3 formulario para_vigas_y_porticos

3
FORMULARIO PARA
VIGAS Y PÓRTICOS

3.1

Formulario para vigas y pórticos

3.1 Obtención de la Distribución de Solicitaciones mediante la
Formulación de Macaulay
Las Funciones de Macaulay permiten expresar tanto la distribución de cargas
sobre una viga sometida a flexión como las leyes de Cortantes o Momentos
Flectores generadas por dichas cargas. A continuación se muestra la expresión de tales funciones y las condiciones en las que deben aplicarse.

q( x) = ∑

A⋅ x − a

T ( x ) = −∑

( c− 2 )

A⋅ x − a

M( x ) = − ∑

( c − 2 )!
( c −1)

( c − 1) !
A⋅ x − a

c

c!

ecuaciones validas solo si n ≥ 0
en las expresiones

x−a

n

n>0

x−a

0

=0

x−a

0

=1

x≤a

x−a

n

=0

x≥a

y si

n=0

x≤a
x≥a

si

x−a

n

= ( x − a)

n

En la siguientes tablas se particularizan estas funciones para cada caso de
carga y se indica el valor que deberían tomar los parámetros A y c en la ecuación general previamente indicada.

3.2

Prontuario para Cálculo de Estructuras

M

Si
x≤a

a

x≥a

x

x−a

0

=0

x−a

0

=1

entonces

M(x)

M( x ) = − M x − a

0

A=M
c=0

por lo tanto

P
Si

a

T(x)

1

x≤a

x

x−a = 0

x≥a

x − a = ( x − a)
1

1

entonces
T ( x) = − P x − a

M(x)

0

M( x ) = − P x − a
por lo tanto

1

A=P
c =1

3.3

Limitación de las Deformaciones

Si
x≤a

q

x≥a

x−a
x−a

2

2

=0

= ( x − a)

2

a
entonces

x

q( x) = q x − a

0

q
1
x−a
1
q
M( x ) = −
x−a
2 ⋅1

T(x)

T ( x) = −
2

M(x)

por lo tanto

q

x

T(x)

M(x)

A=q
c=2

Si
x≤a

x−a

x≥a

d

a

2

3

x−a

3

=0

= ( x − a)

entonces
2

3

qd
1
x−a
1
qd
2
T ( x) = −
x−a
2 ⋅1
qd
M( x ) = −
x−a
3 ⋅ 2 ⋅1

q( x) =

por lo tanto

3

q
d
c=3
A=

3

3.4


Otros casos de carga que se resuelven por superposición de los anteriores

q

q
 −〈 x-a〉 2 + 〈 x-b〉 2 

2! 
dM( x )

M(x) =

a

T ( x) =

b

dx

x
q/d
q
a

d

T ( x) =

b

q/d
q
-〈 x-a〉 3 + 〈 x-b〉 3  + 〈 x-b〉 2
 2!
3! 
dM( x )

M( x ) =

dx

x

q/d
q
a

q
q/d
 〈 x-a〉 3 − 〈 x-b〉 3 
〈 x-a〉 2 +

2!
3! 
dM( x )

M(x) = −
d

T ( x) =

b

dx

x

qb

qa

M(x) = −
+

a

d
b

T ( x) =

x

qa

qb

b
x

T ( x) =

)

q b − q a /d
3!

qb
2!

〈 x-b〉 2 +

 −〈 x-a〉 3 + 〈 x-b〉 3 



dx

M(x) = −

d

2!

〈 x-a〉 2 +

dM( x )

+
a

(

qa

qa
2!

(q

a

〈 x-a〉 2 +

)

− q b /d
3!

dM( x )
dx

qb
2!

〈 x-b〉 2 +

 〈 x-a〉 3 − 〈 x-b〉 3 



VIGA APOYADA EN LOS EXTREMOS

3.2.1

REACCIONES
P⋅b
RA =
L

RB =

B

C

P⋅a
L

x

ESFUERZOS CORTANTES
P⋅b
P⋅a
= cte ; QCB = −
= cte
QAC =
L
L
MOMENTOS FLECTORES
P⋅b
P⋅a
⋅ x ; MCB =
⋅ ( L − x)
MAC =
L
L
ANGULOS DE GIRO
P⋅a⋅b
⋅ ( L + b)
ϕA =
6⋅E⋅I⋅L

P

A

CARGA PUNTUAL EN LA VIGA

a

b


3.2

L
;

Mmax = MC =

P⋅a⋅b
⋅ ( L + a)
; ϕB = −
6⋅E⋅I⋅L

P⋅a⋅b
L

para

x0 = a

P⋅a⋅b
⋅ ( b − a)
; ϕC =
3⋅E⋅I⋅L

QB
QA

ECUACION DE LA ELASTICA
y

AC =

P ⋅ L ⋅ b ⋅ x  b2 x 2 
⋅ 1− 2 − 2 
6⋅E⋅I 
L
L 

;

y

CB =

2
P ⋅ L ⋅ a ⋅ ( L − x )  a2  L − x  

⋅ 1− 2 − 
 

6⋅E⋅I
L  L  


FLECHA MAXIMA
fC =

P⋅b
9⋅ E ⋅I ⋅ L 3

(

⋅ L2 − b2

)

3

2

para x =

L2 − b2
3

3.5

M max

3.6

3.2.2

CARGA CONTÍNUA EN PARTE DE LA VIGA

REACCIONES
p⋅b⋅c
RA =
L

c
RB =

P

p⋅a⋅c
L

A

ESFUERZOS CORTANTES
p⋅b⋅c
p⋅b⋅c
c

− p⋅ − a + x
; QCD =
QAC =
2
L
L



;

QDB = −

C

p⋅a⋅c
L

a

x0 = a −

para

; ϕB = −

c b⋅c
+
L
2

p⋅a⋅b⋅c 
c2 
⋅L + a−

6⋅E⋅I⋅L 
4⋅b

QB
QA


p⋅b⋅c x  2
c2  
y AC =
⋅
− x + a ⋅  L + b −

6⋅L E⋅I 
4 ⋅ a 



=

4
  

p
c 
c2  
⋅  L ⋅  x −  a −  − 4 ⋅ b ⋅ c ⋅ x3 + 4 ⋅ a ⋅ b ⋅ c ⋅  L + b −
⋅ x
24 ⋅ E ⋅ I ⋅ L   
2 
4⋅a 




