= )t(xn =×= mol10.3210.245,2x

ﺔﻴﺒﻌﺸﻟﺍ ﺔﻴﻁﺍﺭﻘﻤﻴﺩﻟﺍ ﺔﻴﺭﺌﺍﺯﺠﻟﺍ ﺔﻴﺭﻭﻬﻤﺠﻟﺍ

ﺔﻴﻨﻁﻭﻟﺍ ﺔﻴﺒﺭﺘﻟﺍ ﺓﺭﺍﺯﻭ

ﺩﻌﺒ ﻥﻋ ﻥﻴﻭﻜﺘﻟﺍ ﻭ ﻡﻴﻠﻌﺘﻠﻟ ﻲﻨﻁﻭﻟﺍ ﻥﺍﻭﻴﺩﻟﺍ

ﺽﺭﻓ ﺔﺒﺎﺠﺇ ﻡﻴﻤﺼﺘ ﺔﺒﻗﺍﺭﻤﻟﺍ

ﺔﻴﺴﺍﺭﺩﻟﺍ ﺔﻨﺴﻟﺍ

: – 2010 2011

ﻯﻭﺘﺴﻤﻟﺍ :

ﻱﻭﻨﺎﺜ 3 ﺔﺒﻌﺸﻟﺍ

: ﺕﺎﻴﻀﺎﻴﺭ

ﺓﺩﺎﻤﻟﺍ : ﻡﻭﻠﻋ ﺔﻴﺌﺎﻴﺯﻴﻓ ﺕﺎﺤﻔﺼﻟﺍ ﺩﺩﻋ

: 5

ﺩﺍﺩﻋﺇ : ﻰﻔﻁﺼﻤ ﺱﺎﺒﻋ /

ﻱﻭﻨﺎﺜﻟﺍ ﻡﻴﻠﻌﺘﻟﺍ ﺫﺎﺘﺴﺃ

لﻭﻷﺍ ﻥﻴﺭﻤﺘﻟﺍ :

) ﻁﺎﻘﻨ 4 (

– 1 ﻡﺩﻘﺘﻟﺍ لﻭﺩﺠ لﺎﻤﻜﺇ :

...

. ...

0.25 لﻋﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤ

2 H2O2(aq) = O2(g) + 2 H2O(l)

ﺔﻟﺎﺤﻟﺍ

ﻡﺩﻘﺘﻟﺍ mol ـﻟﺎﺒ ﺓﺩﺎﻤﻟﺍ ﺔﻴﻤﻜ

ﺔﻴﺌﺍﺩﺘﺒﻻﺍ ﺔﻟﺎﺤﻟﺍ

^{0 CV 0} ﺓﺩﺎﻴﺯﻟﺎﺒ

ﺔﻴﻁﺴﻭ ﺔﻟﺎﺤ

^{x CV – 2 x x} ﺓﺩﺎﻴﺯﻟﺎﺒ

ﺔﻴﺌﺎﻬﻨ ﺔﻟﺎﺤ

^{xf CV – 2 xf xf} ﺓﺩﺎﻴﺯﻟﺎﺒ

– 2 ﻲﻤﻅﻋﻷﺍ ﻡﺩﻘﺘﻟﺍ ﺔﻤﻴﻗ :

ﺎﻨﻴﺩﻟ ﻡﺩﻘﺘﻟﺍ لﻭﺩﺠ ﻥﻤ :

0 x 2 CV− = ﻪﻨﻤ ﻭ

: mol 10

. 2 3

10 . 24 5 ,

x_max 2 ^{3 −2}

− =

= × ...

0.5

– 3 ﺎﻨﻴﺩﻟ ﻡﺩﻘﺘﻟﺍ لﻭﺩﺠ ﻥﻤ :

) t ( x nO2 =

:ﻪﻨﻤ ﻭ

M O

V ) V t (

x = ²

...

...

...

0.25

– II

– 1 لﻭﺩﺠﻟﺍ لﺎﻤﻜﺇ ... :

...

...

