Static vs Dynamic Equilibrium

Dynamic Equilibrium

Static Equilibrium

This type of equilibrium is reversible in nature.

This type of equilibrium is irreversible in nature.

This equilibrium implies that the reactants and the products are still participating in chemical reactions.

There is no further chemical reaction in the system.

In dynamic equilibrium, the forward and the backward reaction rates are equal

In static equilibrium, the forward and backward reaction rates are zero

It can only occur in closed systems

It can occur in both open and closed systems

(15

                                                   20 = 15V1+20V2               ___________1

Using coefficient of restitution

                                             e =

                                            0.6 =

                                        V2-V1= 0.66

                                        V 2 – V 1 = 3.6

                                  -V 1 + V2= 3.6                           ______________2

Solving 1 & 2

                         15 V1 + 20 V2 = 20

                         -V1 + V2 = 3.6

We get V2= 2.11 m/s (  )

& V1 = - 1.43 m/s ( )

Loss in KE = initial KE- final KE

Loss of K.E. = -

             = (½

= (120+40) – (16.65+44.52)

           = 160 - 60.97

  Loss in K.E = 99.029 joule.

% Loss in K.E = 99.029/160

                          = 61.89%

Given data

Ball 1

M1 = 2kg u1 = 12 m/s

Ball = 2

M2 = 6kg    u = 4 m/s

Ball = 3

M3 = 12 kg   u = 2 m/s

Consider the impact between ball 1 and ball2

For law of conversation of momentum

M1u1 + m2u2 = m1 v1 + m2v2

2*12 + 6*4 = 2v1 +6v2

48= 2v1 +6v2

2v1 + 6v2 = 48 - - - - - - - - - - --  -equation 1

As the balls are perfectly elastic

E= = 1

V2 – v1 = u2 – u1 = 12 -4 = 8

V2 – v1 = 8 - -  - - - - - - - - - - - - - - - -equation 2

Solving equation 1 and 2

V1 = 0 and v2 = 8 m/s

As the ball strike each other ball 1 comes to rest and ball 2 moves forward ball s with new velocity of 8 m/s

U2 = 8 m/s

B)  consider the impact between the ball 2 and 3

     M2 u2 + m3 u3 = m2v2 + m3v3

      6* 8 + 12*2 = 6V2 + 12v3

      6V2 + 12 v3 = 72 ---------------- equation 3

 perfectly elastic balls

e = 1 = =

-V2 + v3 = 6 ------------------------ equation 4

Solving equation 3 and 4 we get

V2 = 0      and v3 =6 m/s

Ball – A  

Using law of conservation of momentum along direction

(4) + ( 8

                                            6.928 + (-16) = -

 - = -9.072                - - - - - - - -----1

Coefficient of restitution,

                                         e = 0.8

 0.8 = VB X + VA X /

VB X + VA X= 2.986                              ---------------------2

Solving 1 & 2 we get

VB X = 0.239 m/s

 VA X= 2.746 m/s

Similarly, now component of velocity before and after the impact is conserved i.e. remain constant along the common tangent

V AY     =   UAY        =    = 1 m/s

V BY= U B Y         =4    =  3.46 m/s

  =    = 2.92 m/s

== 3.468 m/s               

=20

= 086.05

½ (0.02+0.3) ]

-9=  - 0.16

V = 7.5 m/s                   - ------ put this is in equation 1

0.02 u 1 = 0.32 v1 = 0.327.5

U 1 = 120 m/s           - - - - -speed of the bullet as it strikes the block

 1) constant   force   →   constant   acceleration =a
=V5​−v0 / t ​​= a

=V5​−0​/ 5=a

=V5​=5a
⇒K.E​5=​mV2​=25/2 ma2

 2) v10​−v0/t ​​=a

⇒v10​=10a

⇒K.E10​=100/2 ​ma2
So  K.E  gained  between  5s  and  10s  =K.E10​−K.E5​
=75/2 ​ma2
K.E  gained  in  5s=25/2 ​ma2
= Ratio =25/75 ​=1:3