=


p⋅a⋅c L − x 
c2  
2
⋅
⋅ − ( L − x ) + b ⋅  L + a −

6⋅L
4 ⋅ a 
E⋅I 




y

CD

y

DB

M max


ANGULOS DE GIRO
p⋅a⋅b⋅c 
c2 
⋅L + b −
ϕA =

6⋅E⋅I⋅L 
4⋅a

b
L

MDB =
Mmax

D

x

MOMENTOS FLECTORES
p⋅b⋅c
p⋅b⋅c
p  
c 
⋅ x ; MCD =
⋅ x − ⋅  x −  a −  2
MAC =
2  
2 
L
L

p⋅ a⋅c
⋅ ( L − x)
L
p⋅b⋅c 
b⋅c
=
⋅ 2⋅a− c+
L 
2⋅L 



B

CARGA TRAPEZOIDAL EN TODA LA VIGA

REACCIONES
1
RA = ( 2 ⋅ p1 + p2 )
6

;

RB =

1
( p1 + 2 ⋅ p2 ) .
6

P
1

ESFUERZOS CORTANTES
p ( 3 ⋅ L − x ) + p2 ⋅ x 2
QA = RA ; Qx = RA − 1
⋅x
6⋅L

;

P
2

QB = −RB

B

A

MOMENTOS FLECTORES
p ( 3L − x ) + p2 ⋅ x 2
Mx = RA ⋅ x − 1
⋅x
6⋅L

x

L2
L2
⋅ ( p1 + p2 ) y 0,128 ⋅ ⋅ ( p1 + p2 )
2
2


1
1
2
2
para x 0 =
⋅  − p1 +
⋅ p1 + p2 + p1 ⋅ p2 
3
p2 − p1 





3.2.3

L

Mmax comprendido entre 0,125 ⋅

(

ANGULOS DE GIRO
L3
ϕA =
⋅ ( 8 ⋅ p1 + 7 ⋅ p2 )
360 ⋅ E ⋅ I

)

QA
QB

; ϕB = −

3

L
⋅ ( 7 ⋅ p1 + 8 ⋅ p2 )
360 ⋅ E ⋅ I


x ( L − x ) 3 ( p1 − p2 ) x − 3 ( 4 p1 + p2 ) Lx

360EI ( 8 p1 + 7p2 ) L2 x + ( 8 p1 + 7p2 ) L3

3

yx =

0,01304 ⋅

+




( p1 + p2 ) ⋅ L4
2⋅E⋅I

x0

M max

3.7

FLECHA MAXIMA
( p + p2 ) ⋅ L4 y
entre 0,01302 ⋅ 1
2⋅E⋅I

2

3.8

3.2.4

MOMENTO FLECTOR

REACCIONES

R A = −R B = −

M
L

C

ESFUERZOS CORTANTES
M
Qx =
= cte
L
MOMENTOS FLECTORES
M
M
MAC = − ⋅ x
MCB = − ⋅ ( L − x )
L
L
M
M
izq
der
MC = − ⋅ a
MC = − ⋅ b
L
L

A

a

Q
A

QB

FLECHA
M⋅ a ⋅ b
fC =
⋅ ( b − a)
3⋅E⋅I⋅L

MC
M

MC


)

2
M ⋅ L ⋅ (L − x) 
a2  L − x  
⋅ 1− 3 ⋅ 2 − 
 

6⋅E⋅I
L  L  



B

izq
der
M = MC + MC

M⋅ L ⋅ x 
b2 x 2 
y AC = −
⋅ 1− 3 ⋅ 2 − 2 
6⋅E⋅I 
L
L 

yCB = −

b
L

ANGULOS DE GIRO
M ⋅ L  b2 
M ⋅ L  a2 
ϕA =
⋅  3 ⋅ 2 − 1 ; ϕ B =
⋅3⋅
− 1
6⋅E⋅I  L
6 ⋅ E ⋅ I  L2


M
3
3
ϕC =
⋅ a +b
3 ⋅ E ⋅ I ⋅ L2

(

+M

3.3.1

P


REACCIONES
P ⋅ b2
RA = 3 ⋅ ( L + 2 ⋅ a)
L


3.3 VIGA EMPOTRADA EN LOS EXTREMOS

C
;

RB =

ESFUERZOS CORTANTES
P ⋅ b2
QAC = 3 ⋅ ( L + 2 ⋅ a) = cte
L

P ⋅ a2
⋅ ( L + 2 ⋅ b)
L3

;

QCB = −

B

A
x
a

P ⋅ a2
⋅ ( L + 2 ⋅ b ) = cte
L3

b
L

MOMENTOS FLECTORES

P ⋅ a ⋅ b2
P ⋅ a2 ⋅ b
P ⋅ b2
; MB = −
; MAC = 3 ⋅ ( L ⋅ x + 2 ⋅ a ⋅ x − a ⋅ L )
L2
L2
L
2
P⋅a
2 ⋅ P ⋅ a2 ⋅ b2
2
= 3 ⋅ L ⋅ b + L − L ⋅ x − 2 ⋅ b ⋅ x ; MC =
para x0 = a
L
L3

MA = −
MBC

(

)

QB
Q
A


y AC =

P ⋅ b2 
2 ⋅ a ⋅ x  x2
⋅3 ⋅a − x −
⋅
6⋅E⋅I 
L  L2


y BC =

P ⋅ a2 
L − x ⋅  (L − x)
⋅  3 ⋅ b − (L − x) − 2 ⋅ b
⋅
6⋅E⋅I 
L 
L2


FLECHAS
P ⋅ a3 ⋅ b3
3 ⋅ E ⋅ I ⋅ L3
x=

fmax =

2 ⋅a⋅ L
L + 2⋅a

MC

2 ⋅ P ⋅ a3 ⋅ b2
3 ⋅ E ⋅ I ⋅ ( L + 2 ⋅ a)

2

0

3.9

para

;

MB

MA

x

fC =

2

3.10

3.3.2


c

P

REACCIONES
p ⋅ b ⋅ c MA − MB
RA =
−
L
L

;

p ⋅ a ⋅ c MA − MB
RB =
+
L
L

C

c

; QBD = −RB = cte ; QCD = RA − p ⋅  x − a + 
a


x
a

MOMENTOS FLECTORES
MAC = RA ⋅ x + MA

;

MBD = RB ⋅ ( L − x ) + MB

MCD = RA ⋅ x + MA −
;