0.5

t (min) 0 5 10 15 20 25 30 35 40 60

x ( t ) (mmol ) 0,00 6,67 11,25 15,00 18,33 20,83 22,50 24,58 24,42 28,33

– 2 ﻥﺎﻴﺒﻟﺍ ﻡﺴﺭ ...

0.5

– 3 ﺌﺎﻬﻨﻟﺍ ﻡﺩﻘﺘﻟﺍ ﺎﻬﻴﻓ لﺼﻴ ﻲﺘﻟﺍ ﺔﻅﺤﻠﻟﺍ ﻲﻫ لﻋﺎﻔﺘﻟﺍ ﻑﺼﻨ ﻥﻤﺯ ﻲ

xf

ﺔﻴﺌﺎﻬﻨﻟﺍ ﻪﺘﻤﻴﻗ ﻑﺼﻨ ﻰﻟﺇ .

...

0.25

ﺩﺠﻨ ﻥﺎﻴﺒﻟﺍ ﻥﻤ :

t ½ = 15 min .

...

...

...

0.25

– 4 ﻲﻫ لﻋﺎﻔﺘﻟﺍ ﺔﻋﺭﺴ ﺓﺭﺎﺒﻋ dt :

v= dx ...

...

...

...

0.25

ﺭﺨﻷ ﺔﻅﺤﻟ ﻥﻤ ﺹﻗﺎﻨﺘﺘ ﺔﻋﺭﺴﻟﺍ ﻩﺫﻫ ﻯ

ﺔﻅﺤﻟ ﻥﻤ ﺹﻗﺎﻨﺘﻴ ﻰﻨﺤﻨﻤﻠﻟ ﺱﺎﻤﻤﻟﺍ لﻴﻤ ﻥﻷ

ﻯﺭﺨﻷ ...

...

. ..

...

0.25

– 5 ﺔﻋﺭﺴﻟﺍ ﺏﺎﺴﺤ

ﺔﻅﺤﻠﻟﺍ ﻲﻓ ﻰﻨﺤﻨﻤﻠﻟ ﺱﺎﻤﻤﻟﺍ ﻙﺴﺭﻨ t = 20 min

....

...

...

...

...

...

0.25

ﺩﺠﻨﻓ ﻪﻠﻴﻤ ﺏﺴﺤﻨ ﻡﺜ min

/ mmol 57 , dt 0

v dx

min 20 t

⎟ =

⎠

⎜ ⎞

⎝

=⎛ ... =

0.25

/2

8

– 6 ﺭﺭﺒﻴ ﻱﺫﻟﺍ ﻲﻜﺭﺤﻟﺍ لﻤﺎﻌﻟﺍ ﺘ ﻲﺘﻟﺍ ﺔﻴﻔﻴﻜﻟﺍ

ﺭﻭﻁﺘ ﺎﻬﺒ ﻭﻫ ﺔﻋﺭﺴﻟﺍ :

ﻲﻓ ﺓﺭﻴﺨﻷﺍ ﻩﺫﻫ ﻥﺃ ﺙﻴﺤ ﺔﻴﻟﻭﻤﻟﺍ ﺯﻴﻜﺍﺭﺘﻟﺍ

ﺭﻤﺘﺴﻤ ﺹﻗﺎﻨﺘ .

..

...

...

...

0.25

– 7 ﺔﻴﺌﺎﻬﻨﻟﺍ ﺔﻟﺎﺤﻟﺍ ﻰﻟﺇ لﻭﺼﻭﻟﺎﺒ ﺢﻤﺴﻴ ﻲﺌﺎﻴﻤﻴﻜ ﺩﺭﻓ ﻭﻫ ﻁﻴﺴﻭﻟﺍ ﺔﻴﺌﺎﻴﻤﻴﻜﻟﺍ ﺔﻠﻤﺠﻠﻟ

ﻉﺭﺴﺃ لﻜﺸﺒ ﻲﻓ ﺭﻬﻅﻴ ﻥﺃ ﻥﻭﺩ

ﻥﻋ ﺭﺒﻌﺘ ﻲﺘﻟﺍ ﻲﺌﺎﻴﻤﻴﻜﻟﺍ لﻋﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤ ﺔﻠﻤﺠﻠﻟ ﻲﺌﺎﻴﻤﻴﻜﻟﺍ لﻭﺤﺘﻟﺍ

.

