CQUAD8

Bulk Data Entry Defines a curved quadrilateral shell element with eight grid points.

Format

(1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
CQUAD8 EID PID G1 G2 G3 G4 G5 G6  
  G7 G8 T1 T2 T3 T4 Theta or MCID ZOFFS  

Example

(1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
CQUAD8 111 203 20 21 50 51 26 94  
  95 23 0.125 0.025 0.030 .025 30 .03  

Definitions

Field Contents SI Unit Example
EID Unique element identification number.

No default (Integer > 0)

 
PID A PSHELL, PCOMP or PCOMPP property entry identification number.
Integer
Specifies an identification number for this property.
<String>
Specifies a user-defined string label for this property. 11

Default = EID (Integer > 0 or <String>)

 
G1, G2, G3, G4 Grid point identification numbers of connected corner points. Required data for all four grid points.

No default (Integers > 0, all unique)

 
G5, G6, G7, G8 Grid point identification numbers of connected edge points. Cannot be omitted.

No default (Integer ≥ 0 or blank)

 
Ti Thickness of the element at the corner grid points G1 through G4. The values of Ti specified here will be directly used in the solution.

PARAM,SHELLTI,NO can be used to switch to using the average value of T1, T2, T3, and T4 as the shell thickness.

Defaults: 4

(Real ≥ 0.0 or blank)

 
THETA Material orientation angle in degrees.3

Default = 0.0 (Real)

 
MCID Material coordinate system identification number. The x-axis of this coordinate system is projected onto the element to define the x-axis of the material coordinate system.
= 0
Specifies the basic coordinate system.
blank
Theta = 0.0 is used. 2 3

Default is THETA = 0.0 (Integer ≥ 0)

 
ZOFFS Offset from the surface of grid points to the element reference plane. 6 Overrides the ZOFFS specified on the PSHELL entry.

Default = 0.0 (Real, Character Input = TOP/BOTTOM, or blank)

 

Comments

  1. Grid points G1 through G8 must be numbered as shown:


    Figure 1.
  2. The element coordinate system is a Cartesian system defined locally for each point (ξ, η).


    Figure 2.
    It is based on the following rules:
    • The plane containing Xelem and Yelem is tangent to the surface of the element.
    • Xelem and Yelem are obtained by doubly bisecting the lines of constant ξ and η.
    • Xelem increases in the general direction of increasing ξ and Yelem of η.


    Figure 3.
  3. The orientation of the material coordinate system is defined locally at each interior integration point by THETA, which is the angle from the line of constant η (essentially the same as the ξ-axis) to the material x-direction (Xmaterial).
    If MCID is used in place of THETA, the local material x-direction (Xmaterial) is obtained at any point in the element by projection of the x-axis of the MCID coordinate system onto the surface of the element at this point. The local z-direction is aligned with the normal to the surface and the material y-direction (Ymaterial) is constructed accordingly to produce right-handed local material system X-Y-Zmaterial.


    Figure 4.
    Note: Since Xelem changes directions throughout the element based on element shape, the material coordinate system varies similarly. Because of this, an orthotropic or anisotropic material will cause the CQUAD8's stiffness to be biased by both its shape and grid ordering. Use the CQUAD4 element if a constant material coordinate system direction is desired with orthotropic and anisotropic materials.
  4. T1, T2, T3, and T4 are optional. If they are not supplied, the element thickness will be set equal to the value of T on the PSHELL entry. If 0.0 is specified for Ti, then the thickness at that node is zero. If Ti's are supplied, PID cannot reference PCOMP or PCOMPP data. If the property referenced by PID is selected as a region for Size (parameter) optimization, then any Ti values defined here are ignored. If you input Ti for elements in the design space for Topology or Free-Size (parameter) optimization, the run will error out.
  5. It is required that the midside grid points be located within the middle third of the edge; that is the interval (0.25, 0.75) excluding the quarter points 0.25 and 0.75. If the edge point is located at the quarter point, the program may fail with an error or the calculated stresses will be meaningless.
  6. The shell reference plane can be offset from the plane defined by element nodes by means of ZOFFS. In this case all other information, such as material matrices or fiber locations for the calculation of stresses, is given relative to the offset reference plane. Similarly, shell results, such as shell element forces, are output on the offset reference plane.

    ZOFFS can be input in two different formats:
    Real
    A positive or a negative value of ZOFFS is specified in this format. A positive value of ZOFFS implies that the reference plane of each shell element is offset a distance of ZOFFS along the positive z-axis of its element coordinate system.
    Surface
    This format allows you to select either "Top" or "Bottom" option to specify the offset value.
    Top
    The top surface of the shell element and the plane defined by the element nodes are coincident.
    This makes the effective "Real" ZOFFS value equal to half of the thickness of the PSHELL property entry referenced by this element. (The sign of the ZOFFS value would depend on the direction of the offset relative to the positive z-axis of the element coordinate system, as defined in the Real section).


    Figure 5. Top option in ZOFFS
    Bottom
    The bottom surface of the shell element and the plane defined by the element nodes are coincident.
    This makes the effective "Real" ZOFFS value equal to half of the thickness of the PSHELL property entry referenced by this element. (The sign of the ZOFFS value would depend on the direction of the offset relative to the positive z-axis of the element coordinate system, as defined in the Real section).


    Figure 6. Bottom option in ZOFFS
    Note: When ZOFFS is used, both MID1 and MID2 must be specified on the PSHELL entry referenced by this element (otherwise, singular matrices would result).
    Offset is applied to all element matrices (stiffness, mass, and geometric stiffness), and to respective element loads (such as gravity). Hence, ZOFFS can be used in all types of analysis and optimization. Automatic offset control is available in composite free-size and sizing (parameter) optimization where the specified offset values are automatically updated based on thickness changes.
    However, while offset is correctly applied in geometric stiffness matrix and hence can be used in linear buckling analysis, caution is advised in interpreting the results. Without offset, a typical simple structure will bifurcate and loose stability "instantly" at the critical load. With offset, though, the loss of stability is gradual and asymptotically reaches a limit load.


    Figure 7.
    Therefore, the structure with offset can reach excessive deformation before the limit load is reached. The above illustrations apply to linear buckling - in a fully nonlinear limit load simulation, additional instability points may be present on the load path.
  7. Stresses and strains are output in the local coordinate system identified by Xelem and Yelem above.
  8. Size optimization of the property referenced by PID is not possible if Ti values are defined here. If the property referenced by PID is selected as a region for free-size optimization, then any Ti values defined here are ignored.
  9. These 2nd order shell elements do not have normal rotational degrees-of-freedom (often referred to as "drilling stiffness"). No mass is associated with these degrees-of-freedom. If unconstrained, massless mechanisms may occur. It is therefore advisable to use PARAM,AUTOSPC,YES when working with these elements.
  10. For more information, refer to Two-dimensional Shell Elements in the User Guide.
  11. String based labels allow for easier visual identification of properties, when being referenced by the elements cards. For more details, refer to String Label Based Input File in the Bulk Data Input File.
  12. This card is represented as a quad8 element in HyperMesh.