B

A

ESFUERZOS CORTANTES

QAC = RA = cte

D

MA = −

p ⋅ c3
12 ⋅ L2

p 
c
⋅x − a+ 
2 
2

b

2


12 ⋅ a ⋅ b2 
⋅L − 3⋅b +

c2



Q

A

Q

B


x2
⋅ ( −3 ⋅ MA − RA ⋅ x )
6⋅E⋅I
4
 

1
c
yCD =
⋅  p ⋅  x − a +  − 4 ⋅ RA ⋅ x 3 − 12 ⋅ MA ⋅ x 3 
24 ⋅ E ⋅ I  
2



1
3
2
RB x − 3 ( MB + LRB ) x + 3 ( 2 MA + LRB ) Lx − ( 3 MB + LRB ) L2 
y DB =

6EI 
y AC =

MA

MB


12 ⋅ a2 ⋅ b 
p ⋅ c3 
⋅ L − 3⋅a+
MB = −

2 
12 ⋅ L 
c2


L


REACCIONES
L
M − MB
⋅ ( 2 ⋅ p1 + p2 ) − A
6
L
L
MA − MB
RB = ⋅ ( p1 + 2 ⋅ p2 ) +
6
L

P
1

RA =

P
2

ESFUERZOS CORTANTES

QA = RA
Qx = RA −

p1 ⋅ ( 2 ⋅ L − x ) + p2 ⋅ x
2⋅L

B

A


3.3.3

x

⋅x

L

QB = −RB
MOMENTOS FLECTORES
L2
( 3 ⋅ p1 + 2 ⋅ p2 )
60
p ⋅ ( 3 ⋅ L − x ) + p2 ⋅ x 2
Mx = RA ⋅ x + MA − 1
⋅x
6⋅L
L2
MB = − ( 2 ⋅ p1 + 3 ⋅ p2 )
60
MA = −

Q

A

Q

B


yx =

 ( p − p1) 3

x2
⋅ 2
⋅ x + p1 ⋅ L ⋅ x 2 − 4 ⋅ RA ⋅ L ⋅ x − 12 ⋅ MA ⋅ L 
24 ⋅ E ⋅ I ⋅ L 
5




MA

MB

3.11

3.12

3.3.4

MOMENTO FLECTOR

REACCIONES
6⋅M
RA = − 3 ⋅ a ⋅ b
L

;

RB =

6⋅M
⋅a⋅b
L3

C
A

ESFUERZOS CORTANTES

Qx = −

6⋅M
⋅ a ⋅ b = cte
L3

a

M⋅ a 
b
⋅2 − 3⋅ 
L 
L

MAC =

B

x

MOMENTOS FLECTORES
MA =

+M

MB = −

b
L

M⋅ b 
a
⋅2 − 3⋅ 
L 
L

M⋅ a  a 
x 
⋅ 3 ⋅ ⋅ 1− 2 ⋅  − 1
L  L 
L 

MCB = −

M⋅ b  b 
L−x 
⋅ 3 ⋅ ⋅ 1− 2 ⋅
 − 1
L  L 
L  
6⋅M 2
⋅a ⋅b
L3

;

der
MC = MA +

M 3
⋅ L − 6 ⋅ a2 ⋅ b
L3

(

QB

)


y AC =
y BC =

M ⋅ b ⋅ x2
2⋅E⋅I⋅L

L− x b

⋅2⋅a⋅ 2 − 
L
L


M⋅ a ⋅ ( L − x )
2⋅E⋅I⋅L

2

MC

 b⋅ x a
⋅2 ⋅ 2 − 
L
L


FLECHA
M ⋅ a2 ⋅ b2
fC = −
⋅ ( a − b)
2 ⋅ E ⋅ I ⋅ L3

MA
MC

MB


izq
MC = MA −

Q
A

3.4.1

P


REACCIONES
P ⋅ b2
P⋅a
RA =
⋅ ( 3 ⋅ L − b ) ; RB =
⋅ 3 ⋅ L2 − a2
2 ⋅ L3
2 ⋅ L3
ESFUERZOS CORTANTES
P ⋅ b2
P⋅a
QAC = −
⋅ ( 3 ⋅ L − b ) = cte ; QCB = −
⋅ 3 ⋅ L2 − a2 = const.
2 ⋅ L3
2 ⋅ L3

(

)

(

C
x
a

b
L

)

(

B

A

)

MOMENTOS FLECTORES
P⋅a 2
P⋅a 2
⋅ L − a2
⋅ b ⋅ ( 3 ⋅ a + 2 ⋅ b)
MB = −
; MC =
2 ⋅ L2
2 ⋅ L3
P⋅x 2
P⋅a
⋅ b ⋅ ( 3 ⋅ a + 2 ⋅ b ) ; MCB =
⋅ 2 ⋅ L3 − 3 ⋅ L2 ⋅ x + a2 ⋅ x
MAC =
2 ⋅ L3
2 ⋅ L3

(

)

Q

B

ANGULOS DE GIRO

ϕA =

P ⋅ a ( L − a)

2

; ϕC =

4⋅E⋅I⋅L

P ⋅ a ⋅ ( L − a)

2

3

4⋅E⋅I⋅L

(

⋅ L2 − 2 ⋅ a ⋅ L − a2

)

Q

A

P ⋅ b2 ⋅ x
y AC =
⋅ 3 ⋅ a ⋅ L2 − x 2 ⋅ ( 2 ⋅ L + a) 

12 ⋅ E ⋅ I ⋅ L3 

y BC =

P ⋅ a ⋅ ( L − x)
12 ⋅ E ⋅ I

2

MB

  a2  
a2   L − x  
⋅ 3 ⋅ 1− 2  −  3 − 2  ⋅ 

L  
L   L 
 



para x=L ⋅

a
2⋅L + a

MC

3.13

FLECHA MAXIMA
p ⋅ b2 ⋅ a
a
fmax =
⋅
6⋅E⋅I
2⋅L + a


3.4 VIGA APOYADA-EMPOTRADA

3.14

3.4.2


REACCIONES
p ⋅ b ⋅ c MB
RA =
+
L
L

;

c

P

p ⋅ a ⋅ c MB
RB =
−
L
L

C

ESFUERZOS CORTANTES

QAC = RA = cte

;

QDB = −RB = cte

;

QCD

c

= RA − p ⋅  x − a + 
2


x

MOMENTOS FLECTORES
;

MAC = RA ⋅ x

MCD

MDB = RB ⋅ ( L − x ) + MB

a

p 
c
= RA ⋅ x − ⋅  x − a + 
2 
2
;

MB = −

2

(L − x)

2

6⋅E⋅I

⋅ RB ⋅ ( L − x ) + 3 ⋅ MB 



QB
QA

MB




x
12 ⋅ a ⋅ b2  
y AC =
⋅  −8 ⋅ RA ⋅ L ⋅ x 2 + p ⋅ c3 ⋅  L − 3b +

48 ⋅ E ⋅ I ⋅ L 
c2




4


1
c
12ab2  

⋅  −8RALx 3 + 2 pL  x − a +  + pc3  L − 3b +
yCD =
 x
48 ⋅ E ⋅ I ⋅ L 
4
c2  





b
L

p⋅a⋅b⋅c 
c2 
⋅L + a −

4⋅b
2 ⋅ L2


ANGULOS DE GIRO

p ⋅ c3
12 ⋅ a ⋅ b2 
ϕA =
⋅  L − 3b +

48 ⋅ E ⋅ I ⋅ L 
c2


y DB = −

B

A


RA =

P2

P
1

REACCIONES
L
M
⋅ ( 2 ⋅ p1 + p2 ) + B
6
L

;