– 8 ﺍ ﺔﺒﺎﺠﻹﺍ ﻲﻫ ﺔﺤﻴﺤﺼﻟ

: – ﻰﻟﺇ لﺼﻨ ﻲﺌﺎﻬﻨﻟﺍ ﻡﺩﻘﺘﻟﺍ

ﻉﺭﺴﺃ لﻜﺸﺒ ﻱﺃ لﻗﺃ ﺕﻗﻭ ﻲﻓ ....

0.25

ﻲﻨﺎﺜﻟﺍ ﻥﻴﺭﻤﺘﻟﺍ :

) ﻁﺎﻘﻨ 4 (

– 1 ﺍﺫﻫ ﻭ ﺎﻬﻨﻤ ﺭﺍﺭﻘﺘﺴﺍ ﺭﺜﻜﺃ ﻥﻭﻜﺘ ﻯﺭﺨﺃ ﺓﺍﻭﻨ ﻲﻁﻌﺘﻟ ﺎﻴﺌﺎﻘﻠﺘ ﻙﻜﻔﺘﻟﺍ ﺎﻬﻨﺎﻜﻤﺈﺒ ﺓﺭﻘﺘﺴﻤ ﺭﻴﻏ ﺓﺍﻭﻨ ﻲﻫ ﺔﻌﺸﻤﻟﺍ ﺓﺍﻭﻨﻟﺍ

ﻉﺎﻌﺸﺇ ﺙﺒﺘ ﺎﻤﺩﻌﺒ .

...

....

....

...

...

...

0.25

– 2 ﺎﻤﻫ ﻲﻋﺎﻌﺸﺍ ﻁﺎﺸﻨ ﺔﻟﺩﺎﻌﻤ ﺔﺒﺎﺘﻜﺒ ﻥﺎﺤﻤﺴﻴ ﻥﺍﺫﻠﻟﺍ ﻥﺎﻨﻭﻨﺎﻘﻟﺍ :

. ...

0.25

– ﻲﻠﺘﻜﻟﺍ ﺩﺩﻌﻟﺍ ﻅﺎﻔﺤﻨﺍ ﻥﻭﻨﺎﻗ .A

– ﻲﻨﺤﺸﻟﺍ ﺩﺩﻌﻟﺍ ﻅﺎﻔﺤﻨﺍ ﻥﻭﻨﺎﻗ . Z

ﻲﻫ ﻱﻭﻭﻨﻟﺍ ﻙﻜﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤ :

Th He

U ⁴₂ ²³⁴ ₉₀

23892 → + .

...

...

...

0.25

– II

– 1 ﻲﻋﺎﻌﺸﻹﺍ ﻁﺎﺸﻨﻟﺍ ﺔﻟﺩﺎﻌﻤ :

e Pa Th ²³⁴₉₁ ⁰₁

23490

→ +−

. ...

...

...

0.25

– 2 ﻭﻫ ﻁﺎﺸﻨﻟﺍ β ^–

. . ...

...

. ...

0.25

– III ﺕﻻﻭﺤﺘﻟﺍ ﺩﺩﻋ ﻭﻫ α

ﺕﻻﻭﺤﺘﻟﺍ ﺩﺩﻋ ﻭ 8 ﻭﻫ β

6 . ...

...

...

0.25

– IV

– 1 ﺃ / ﺩﺠﻨ ﻥﺎﻴﺒﻟﺍ ﻥﻤ :

N_U(0) = 5.10 ¹² Noyaux

. ...

...

...

