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AAE 556 Aeroelasticity Lecture 17

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1 AAE 556 Aeroelasticity Lecture 17
Typical section vibration Purdue Aeroelasticity

2 Purdue Aeroelasticity
Understanding the origins of flutter Typical section equations of motion - 2 DOF Plunge displacement h is positive downward & measured at the shear center xq measured at the shear center from static equilibrium position Purdue Aeroelasticity

3 A peek ahead at the final result coupled equations of motion dynamically coupled but elastically uncoupled mg = weight xq xq is called static unbalance and is the source of dynamic coupling Purdue Aeroelasticity

4 Purdue Aeroelasticity
Lagrange and analytical dynamics an alternative to FBD’s and Isaac Newton z(t) is the downward displacement of a small portion of the airfoil at a position x located downstream of the shear center kinetic energy strain energy Purdue Aeroelasticity

5 Expanding the kinetic energy integral
m is the total mass Sq is called the static unbalance Iq is called the airfoil mass moment of inertia – it has 2 parts Purdue Aeroelasticity

6 Equations of motion for the unforced system (Qi = 0)
EOM in matrix form, as promised Purdue Aeroelasticity

7 Differential equation a trial solution
Goal – frequencies and mode shapes Substitute this into differential equations Purdue Aeroelasticity

8 There is a characteristic equation here
Purdue Aeroelasticity

9 The time dependence term is factored out
Determinant of dynamic system matrix set determinant to zero (characteristic equation) Purdue Aeroelasticity

10 Nondimensionalize by dividing by m and Iq
Define uncoupled frequency parameters Purdue Aeroelasticity

11 Solution for natural frequencies
Purdue Aeroelasticity

12 Solutions for exponent s These are complex numbers
Purdue Aeroelasticity

13 solutions for s are complex numbers
and Purdue Aeroelasticity

14 Example configuration
2b=c and and New terms – the radius of gyration Purdue Aeroelasticity

15 Natural frequencies change when the wing c.g. or EA positions change
c.g. offset in semi-chords Purdue Aeroelasticity

16 Purdue Aeroelasticity
Summary? Purdue Aeroelasticity

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