RB =

L
M
⋅ ( p1 + 2 ⋅ p2 ) − B
6
L

A
ESFUERZOS CORTANTES

Qx = RA −

p1 ⋅ ( 2 ⋅ L − x ) + p2 ⋅ x
2⋅L

L
⋅x

;

QB = −RB

Q

A

MOMENTOS FLECTORES

Mx = RA ⋅ x −

p1 ⋅ ( 3 ⋅ L − x ) + p2 ⋅ x
6⋅L

B
x

⋅ x2


3.4.3

;

MB = −

Q

B

L2
⋅ ( 7 ⋅ p1 + 8 ⋅ p2 )
120

ANGULOS DE GIRO

L3
ϕA =
⋅ ( 3 ⋅ p1 + 2 ⋅ p2 )
240 ⋅ E ⋅ I

MB


yx =

3.15

x 
( p2 − p1) x4 + 5Lp1x3 − 20RALx2 + 5L 12RAL2 − ( 3p1 + p2 ) L3  


120EIL 

3.16

3.4.4

MOMENTO FLECTOR

REACCIONES

RA = −RB =

3 M 2
⋅ ⋅ L − a2
2 L3

(

)

ESFUERZOS CORTANTES

B

x

Qx = RA = cte

a

MOMENTOS FLECTORES
der
MC = RA ⋅ a − M ;

MAC =

C +M

A

izq
MC = RA ⋅ a

3 M⋅ x 2
⋅
⋅ L − a2
2 L3

(

)

;

MBC

M
⋅ L2 − 3 ⋅ a2
2 ⋅ L2

M  x  a2 
= ⋅ 3 ⋅ ⋅ 1− 2  − 2 
2  L 
L 



;

(

MB =

b
L

)

ANGULOS DE GIRO

 b  a 2

M
; ϕC =
⋅ b ⋅ 3 ⋅ ⋅ 1+  − 4 
4⋅E⋅I
 L  L




M⋅ b ⋅ x 
⋅ −4 ⋅ L3 − x 2 − 3 ⋅ L2 ⋅ ( a + L ) 

4 ⋅ E ⋅ I ⋅ L3 
M
2
=
⋅ ( L − x ) ⋅ 2 ⋅ a2 ⋅ L − x ⋅ L2 − a2 


4 ⋅ E ⋅ I ⋅ L3

y AC =
y BC

(

Q
A

QB

MC

)

(

MB

)

MC


M
ϕA =
⋅ ( L − a) ⋅ ( 3 ⋅ a − L )
4⋅E⋅I⋅L

3.5.1


C


3.5 VIGA EMPOTRADA EN UN EXTREMO

P

REACCIONES

B

A

RB = P

x
ESFUERZOS CORTANTES
QAC = 0 ; QCB = −P = cte

a
L

MOMENTOS FLECTORES

MAC = 0

;

b

MCB = −P ⋅ ( x − a)

;

MB = −P ⋅ b

ANGULOS DE GIRO

ϕ A = ϕC = −

P
⋅ b2
2⋅E⋅I

QB


y

AC

=

P ⋅ b2
⋅ ( 3 ⋅ ( L − x ) − b)
6⋅E⋅I

;

y

CB

=

MB

3.17

FLECHA MAXIMA
P ⋅ b3
P ⋅ b2
⋅ ( 2 ⋅ b + 3 ⋅ a)
fC =
; fA =
3⋅E⋅I
6⋅E⋅I

P
2
⋅ ( L − x ) ⋅ ( 2 ⋅ b + 3 ⋅ a)
6⋅E⋅I

3.18

3.5.2


REACCIONES .
RB = p ⋅ c

c

ESFUERZOS CORTANTES .
c

QAC = 0 ; QCD = − p ⋅  x − a + 
2


P
; QDB = − p ⋅ c = cte

; ϕC = −

D

C

B

MOMENTOS FLECTORES .
2
c

p⋅ x − a+ 
2
MAC = 0 ; MCD = − 
;
2
MDB = − p ⋅ c ⋅ ( x − a) ; MB = − p ⋅ c ⋅ b
ANGULOS DE GIRO .
p ⋅ c  2 c2 
⋅b −
ϕD = −

2⋅E⋅I 
4 

A

x
p ⋅ c2
MD = −
2

p ⋅ c  2 c2 
⋅b +

2⋅E⋅I 
12 

a

b
L

; ϕ A = ϕC

y DB =



p⋅c
p⋅c 
c2 
3
⋅ L − x 2 ⋅ ( 2 ⋅ b − a + x ) ; y AC =
⋅  ( a − x ) ⋅  3 ⋅ b2 +
 + 2⋅b 
6⋅E⋅I
6⋅E⋅I 
4 





y DC =

Q

4



p
c
c2 
3
⋅   x − a +  + 4 ⋅ c ⋅ ( a − x ) ⋅  3 ⋅ b2 +
 + 8 ⋅ b ⋅ c
24 ⋅ E ⋅ I 
2
4 





(

)

B

FLECHAS .
2

fD =

p⋅ c 
c
⋅ b− 
2
E⋅I 


b c 
⋅ + 
 3 12 

2


p ⋅ c 
c
p⋅ c  
c2 
fC =
⋅  b +  ⋅ ( 4 ⋅ b − c) + c3  ; fA =
⋅ a ⋅  3 ⋅ b2 +  + 2 ⋅ b3 
12 ⋅ E ⋅ I 
2
6⋅ E⋅ I  
4







M

B


ECUACION DE LA ELASTICA .


REACCIONES
1
RB = ( p1 + p2 )
2
ESFUERZOS CORTANTES

p − p1 x 2
⋅ − p1 ⋅ x
Qx = − 2
L
2

A
;

L
QB = − ( p1 + p2 )
2

x2
⋅ ( p2 − p1) ⋅ x + 3 ⋅ L ⋅ p1

6⋅L 

B
x

MOMENTOS FLECTORES

Mx = −

P
2

P
1


3.5.3

;

MB = −

L2
⋅ ( p2 + 2 ⋅ p1 )
6

L

ANGULOS DE GIRO

ϕA = −

L3 ⋅ ( 3 ⋅ p1 + p2 )
24 ⋅ E ⋅ I

3

L−x
2 
( L − x )  − ( ) ( p2 − p1) + ( L − x )2 p2 − 
yx =
5L


24EI 
−2L ( L − x )( p2 + p1 ) + 2L2 ( p2 + 2 p1 ) 



FLECHA

120 ⋅ E ⋅ I

MB

3.19

fA =

L4 ⋅ ( 4 ⋅ p2 + 11⋅ p1 )