0.25

ﺏ / ﺔﻅﺤﻠﻟﺍ ﻲﻓ ﻰﻨﺤﻨﻤﻠﻟ ﺱﺎﻤﻤﻟﺍ ﻡﺴﺭﺒ ﻩﺩﺠﻨ ﻥﻤﺯﻟﺍ ﺕﺒﺎﺜ t = 0

ﺭﻭﺤﻤ ﻊﻤ ﺱﺎﻤﻤﻟﺍ ﻊﻁﺎﻘﺘ ﺔﻁﻘﻨ ﺔﻠﺼﺎﻓ ﻭ

ﻥﻤﺯﻟﺍ ﺕﺒﺎﺜ لﺜﻤﻴ ﺔﻨﻤﺯﻷﺍ . τ

ﺩﺠﻨ ﻥﺎﻴﺒﻟﺍ ﻥﻤ :

τ = 6,5.10⁹ ans .

. ...

...

...

...

0.25

ﺞﺘﻨﺘﺴﻨ ﻪﻨﻤ ﻭ :

1 10ans 10 . 5 ,

1 1 _{− −}

=

= τ . λ

– 2 ﺔﻴﻠﻀﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤﻟﺍ ﺓﺭﺎﺒﻋ

0 ) t ( N dt .

) t ( dN

U + λ U =

. ...

...

0.25

ﻭﻫ ﺔﻟﺩﺎﻌﻤﻟﺍ ﻩﺫﻫ ﻪﻠﺒﻘﺘ ﻱﺫﻟﺍ لﺤﻟﺍ :

) t.

exp(

).

0 ( N ) t (

N_U = _U −λ

. . ..

. ...

0.25

– 3 ﺍ ﺔﻴﻭﻨﻷﺍ ﺩﺩﻋ ﺔﻅﺤﻠﻟﺍ ﻲﻓ ﺓﺩﺠﺍﻭﺘﻤﻟﺍ ﺔﻌﺸﻤﻟ

t = 1,5.10 ⁹ ans ﻭﻫ

:

Noyau 10

. 4 ) 10 . 5 , 1 10

. 5 , 1 exp(

. 10 . 5 ) t (

N_U = ¹² − ⁻¹⁰× ⁹ = ¹²

. ...

0.25

– 4 ﻲﻓ ﺓﺩﻭﺠﻭﻤ ﺕﻨﺎﻜ ﻲﺘﻟﺍ ﺔﻌﺸﻤﻟﺍ ﺔﻴﻭﻨﻷﺍ ﺔﻴﻤﻜ ﻑﺼﻤ ﻙﻜﻔﺘﺘ ﻲﻜﻟ ﺔﻤﺯﻼﻟﺍ ﺔﻴﻨﻤﺯﻟﺍ ﺓﺩﻤﻟﺍ ﻲﻫ ،ﺭﻤﻌﻟﺍ ﻑﺼﻨ ﻥﻤﺯ

ﺔﻴﺌﺍﺩﺘﺒﻻﺍ ﺔﻅﺤﻠﻟﺍ .

. ...

...

....

...

0.25

ﺔﻅﺤﻠﻟﺍ ﻲﻓ t ½

ﺔﻗﻼﻌﻟﺍ ﻕﻘﺤﺘﺘ 2

) 0 t ( ) N

t (

N_{U 1/2} = ^U =

. ...

. ...

0.25

ﺩﺠﻨ ﻥﺎﻴﺒﻟﺍ ﻥﻤ :

t _½ = 4,5.10⁹ ans ﻥﺎﻴﺒﻟﺍ ﻰﻠﻋ ﻥﻴﺒﻤ ﻭﻫ ﺎﻤﻜ

. ...

0.25

– 5 ﺃ / ﻲﻫ ﺔﻗﻼﻌﻟﺍ :

) Terre ( N ) Terre ( N ) 0 (

N_U = _U + _Pb

. ...

0.25

ﺩﺠﻨ ﻪﻨﻤ ﻭ :

) Terre ( N ) 0 ( N ) Terre (

N_U = _U − _Pb

.

ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :

Noyaux 10

. 5 , 2 10 . 5 , 2 10 . 5 ) Terre (

N_U = ¹² − ¹² = ¹²

.

