constant or decay constant. & N0 = no. of the atoms present initially i.e. at t = 0.

From above result we can say

• The number of active nuclei in a radioactive sample decreases exponentially with time.
• The disintegration is fast in the beginning but becomes slower and with the passage of time.
• Irrespective of its nature a radioactive sample will take infinitively long time to disintegrate complete.
• The larger the value of decay constant l the higher is the rate of disintegration.

5. Half life (T):

6. Fraction ‘f’ of substance left undecayed after ‘n’ half lives is given by:

7. Mean life (τ):

8. Decay constant (λ) is the reciprocal of time for which

9. λ = 0 for a stable element (e.g. Pb).

10. (a) 1 Bacqueral (Bq) = 1 d.p.s.

(b) 1 Curie (rd) = 3.7 x 1010 d.p.s.

(c) 1 Rutherford (Rd) = 106 d.p.s.

Here d.p.s. = disintegrations per second.

## ^Binding energy per nucleon

^Binding energy per nucleon

1. is low for both heavy & light nuclei.

2. increases rapidly up to A = 20 & have peaks for 2He4, 6C12 & 8 O16 .

3. increases gradually after A = 20.

4. becomes less or more flat between A = 40 to 120.

Also it has average value in this region is 8.5 MeV.

5. has maximum value 8.8 MeV for the 26Fe56.

6. decrease after A =120 & drops to 7.6Mev for 92U238.

In order to increases the values of binding energies light nuclei undergo fusion while heavy nuclei undergo fission reactions i.e. heavy nuclei become more stable after fission & light nuclei become more stable after fusion.

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