QB

3.20

3.5.4

MOMENTO FLECTOR

REACCIONES

M

A

B

RB = 0
ESFUERZO CORTANTE

x
a

Qx = 0

L

MOMENTOS FLECTORES

MAC = 0

;

MCB = − M = cte

b

;

MAC = − M

ANGULOS DE GIRO

ϕC = ϕ A = −

y AC =

M
⋅ b ⋅ ( 2 ⋅ L − 2 ⋅ x − b)
2⋅E⋅I

;

y BC =

M
2
(L − x)
2⋅E⋅I

FLECHA

fC =

M ⋅ b2
2⋅E⋅I

;

fA =

M
⋅ b ⋅ ( 2 ⋅ L − b)
2⋅E⋅I

MB


M⋅ b
E⋅I

P

P

A

P

B

L/2

C

L/2
L

A

L

A

L/2
L

0,688 P

0,312 P

L

0,405 P

B

C

0,094 P

0,094 P

B

A

0,312 P

0,688 P

C

B

L/2

L/2

L/2


3.6 VIGAS CONTINUAS DE DOS VANOS IGUALES

C

0,594 P

ESFUERZOS CORTANTES

ESFUERZOS CORTANTES

- 0,188 PL
- 0,094 PL
A

B

0,156 PL

C

0,156 PL

B

C

0,203 PL
MOMENTOS FLECTORES

3.21

MOMENTOS FLECTORES

A

3.22

Q

Q

A

L

B

Q

C

L

0,625 QL

A

0,375 L

B

L

L

C

0,437 QL

0,375 QL

0,063 QL
B

A

C

A

0,375 QL

0,375 L

B

0,563 QL

0,437 L

0,625 QL

ESFUERZOS CORTANTES

2

2

- 0,063 QL

- 0,125 QL

B
2

C
2

0,07 QL

0,07 QL
MOMENTOS FLECTORES

A

B
2

0,096 QL

MOMENTOS FLECTORES

C


ESFUERZOS CORTANTES

A

C

Q

A

L

Q

B

C

k L

Relación
entre
luces

MOMENTOS
FLECTORES

ESFUERZOS CORTANTES

k

B

2

g QL

0,065

0,139

0,09

0,345

0,655

0,729

0,471

0,060

0,155

0,111

0,326

0,674

0,784

0,516

0,053

0,174

0,133

1,4

0,305

0,695

0,840

0,560

0,047

0,195

0,157

1,5

0,281

0,719

0,896

0,604

0,040

0,219

0,183

1,6

0,255

0,745

0,953

0,647

0,033

0,245

0,209

1,7

0,226

0,774

1,011

0,689

0,026

0,274

0,237

0,195

0,805

1,070

0,730

0,019

0,305

0,267

0,161

0,839

1,128

0,772

0,013

0,339

0,298

0,125

0,875

1,128

0,812

0,008

0,375

0,330

0,086

0,914

1,247

0,853

0,004

0,414

0,364

0,045

0,954

1,308

0,892

0,001

0,455

0,399

0,001

0,999

1,367

0,933

0,000

0,499

0,435

k 2 − k +1
8
k f
d= −
2 k
f=

a = 0.5 − f
e=

a2
2

b = 0.5 + f
g=

d2
2

c=

k f
+
2 k

3.23

MOMENTOS FLECTORES

0,424

C

2

e QL

0,676

2,3
A

0,639

2,1

2

f QL

0,361

2,0

ESFUERZOS CORTANTES

g

1,9

d QL

f

1,8

b QL
a L

e

1,3
C

B

d

2,2

A

c

1,2

d L

a QL

b

1,1

c QL

a


3.7 VIGAS CONTINUAS DE DOS VANOS DESIGUALES

3.24

Q

Q

A

B

L

Relación
entre
luces

C

k L

MOMENTOS
FLECTORES

ESFUERZOS CORTANTES

d QL

b QL
ESFUERZOS CORTANTES

g

-0,045

1,045

1,427

0,973

0,545

0,473

-0,094

1,094

1,487

1,013

0,594

0,513

-0,145

1,145

1,548

1,051

0,645

0,553

2,7

-0,198

1,198

1,608

1,091

0,698

0,595

-0,255

1,255

1,669

1,130

0,755

0,638

2,9

-0,313

1,313

1,730

1,169

0,813

0,683

3,0

a QL

f

2,8

C

B

d

2,6

A

c

2,5

d L

b

2,4

c QL

a

-0,375

1,375

1,791

1,208

0,875

0,730

2

f QL

k 2 − k +1
8
k f
d= −
2 k
f=

A

B

MOMENTOS FLECTORES

C

2

g QL

a = 0.5 − f
e=

a2
2

b = 0.5 + f
g=

d2
2


k

Q

Q

A

Q

B

C

L

D

k L

L

Relación
entre
luces

ESFUERZOS
CORTANTES

MOMENTOS
FLECTORES

k

c QL

D

e

f

g

0,420

0,580

0,300

0,088

0,080

-0,035

0,418

0,582

0,350

0,087

0,081

-0,020

0,8

B

c

0,7

a L

b QL

b

0,6
a QL

a

0,414

0,586

0,400

0,086

0,086

-0,006

0,9

0,408

0,592

0,450

0,083

0,091


3.8 VIGAS CONTINUAS DE TRES VANOS CON SIMETRIA DE LUCES

-0,009

C

A

c QL

b QL

a L

a QL

f=

2

f QL

2

2

f QL

a = 0.5 − f

c=

ESFUERZOS CORTANTES

k3 + 1
12 ⋅ k + 8
k
2

e=

a2
2

b = 0.5 + f

g=

k2
−f
8

g QL
A

B

C

D
2

2

e QL

e QL

3.25

MOMENTOS FLECTORES

3.26

Q

Q

A

Q

B

C

L

D

k L

L

Relación
entre
luces

ESFUERZOS
CORTANTES

MOMENTOS
FLECTORES

f QL

B
2

e QL

0,100

0,025

0,390

0,610

0,550

0,076

0,110

0,041

0,378

0,622

0,600

0,072

0,122

0,058

0,365

0,635

0,650

0,066

0,135

0,076

1,4

0,349

0,651

0,700

0,061

0,151

0,094

0,322

0,668

0,750

0,055

0,168

0,113

1,6

0,313

0,687

0,800

0,049

0,187

0,133

0,292

0,708

0,850

0,043

0,208

0,153

0,269

0,731

0,900

0,036

0,231

0,174

0,245

0,755

0,950

0,030

0,255

0,196

0,219

0,781

1,000

0,024

0,281

0,219

2

f QL
A

0,080

2,0
2

0,500

1,9

ESFUERZOS CORTANTES

0,600

1,8

a QL

a L

0,400

1,7

c QL

b QL

g

1,5

C

B

A