ﺏ / ﻥﺃ ﺞﺘﻨﺘﺴﻨ ﻪﻨﻤ ﻭ t_Terre = 4,5.10⁹ ans

. . ...

....

...

0.25

ﺙﻟﺎﺜﻟﺍ ﻥﻴﺭﻤﺘﻟﺍ :

) ﻁﺎﻘﻨ 4 (

– 1 لﻴﺜﻤﺘ ﺓﺭﺍﺩﻟﺍ ﻲﻓ ﻲﺌﺎﺒﺭﻬﻜﻟﺍ ﺭﺎﻴﺘﻟﺍ ﺔﻬﺠ ...

0.25

– 2 ﺕﺍﺭﺘﻭﺘﻟﺍ ﻡﻬﺴﺃ لﻴﺜﻤﺘ ...

...

...

...

. 0.25

– 3 ﺔﻔﺜﻜﻤﻟﺍ ﻲﻓﺭﻁ ﻥﻴﺒ ﻲﺌﺎﺒﺭﻬﻜﻟﺍ ﺭﺘﻭﺘﻟﺍ ﺭﻭﻁﺘ لﺜﻤﻴ ﻱﺫﻟﺍ ﻥﺎﻴﺒﻟﺍ .

...

....

...

0.5

– 4 ﺔﻔﺜﻜﻤﻟﺍ ﻲﻓﺭﻁ ﻥﻴﺒ ﺭﺘﻭﺘﻟﺍ ﺎﻬﻘﻘﺤﻴ ﻲﺘﻟﺍ ﺔﻴﻠﻀﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤﻟﺍ :

ﺓﻭﺭﻌﻟﺍ ﻥﻭﻨﺎﻗ ﺏﺴﺤ :

E = uAB + uBD

. ...

...

...

0.25

ﺭﺘﻭﺘﻟﺍ ﺽﻭﻌﻨ u_AB = Ri

ﻰﻟﺇ لﺼﻨﻓ ﻪﺘﺭﺎﺒﻌﺒ :

BD uBD

dt RCdu

E= +

ﻰﻠﻋ ﻥﻴﻓﺭﻁﻟﺍ ﻡﺴﻘﻨ ﺔﻴﻠﻀﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤﻟﺍ ﻰﻟﺇ لﺼﻨﻓ RC

RC : u dt du RC

E _{BD BD}

+ . =

. ...

0.25

– 5 ﺔﻟﺍﺩﻟﺍ ﻕﺘﺸﻨ u_BD = E ( 1 – exp ( - t / τ ))

ﺔﻟﺍﺩﻟﺍ ﻕﺘﺸﻤ ﻭ ﺔﻟﺍﺩﻟﺍ ﻥﻤ لﻜ ﺔﻴﻠﻀﺎﻔﺘﻟﺍ ﺔﻟﺩﺎﻌﻤﻟﺍ ﻲﻓ ﺽﻭﻌﻨ ﻡﺜ

ﺩﺠﻨﻓ :

)) / t exp(

1 RC( )) E / t Eexp(

RC (

E − τ + − − τ

= τ ...

..

. ....

...

0.25

ﻰﻟﺇ لﺼﻨ ﻪﻨﻤ ﻭ :

E E E

E = − τ + − − τ

uBD

t

ﺩﻌﺒ لﺍﺯﺘﺨﻻﺍ ﻰﻟﺇ لﺼﻨ

:

) / t RCexp(

) E / t Eexp(

0 − τ − − τ

= τ

ﻥﻭﻜﻴ ﻥﺃ ﺏﺠﻴ ﺍﺫﻫ ﻕﻘﺤﺘﻴ ﻲﻜﻟ τ = RC

. ...

...

...

0.25

– 6 ﺏﺴﺎﻨﺘﻴ ﺔﻤﻭﺎﻘﻤﻟﺍ ﻊﻤ ﺎﻴﺩﺭﻁ τ

. R .

...

...

...

