[₂X₁th X₁ + R₂ (X₁-X) + K₁X₁=0 < for M₂ The displacements x₁ and x₂ are measured from their respective equilibrium positions. An external force fa(t) is applied to the system. Sketch a possible configuration of the two-mass mechanical system. Label all elements and show the positive convention for displacements on your sketch. Sketch the FBDs for each mass and verify the system model by applying Newton's laws. 2.17 Repeat Problem 2.16 if the mechanical model of the two-mass translational system is m₁1+k1x1 + k₂(x1 - x₂) = 0 m2*2 + k₂(x2-x₁) = 0

Please only solve problem 2.17. 2.16 is needed for 2.17 and the work is shown in the picture

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*4 FADE 2.16 A two-mass translational mechanical system has the following mathematical model: 4 SF=ma; a=-=-X 6₁ X₁ +K, (XX₂-f₁(E)=-M₁ X₁ m₁₁ + b₁₁+k₁(x₁ - x₂) = fa(t) [m, X, +6, X, + K, (x₁+x₁) = 5₂ (6) for m₂Ï2 + b₂*2 +k1(x₂ - ₁) +k₂x2 = 0 ·for. 6₂X₂+k₂ X₂-14 x₁-XJ = - M₂ X₂ [₂X₁th X₂ + 4₂ (X₂-X₁) + X₁ X₁=0 <for M₂ The displacements x₁ and x₂ are measured from their respective equilibrium positions. An external force fa(t) is applied to the system. Sketch a possible configuration of the two-mass mechanical system. Label all elements and show the positive convention for displacements on your sketch. Sketch the FBDs for each mass and verify the system model by applying Newton's laws. 2.17 Repeat Problem 2.16 if the mechanical model of the two-mass translational system is X₁ X₂ 띄 [m.sk, LX.-X₂) ₂ 14 m₁1+k₁x1 + k₂(x1 - x₂) = 0 m₂ä2 + k₂(x2-x₁) = 0