f

1,3
D

e

1,2

b QL

c QL

c

1,1

a L

b

1,0

a QL

a

f=

C
2

g QL

MOMENTOS FLECTORES

k3 + 1
12 ⋅ k + 8

a = 0.5 − f

c=

k
2

e=

b = 0.5 + f

D
2

e QL

a2
2

g=

k2
−f
8


k

k=

I2 h
⋅
I1 l

3.9.1

y

N = 3 + 2k
a

s

p

CARGA REPARTIDA VERTICAL

B

C
I

2

x

REACCIONES

m

VA
VD

psn
=
l
psm
=
l

HA = HD =


3.9 PORTICOS SIMPLES BIARTICULADOS A LA MISMA ALTURA. DINTEL HORIZONTAL

I

n
I

1

A

h

1

D

s 
3 ps 
 mn − 
2hlN 
12 
2

l

MOMENTOS FLECTORES

MB

MC

3 ps 
s2 
MB = MC = − ⋅
 mn − 
2 lN 
12 
En S
Mx = VA ⋅ x −

p(x − m)2
− HA ⋅ h
2

HA

HD
VD

3.27

VA

3.28

3.9.2

CARGA REPARTIDA HORIZONTAL

REACCIONES

VA = VD =
HD =
HA =

p

B

C
I

ph2
2l

ph ( 2N + k )

I

2

I

1

8N

h

1

y

ph ( 6N − k )

A

8N

D
l

MOMENTOS FLECTORES
MB

MY =

py(h − y) y
+ ⋅ MB
h
2

MC

MB

HA

HD
VA

VD


ph2
( 2N − k )
8N
ph2
MC = −
( 2N + k )
8N
En AB
MB =


3.9.3

CARGA PUNTUAL VERTICAL SOBRE DINTEL

REACCIONES

n

B

Pn
VA =
l
Pm
VD =
l
HA = HD =

P

m

C
I

I

2

I

1

h

1

3 Pmn
2 lhN
A

D

MOMENTOS FLECTORES

l

3 Pmn
MB = MC = − ⋅
2 lN
2N − 3
MP = Pmn
2lN

MB

MC

MP

HD

HA
VD

3.29

VA

3.30

3.10 PÓRTICOS SIMPLES BIARTICULADOS A LA MISMA ALTURA. DINTEL INCLINADO
k1 =

I3 h1
⋅
I1 s

y

k2 =

I3 h 2
⋅
I2 s

p

3.10.1 CARGA REPARTIDA VERTICAL

C
s

REACCIONES

f
I

B

pl
2
h1 + h2
pl 2
HA = HD =
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

VA = VD =

3

I

x
I

h1

h2

2

1

A

D
l

MB = −

( h1 + h2 ) h1
pl2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

MC = −

( h1 + h2 ) h2
pl 2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

En

BC

MX =

px(l − x)
f

− HA  x + h1 
2
l



MC

MB

HA

HD
VA

VD


MOMENTOS FLECTORES


3.10.2 CARGA REPARTIDA HORIZONTAL SOBRE PILAR

C

REACCIONES
2
ph1
VA = VD =
2l
HA = ph1 − HD

s

f

p

I

3

B
I

h1

2
h1 ( 4 + 5k 1 ) + 2h2
ph1
HD =
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

I
1

h2

2

y

A

D
l

MOMENTOS FLECTORES
MC

2
h1 ( 4 + 5k 1 ) + 2h2
ph1
ph3
− 1 2
MB =
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

MC =

MB

2
h1 ( 4 + 5k 1 ) + 2h2
ph1 h2
2
2
8
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

En AB
MY = HA y −

py 2
2

HD

HA
VD

3.31

VA

3.32

3.10.3 CARGA REPARTIDA HORIZONTAL SOBRE DINTEL

p

REACCIONES

VA = VD =

pf ( h1 + h2 )

f
I

2l

B

HA = pf − HD

HD =

pf 8h (1+ k 1 ) + 4h1h2 + f ( h1 + h2 )
2
8 h (1+ k1 ) + h2 (1+ k2 ) + h1h2
2
1
2
1

C
s

I

h1

y

3

I

h2

2

1

A

D
l

MOMENTOS FLECTORES

MC = −

2
pfh1 8h1 (1+ k 1 ) + 4h1h2 + f ( h1 + h2 )
2
2
8
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

MC

MB

ph2 8h (1+ k 1 ) + 4h1h2 + f ( h1 + h2 )
2
8 h (1+ k1 ) + h2 (1+ k2 ) + h1h2
2
1
2
1

En BC
l
py 2
MY = −VA y + HA ( y + h1 ) −
f
2

HA

HD
VA

VD


MB = pfh1 −

C

REACCIONES

Pb
VA =
l
Pa
VD =
l
h1(l + b) + h2 (l + a)
Pab
HA = HD = 2 2
2
2l h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

s

f
I

3

B
I

h1

I
a

b

h2

2


3.10.4 CARGA PUNTUAL VERTICAL SOBRE DINTEL

1

A

D
l

MOMENTOS FLECTORES

MB = −

h1 ( l + b ) + h2 ( l + a )
Pabh1
2
2
2
2l
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

MC

MB

h1 ( l + b ) + h2 ( l + a )
Pabh2
MC = −
2
2
2
2l
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
MP =

Pab
 af

+ HA 
+ h1 
l
 l


MP

HD

HA
VA

VD

3.33

3.34

3.11 PÓRTICOS SIMPLES BIARTICULADOS A LA MISMA ALTURA. DINTEL A DOS AGUAS
k=

I2 h
⋅
I1 s

p

3.11.1 CARGA REPARTIDA VERTICAL SOBRE DINTEL

C
s

REACCIONES

I

pl
2
8h + 5f
pl 2
HA = HE =
2
32 h ( 3 + k ) + f ( 3h + f )

B

VA = VE =

D

I

I

1

A

h

1

E
l

pl 2 h
8h + 5f
2
32 h ( 3 + k ) + f ( 3h + f )

MC

2

pl
f+h
MB
+
8
h

MB

MD

En BC y DC
MX = p

x (l − x)
2

+

MB 
2fx 
h+ l 
h 


HE

HA
VA

VE


MC =

f
2

x

MOMENTOS FLECTORES

MB = MD = −

I

2

p

REACCIONES

C

pl
VA = 3
8
pl
VE =
8
HA = HE =

s

I
B

I

2

I

I

1

A
l

pl 2 h
8h + 5f
2
64 h ( 3 + k ) + f ( 3h + f )

MC

pl 2 f + h
+
MC =
MB
16
h
En BC
x (l − x)
2

+

MB
h

h

1

E

MOMENTOS FLECTORES

MX = p

D

x

8h + 5f
pl 2
2
64 h ( 3 + k ) + f ( 3h + f )