0.25

– 7

ﺃ / لﻭﺩﺠﻟﺍ لﺎﻤﻜﺇ :

...

...

..

...

...

0.25

R ( Ω ) 100 200 300 400 500

τ ( ms ) 10 20 30 40 50

ﺏ / ﻥﺎﻴﺒﻟﺍ ﻡﺴﺭ :

...

...

...

0.5

/ ـﺟ ﻥﺎﻴﺒﻟﺍ لﻴﻤ لﺜﻤﺘ ﺔﻔﺜﻜﻤﻟﺍ ﺔﻌﺴ :

µF ) 100

0 400 (

10 ) 0 40 C (

3 =

−

×

= − ⁻

. ...

...

...

0.25

ﺩ / ﺔﻔﺜﻜﻤﻟﺍ ﻲﻓ ﺔﻨﺯﺨﻤ ﻥﻭﻜﺘ ﻲﺘﻟﺍ ﺔﻗﺎﻁﻟﺍ ﺔﻅﺤﻠﻟﺍ ﻲﻓ

t = τ .

ﻲﻫ ﺔﻗﺎﻁﻟﺍ ﺓﺭﺎﺒﻋ

2 : CuBD

2 ) 1 C (

E =

. ...

...

...

..

..

...

...

0.25

ﺔﻅﺤﻠﻟﺍ ﻲﻓ

t = τ ﻲﻫ ﺔﻔﺜﻜﻤﻟﺍ ﻲﻓﺭﻁ ﻥﻴﺒ ﺭﺘﻭﺘﻟﺍ ﺔﻤﻴﻗ :

V 78 , 3 6 63 , 0

u_BD = × = .

...

. 0.25

ﺩﺠﻨﻓ لﺼﻨﻓ ﺔﻗﺎﻁﻟﺍ ﺓﺭﺎﺒﻋ ﻲﻓ ﺽﻭﻌﻨ :

J 10 . 1 , 7 78 , 3 10 . 2 100 ) 1

C (

E = × ⁻⁶× ³= ⁻⁴

. . ..

. 0.25

ﻊﺒﺍﺭﻟﺍ ﻥﻴﺭﻤﺘﻟﺍ :

) ﻁﺎﻘﻨ 4 (

– 1 ﺓﺭﺎﺒﻌﻟﺍ

→ :

→ = ⋅ ⋅ ⋅u

r M G M

FS/T ^S ₂ ^T

. ...

...

...

..

0.5

– 2 ﻴﻠﻴﻬﻟﺍ ﻊﺠﺭﻤﻟﺍ ﻲﻓ ﺽﺭﻷﺍ ﺔﻜﺭﺤ ﺱﺭﺩﻨ ﻭ

ﻱﺯﻜﺭﻤ .

ﻥﻭﻨﺎﻘﻟﺍ ﻥﺘﻭﻴﻨﻟ II

→ :

→= ⋅

∑

. ..

....

0.5

ﻪﻨﻤ ﻭ

→

→FS/T = m⋅a .

...

...

...

0.25

– 3 ﺎﻨﻴﺩﻟ

→

→F_S/T =m⋅a ﻙﻟﺫﻜ ﻭ

→

→ ⋅ ⋅

⋅

= u

r M G M

FS/T ^S ₂ ^T

ﺩﺠﻨ ﻥﻴﺘﺭﺎﺒﻌﻟﺍ ﻥﻤ

→ :

→= ⋅ ⋅ u r G M

a ₂^S

. ...

...

. ...

...

. 0.5

لﻴﺜﻤﺘﻟﺍ . :

...

...

...

0.25

– 4 ﻲﻫ ﺓﺭﺎﺒﻌﻟﺍ r :

a= v² .

. ...

...

...

0.25

– 5 ﻥﺃ ﻡﻠﻌﻨ

2 S

r G M a = ⋅ ﻙﻟﺫﻜ ﻭ

r a v

= 2

. ...

0.25

ﺩﺠﻨ ﺓﺍﻭﺎﺴﻤﻟﺍ ﺩﻌﺒ r :

v = GM^S .

