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![No Pembebanan Momen Primer
1
MBA = 1 qL2
12
MAB = MBA
2
MBA = 1 5 qL2
192
MAB = 11 qL2
192
3
MBA = 1 qa2
(3L- 2a)
6L
MAB = MBA
4
MBA = qaLα2
(4 - α )
12
MAB = 1 qaLα (3α2
- 8α + 6 )
12
α = a/L
5
MBA = 1 qb (3L2
- b2
)
24L
MAB = MBA
6
MBA = - (q/L2
)[1
3⁄ L(a2
3
-a1
3
)
- 1
4⁄ (a2
4
– a1
4
)]
MAB = (q/L2
)[1
2⁄ L2
(a2
2
-a1
2
)
- 2
3⁄ L(a2
3
– a1
3
)+ 1
4⁄
(a2
4
– a1
4
)]
∑
M = 0
V = 0
H = 0](https://image.slidesharecdn.com/tabelmomenprimercross-200314072018/85/Tabel-momen-primer-cross-1-320.jpg)
![14
MBA = 1 qa2
(4L- 3a)
12L
MAB = MBA
15
MAB = 1 qL2
[(1 - α2
(2-α )]
12
MBA = MAB
α = a/L
16
MBA = 1 L2
( 2q1 + 3q2 )
60
MAB = L2
( 3q1 + 2q2 )
60
17
MBA = 1 qL2
(1 + α + α2
- 1,5α3
)
30
MAB = qL2
(1 + β + β2
-1,5β3
)
30
α = a/L ; β = b/L
18
MBA = 1 qL2
15
MAB = MBA
19
MBA = 1 qL2
15
MAB = qL2
20
20
MBA = 1 PL
8
MAB = MBA](https://image.slidesharecdn.com/tabelmomenprimercross-200314072018/85/Tabel-momen-primer-cross-3-320.jpg)
Tabel momen primer cross +
- 1. No Pembebanan MomenPrimer 1 MBA = 1 qL2 12 MAB = MBA 2 MBA = 1 5 qL2 192 MAB = 11 qL2 192 3 MBA = 1 qa2 (3L- 2a) 6L MAB = MBA 4 MBA = qaLα2 (4 - α ) 12 MAB = 1 qaLα (3α2 - 8α + 6 ) 12 α = a/L 5 MBA = 1 qb (3L2 - b2 ) 24L MAB = MBA 6 MBA = - (q/L2 )[1 3⁄ L(a2 3 -a1 3 ) - 1 4⁄ (a2 4 – a1 4 )] MAB = (q/L2 )[1 2⁄ L2 (a2 2 -a1 2 ) - 2 3⁄ L(a2 3 – a1 3 )+ 1 4⁄ (a2 4 – a1 4 )] ∑ M = 0 V = 0 H = 0
- 2. 7 MBA = 1qL2 30 MAB = qL2 20 8 MBA = 1 qa3 (5L – 3a) 60L2 MAB = qa2 (3a2 + 10bL ) 60L2 9 MBA = 1 qa3 (5L – 4a ) 20L2 MAB = qa2 (10L2 -5aL+ 8a2 ) 30L2 10 MBA = 1 qa (5L2 +4aL - 4a2 ) 96L MAB = MBA 11 MBA = 1 5qL2 96 MAB = MBA 12 MBA = 1 qL2 32 MAB = MBA 13 MBA = 1 qa2 (2L- a) 24L MAB = MBA
- 3. 14 MBA = 1qa2 (4L- 3a) 12L MAB = MBA 15 MAB = 1 qL2 [(1 - α2 (2-α )] 12 MBA = MAB α = a/L 16 MBA = 1 L2 ( 2q1 + 3q2 ) 60 MAB = L2 ( 3q1 + 2q2 ) 60 17 MBA = 1 qL2 (1 + α + α2 - 1,5α3 ) 30 MAB = qL2 (1 + β + β2 -1,5β3 ) 30 α = a/L ; β = b/L 18 MBA = 1 qL2 15 MAB = MBA 19 MBA = 1 qL2 15 MAB = qL2 20 20 MBA = 1 PL 8 MAB = MBA
- 4. 21 MBA = 1Pba2 L2 MAB = Pab2 L2 22 MBA = 1 Pa (L – a) L MAB = MBA 23 MBA = 1 PL (n2 + 0,5) 12n MAB = MBA n = L/a 24 MBA = Ma(3α - 2) L MAB = Mb(3β - 2) L α = a/L ; β = b/L Pada peletakan jepit sendi dalam table ini kami hanya menggambarkan peletakan sendi jepit seperti :
- 5. - qL2 8 - 9qL2 128 Yangmana arah MAB sendiri adalah searah dengan arah jarum jam sehingga bertanda positif. Sehingga seluruh nilai di table ini bernilai positif, untuk itu jika anda menemukan balok dengan peletakan yang seperti : Yang mana arah MBA sendiri adalah berlawanan dengan arah jarum jam sehingga bertanda negatif maka gunakan nilai table di bawah ini dengan nilai negatif. contoh : momen primer no 1 adalah ; momen primer no 2 adalah ,dst No Pembebanan Momen Primer 1 MAB = qL2 16 2 MAB = 9 qL2 128 3 MAB = 7 qL2 128 4 MAB = qa2 (3L – 2a ) 4L 5 MAB = qa2 (2- α)2 8 α : a/L 6 MAB = qb2 (2- β2 ) 8 β : b/L
- 6. 7 MAB = qb(d2 - c2 )(2L2 - c2- d2 ) 30 8 MAB = 2qL2 30 9 MAB = 7qL2 120 10 MAB = qa2 (3a2 -15aL + 20L2 ) 120L2 11 MAB = qa2 (α2 /5- 3α/4 + 2/3) 2 α : a/L 12 MAB = qb2 (10L2 - 3b2 ) 120L2 13 MAB = qb2 (5L2 + 4aL - 4a2 ) 2 14 MAB = 5qL2 64
- 7. 15 MAB = 3qL2 64 16 MAB= qa2 ( 2L - a ) 8L 17 MAB = qa2 ( 4L - 3a ) 8L 18 MAB = qL2 (1 – α2 )(2 – α) 8 α : a/L 19 MAB = L2 (8q1 + 7q2 ) 120 20 MAB = qL2 (1 + β)(7 – 3β2 ) 120 α : a/L 21 MAB = qL2 10 22 MAB = qL2 12
- 8. 23 MAB = M(2 - 6α + 3α2 ) 2 𝛼 =a/L 24 MAB = 3PL 16 25 MAB = Pb (L2 - b2 ) 2L2 26 MAB = 3Pa (L - a) 2L 27 MAB = PL (n2 - 1) 8n n = 𝐿 𝑎 28 MAB = PL (n2 - 1) 8n n = 𝐿 𝑎 29 MAB = PL (n2 + 0,5) 8n n = 𝐿 𝑎