MB = MD = −

f
2


3.11.2 CARGA REPARTIDA VERTICAL SOBRE MEDIO DINTEL

MB

MD

2fx 

h+ l 


HE
VA

VE

3.35

HA

3.36

REACCIONES
C

ph2
VA = VE =
2l
HA = ph − HE
HE =

s

I

p

I

2

f
2

D

B

( 5k + 12 ) h + 6f
ph
2
16 h ( k + 3 ) + f ( f + 3h)
2

I

1

I
y

A

h

1

E

MOMENTOS FLECTORES
l

ph2
+ MD
MB =
2
ph2 f + h
+
MC =
MD
h
4
( 5k + 12 ) h + 6f
ph3
MD = −
2
16 h ( k + 3 ) + f ( f + 3h)

MC

MD

En AB
My = −

py 2
+ HA ⋅ y
2

HA

HE
VA

VE


MB

REACCIONES

p

pf
VA = VE =
( f + 2 h)
2l
HA = pf − HE

s

I

I

2

f
2

D

B

pf 8h ( k + 3 ) + 5f ( f + 4h)
16 h2 ( k + 3 ) + f ( f + 3h)
2

HE =

C



y
I

I

1

A

MOMENTOS FLECTORES

x

h

1

E
l

MB = HA ⋅ h
MC = −

2
pf 2 4h ( k + 2 ) + f ( 5h + f )
⋅ 2
16 h ( k + 3 ) + f ( f + 3h)

MC

MD = −HE ⋅ h
MB

MD

En BC
Mx = HA ⋅ y − VA ⋅ x − p

2

2

HE

HA
VA

VE

3.37

f
siendo y = x + h
l

( y − h)

3.38

p
REACCIONES

Pn
l
Pm
VA =
l

C
s

VA =

I
B

(

)

I

2
2
Pm 6hln+ f 3l − 4m
HA = HE = 2 2
4 l h ( k + 3 ) + f ( f + 3 h)

I

2

m

n

1

A

f
2

D
I

h

1

E
l

MOMENTOS FLECTORES

MB = MD = −HA ⋅ h

MC

MB

MD

HE

HA
VA

VE


Pm h + f
+
MC =
MB
h
2
hl + 2fm
MP = VA ⋅ m − HA
l

k1 =

I3 h1
⋅
I1 l

y

k2 =

I3 h 2
⋅
I2 l

p
B

C

REACCIONES

VA =

I

3

x
2
1

h −h
pl pl
+
2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
2
1

I

2
2

h1

I

1

h2

2


3.12 PÓRTICOS SIMPLES BIARTICULADOS A DISTINTA ALTURA. DINTEL HORIZONTAL

D

2
2

h −h
pl pl
VD =
−
2
2
2 8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

A

h1 − h2
pl 2
HA = HD =
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

l

MOMENTOS FLECTORES
MB

( h1 + h2 ) h1
pl 2
MB = −
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
MC = −

MC

( h1 + h2 ) h2
pl 2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

HD

En BC

VD
HA
VA

3.39

px 2
Mx = VA ⋅ x −
− HA ⋅ h1
2

3.40

REACCIONES

p

B

C

2
1

ph
h − h2
VA = VD =
− HD 1
2l
l
HA = ph − HD
HD =

2
ph1
5k1h1 + 4h1 + 2h2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

I

3

I
h1

I

1

h2

2

D
y

A

MOMENTOS FLECTORES
l

ph2 ph3
5k1h1 + 4h1 + 2h2
MB = − 1 − 1 2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
MB

2
ph1 h2
5k1h1 + 4h1 + 2h2
2
2
8 h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

MC

MB

En AB
My = HA ⋅ y −

py 2
2

HD
VD
HA
VA


MC = −

P

a

REACCIONES

( l + b ) h1 + ( l + a) h2
Pb Pab
VA =
h1 − h2
+ 3 2
2
l
2l h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

(

( l + b ) h1 + ( l + a) h2
Pa Pab
VD =
h1 − h2
− 3 2
2
l
2l h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

(

b

B

C
I

)
)

3

I
h1

I

1

h2

2



D

A

HA = HD =

( l + b ) h1 + ( l + a) h2
Pab
2
2
2
2l h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2

l

MOMENTOS FLECTORES

MB = −

MC = −

MB

( l + b) h1 + ( l + a) h2
Pabh1
2
2
2
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
2l

MC

MP
HD

( l + b ) h1 + ( l + a) h2
Pabh2
2
2
2
h1 (1+ k1 ) + h2 (1+ k2 ) + h1h2
2l

VD
HA
VA

3.41

MP = VA ⋅ a + MB

3.42

3.13 PÓRTICOS SIMPLES BIEMPOTRADOS A LA MISMA ALTURA. DINTEL HORIZONTAL
k=

I2 h
⋅
I1 l


p
B

C
I

VA = VD =

pl
2

HA = HD =

pl 2
4h ( k + 2 )

I

I

1

h

1

A

MOMENTOS FLECTORES

D
l

pl2
6 ( k + 2)

MB

MC

En BC
Mx =

px ( l − x )
2

Mmáx pos =

−

pl 2
6( k + 2)

pl 2 3k + 2
l
para x =
24 k + 2
2

HA

MA

VA

MD

HD
VD


pl2
MA = MD =
12 ( k + 2 )
MB = MC = −

2

x

REACCIONES

p

REACCIONES

B

C

2

ph k
VA = VD =
l ( 6k + 1)

I

HA = ph − HD
HD =

I

ph ( 2k + 3 )

A

ph2
MC = −
24
MD =

ph2
24

l

2
2 

 3 − 6k + 1 − k + 2 



MC

MB
MB

2
1 

 3 + 6k + 1 − k + 2 



En AB
My = −

D

2
1 

 5 + 6k + 1 + k + 2 



ph2 
2
2 
 1− 6 k + 1 + k + 2 
24 


h

1

y

MOMENTOS FLECTORES

MB =

I

1

8 ( k + 2)

ph2
MA = −
24

2



py 2
+ HA ⋅ y + MA
2

MA

HA
VA

MD

HD
VD

3.43

3.44

REACCIONES

VA =

P

m

Pn  m ( n − m) 
1+ 2

l 
l ( 6k + 1) 



n

B

C
I

2

VD = P − VA
HA = HD =

3Pmn
2lh(k + 2)

I

MOMENTOS FLECTORES

MA =

I

1

A

D

Pmn  1
n− m 
−

 k + 2 l ( 6k + 1) 

2l 

Pmn  1
n− m 
+

 k + 2 2l ( 6k + 1) 

l 


MC = −

l

Pmn  1
n− m 
−


l  k + 2 2l ( 6k + 1) 



MD =

Pmn nMB mMC
+
+
l
l
l

MC

MP

Pmn  1
n− m 
+

 k + 2 l ( 6k + 1) 