. ...

..

...

0.25

ﺔﻋﺭﺴﻟﺍ ﺔﻤﻴﻗ ﺏﺎﺴﺤ

11 :

30 11

10 . 5 , 1

10 . 98 , 1 10

. 67 ,

v= 6 ⁻ ×

ﻪﻨﻤ ﻭ : Km/s 30 s / m 10 . 97 , 2

v= ⁴ ≈

. . ...

..

...

0.25

– 6 v

r 2

T 2 π⋅

ω =

= π . ...

..

...

..

0.25

– 7 ﺩﺠﻨﻓ ﺔﻘﺒﺎﺴﻟﺍ ﺔﻗﻼﻌﻟﺍ ﻲﻓ ﺔﻋﺭﺴﻟﺍ ﺔﻤﻴﻗ ﺓﺭﺎﺒﻋ ﺽﻭﻌﻨ :

r GM

r 2 T 2

S

⋅

= π ω

= π ﻰﻟﺇ لﺼﻨ ﻪﻨﻤ ﻭ :

MS

G r

T 2 ²

3

⋅

⋅ π

= ⋅ ...

. ..

0.5

ﺔﻤﻴﻗ ﺏﺎﺴﺤ : T

ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :

T = 363,4 J .

. ...

0.25

→a

ﻥﻴﺭﻤﺘﻟﺍ ﺱﻤﺎﺨﻟﺍ

: ) ﻁﺎﻘﻨ 4 (

– 1 ﺭﺎﺒﻌﺒ ﻰﻁﻌﺘ ﺭﻭﺩﻟﺍ ﻪﺒﺸ ﺔﻤﻴﻗ ﻲﺘﺍﺫﻟﺍ ﺭﻭﺩﻟﺍ ﺓ

:

LC 2

T= π ...

0.25

ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :

ms 4 , 1 T= ...

0.25

ﻲﺘﺍﺫﻟﺍ ﺭﺘﺍﻭﺘﻟﺍ ﺔﻤﻴﻗ ﻥﻭﻜﺘ ﻙﻟﺫﺒ ﻭ :

Hz 3 , T 714 f₀ = 1 = ...

0.25

– 2

ﺃ / ﺔﻴﺫﻐﺘﻟﺍ ﺭﺘﺍﻭﺘ ﻥﺃ ﺎﻤﺒ ﻲﺘﺍﺫﻟﺍ ﺭﺘﺍﻭﺘﻟﺍ ﻱﻭﺎﺴﻴ f

f₀ ﺓﺭﺍﺩﻠﻟ ﻲﺌﺎﺒﺭﻬﻜ ﺏﻭﺎﺠﺘ ﺎﻬﻴﻓ ﺙﺩﺤﻴ ﺓﺭﺍﺩﻟﺍ ﻥﺈﻓ RLC

..

0.25

ﺏ / ﺔﻗﻼﻌﻟﺍ ﻕﻘﺤﺘﺘ ﺏﻭﺎﺠﺘ ﺔﻟﺎﺤ ﻲﻓ :

R z= ...

0.25

ﺩﺠﻨ ﻪﻨﻤ ﻭ :

Ω

=10 ... z

...

0.5

/ ـﺟ ﻥﺃ ﻡﻠﻌﻨ :

0 0 z.I U = ...

0.5

ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :

V

73 , 0 U₀ = ...

0.25

ﺩ / ﻥﻭﻜﻴ ﺏﻭﺎﺠﺘ ﺔﻟﺎﺤ ﻲﻓ ﺓﺭﺍﺩﻟﺍ ﻥﻭﻜﺘ ﺎﻤﻟ s

0 t= . ∆

ﻥﺃ ﻡﻠﻌﻨ

( )

f f U

Q U ⁰

0 C 0

= ∆ . =

. ...

...

...

0.5

ﺞﺘﻨﺘﺴﻨ ﻪﻨﻤ ﻭ :

( )

... ∆ 0.5

ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :

Hz

8 , 34 f = ... ∆ 0.5

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