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 ,
xmax 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 :
NU(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 (
NU = 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 (
NU = 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 (
NU 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 (
NU = U + Pb
. ...
0.25
ﺩﺠﻨ ﻪﻨﻤ ﻭ :
) Terre ( N ) 0 ( N ) Terre (
NU = U − Pb
.
ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :
Noyaux 10
. 5 , 2 10 . 5 , 2 10 . 5 ) Terre (
NU = 12 − 12 = 12
.
ﺏ / ﻥﺃ ﺞﺘﻨﺘﺴﻨ ﻪﻨﻤ ﻭ tTerre = 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 uAB = 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 uBD = 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
uBD = × = .
...
. 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
→ :
→= ⋅
∑
F m a. ..
....
0.5
ﻪﻨﻤ ﻭ
→
→FS/T = m⋅a .
...
...
...
0.25
– 3 ﺎﻨﻴﺩﻟ
→
→FS/T =m⋅a ﻙﻟﺫﻜ ﻭ
→
→ ⋅ ⋅
⋅
= u
r M G M
FS/T S 2 T
ﺩﺠﻨ ﻥﻴﺘﺭﺎﺒﻌﻟﺍ ﻥﻤ
→ :
→= ⋅ ⋅ u r G M
a 2S
. ...
...
. ...
...
. 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 = GMS .
. ...
..
...
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 :
( )
UC00 f0 f = U... ∆ 0.5
ﻲﻁﻌﻴ ﻱﺩﺩﻌﻟﺍ ﻕﻴﺒﻁﺘﻟﺍ :
Hz
8 , 34 f = ... ∆ 0.5
/8 8