2l 


MP =

MB

HA

MA

VA

MD

HD
VD


MB = −

h

1


3.13.4 CARGA PUNTUAL HORIZONTAL EN CABEZA DE PILAR
REACCIONES

3Phk
VA = VD =
l(6k + 1
)
P
HA = HD =
2
MOMENTOS FLECTORES

Ph 3k + 1
2 6k + 1
Ph 3k
MB = − MC =
2 6k + 1
Ph 3k + 1
MD =
2 6k + 1

P

B

C
I

I

2

I

1

h

1

A

D

MA = −

l

MB

MA

MC

HA

HD
VD

3.45

VA

MD

3.46

3.14 PÓRTICOS SIMPLES BIEMPOTRADOS A LA MISMA ALTURA. DINTEL A DOS AGUAS
k=

I2 h
⋅
I1 s

p


C
s

REACCIONES

I

pl
2
k ( 4h + 5f ) + f
pl 2
HA = HE =
8 ( kh + f )2 + 4k h2 + hf + f 2

B

VA = VE =

(

f
2

D

x
I

)

I

1

h

1

A

E
l

MOMENTOS FLECTORES

pl2 kh ( 8h + 15f ) + f ( 6h − f )
48 ( kh + f )2 + 4k h2 + hf + f 2

(

kh (16h + 15f ) + f 2
pl2
MB = MD = −
48 ( kh + f )2 + 4k h2 + hf + f 2

(

pl 2
+ MA − HA ( h + f )
8
En BC

MC

)
MB

)

MD

MC =

2 xf  px

Mx = MA + VA ⋅ x − HA  h +
−
2
l 



2

HA

MA

VA

ME

HE
VE


MA = ME =

I

2

p

REACCIONES

pl
− VE
2
4k + 1
VE = 3 pl
32 ( 3k + 1)
k ( 4h + 5f ) + f
pl 2
HA = HE =
16 ( kh + f )2 + 4k h2 + hf + f 2

C

VA =

(

s

I
B

)

I

l

MC

)

kh (16h + 15f ) + f 2
pl 2
pl 2
−
96 ( kh + f )2 + 4k f 2 + fh + h2
64 ( 3k + 1)

MD = −

kh (16h + 15f ) + f 2
pl 2
pl2
+
96 ( kh + f )2 + 4k f 2 + fh + h2
64 ( 3k + 1)

En BC

(

(

MB

)

)

HA

MD

MA

VA

ME

HE
VE

3.47

2 xf  px 2

Mx = MA + VA ⋅ x − HA  h +
−
l 
2


l
MC = VE + ME − HE ( f + h)
2

h

1

E

pl 2 kh ( 8h + 15f ) + f ( 6h − f )
pl 2
+
96 ( kh + f )2 + 4k f 2 + fh + h2
64 ( 3k + 1)

MB = −

I

1

)

(

D

A

pl 2 kh ( 8h + 15f ) + f ( 6h − f )
pl 2
MA =
−
2
96 ( kh + f ) + 4k f 2 + fh + h2
64 ( 3k + 1)
ME =

f
2

x

MOMENTOS FLECTORES

(

I

2


3.14.2 CARGA REPARTIDA VERTICAL SOBRE MEDIO DINTEL

3.48

REACCIONES

VA = VE =

ph2 k
2l ( 3k + 1)

C
s

HA = ph − HE
HE =

k 2 h + k ( 2 f + 3 h) + f
ph2
4 ( kh + f )2 + 4k f 2 + fh + h2

(

)

I

f
2

D

1

I
y

E

2
 2

ph2  kh ( k + 6 ) + kf (15h + 16f ) + 6f
2k + 1
+6
24  ( kh + f )2 + 4k f 2 + fh + h2
3k + 1



(

l

)

MC

(

MD

)

MA

HA
VA

ME

HE
VE


MB

2
2


ph2  kh ( k + 6 ) + kf (15h + 16f ) + 6f
2k + 1
−
+6
2
24 
3k + 1
( kh + f ) + 4k f 2 + fh + h2


En AB
py 2
My = MA + HA ⋅ y −
2

h

1

A

ph2
MB = MA + HA ⋅ h −
2
1
MC = ME − HE ( f + h) + VE
2
MD = ME − HE ⋅ h
ME =

I

2

B

MOMENTOS FLECTORES

MA = −

I

p

REACCIONES

p

3 pf 4k ( f + h) + f
8 l
3k + 1
HA = pf − HE

C

VA = VE =

HE =

s

I

2
pf 2k h ( k + 4 ) + f (10kh + 5kf + f )
4 ( kh + f )2 + 4k f 2 + fh + h2

(

)

I

MC = ME − HE ( h + f ) + VE

y

I

(

E

(

l

)

l
2

h

1

A

MC

MB



kh ( 9f + 4h) + f ( 6h + f )
3 4h ( 3k + 2 ) + f 
pf 
−f
+

24  ( kh + f )2 + 4k f 2 + fh + h2
2
3k + 1


En BC
2
l ( y − h) p ( y − h)
−
My = MA + HA ⋅ y − VA
2f
2
ME =

D

1



kh ( 9f + 4h) + f ( 6h + f )
pf 
3 4h ( 3k + 2 ) + f 
+
f

24  ( kh + f )2 + 4k f 2 + fh + h2
2
3k + 1



MB = MA + HA ⋅ h

f
2

B

MOMENTOS FLECTORES

MA = −

I

2



MD

)

MA

HA

HE
VE

3.49

VA

ME

3.50

REACCIONES

p

VA = P − VE
2
Pm 3l ( kl + m) − 2m
VE = 3
3k + 1
l
2
2
Pm 3kl ( f + h) − 4fm ( k + 1) + 3lm ( f − kh)
HA = HE = 2
2
l
( kh + f ) + 4k f 2 + fh + h2

(

C
s

I
B

)

I

MOMENTOS FLECTORES

m

f
2

D

n

I

1

E

)

l

MC

MB

(

)

HA

MD

MA

VA

ME

HE
VE


MB = MA − HA ⋅ h
l
MC = ME + VE − HE ( h + f )
2
 3flh ( kl + 2m) − 4fm2 ( kh + 2h + f ) + 2kh2 ln+ f 2 l ( 4m − l ) 


2
Pm 

( kh + f ) + 4k f 2 + fh + h2
ME = 2 

2l  n n − m

(
)

+
3k + 1


En BC
2fm 

My = MA + VA ⋅ m − HA  h +
l 



h

1

A

 3flh ( kl + 2m) − 4fm2 ( kh + 2 h + f ) + 2kh2 ln+ f 2 l ( 4m − l ) 


2
Pm 

( kh + f ) + 4k f 2 + fh + h2
MA = 2 

2l  n n − m

(
)
−

3k + 1



(

I

2

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