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Members which are not expected to be loaded above the level which would cause the tensile strength of the concrete to be exceeded anywhere within the member should be considered to be uncracked. Members which are expected to crack, but may not be fully cracked, will behave in a manner intermediate between the uncracked and fully cracked conditions. New stiffness (stiffness with taking into account cracking) is calculated in centre of each 1D element.
Two types of stiffness are calculated:
Short-term stiffness - is calculated using 28 days modulus of elasticity Ec = Ecm, it follows that value of stiffness is loaded directly from properties of the concrete material
Long-term stiffness - is calculated using effective E modulus based on creep coefficient for acting load, it follows Ec = Ec,eff = Ecm/(1+j).
Calculation effective modulus of elasticity is based on equation 5.27 in EN 1992-1-1, but instead of effective creep coefficient jef, only creep coefficient j is used
The following procedure is used for calculation stiffens for
calculation transformed Css characteristics of uncracked section (Ai, Ii, ti...)
calculation maximum value of tensile stress of uncracked cross-section (value sct,res) for respective characteristic combination (Nchar,res,Mchar,res,y, Mchar,res,z)
check condition(sct <= scr)
bending stiffness around y-axis EIy = (EIy)I
bending stiffness around z axis EIz = (EIy)I
axial stiffness EA = EAI,
Else , cross-section is cracked and average stiffness will be calculated
calculation the distribution coefficient zaccording equation 7.19 in EN 1992-1-1
where bis coefficient taking account of the influence of the duration of the loading or of repeated loading on the average strain (b=1 for calculation short-term stiffness, b=0,5 for calculation long-term stiffness)
calculation averages value of stiffness’s based on equation 7.18 in EN 1992-1-1
bending stiffness around y-axis (EIy) = 1/[z/(EIy)II + (1-z)/ (EIy)I]
bending stiffness around z-axis (EIz) = 1/[z/(EIz)II + (1-z)/ (EIz)I]
axial stiffness (EA) = 1/[(z/(EA)II + (1-z)/( EA)I],
Stiffness is recalculated to principal axis for unsymmetrical cross-section
The four type of stiffnesses is calculated for each 1D element and each dangerous combination:
| Type of stiffness | Respective combination |
| Short-term stiffness for immediate deflection | Immediate |
| Short-term stiffness for short-term deflection | Total |
| Short-term stiffness for creep deflection | Creep |
| Long-term stiffness for creep deflection | Creep |
The following stiffnesses are changes in stiffness matrix for 1D element:
EAx =EA
GAy=GAz = G×EAx/(1.2×Ec)
EIy =EIy
EIz =EIz
GIx=0.5×(1-m)×(EIy×)EIz)0.5
where
G is shear modulus of the concrete calculated according to formula G = 0.5×Ec/(1+m)
m is Poisson coefficient of the concrete loaded from material properties of the concrete
Eccentricity of stiffnness (distance between centre of gravity of concrete cross-section and centre of gravity of cracked transformed cross-section) is not taken into account in current version