by the equations { L₁ : X Y Let L₁ and L2 be lines in a 3-dimensional space given { = = Z = 3 + 2t 1+t - 2 - 3t and L₂: X Y Z = = = t -4 + 4t 1 Does L₁ and L2 intersect? Describe the intersection. Find an equation of the plane containing L₁ and L2.

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Let \( L_1 \) and \( L_2 \) be lines in a 3-dimensional space given by the equations \[ L_1 : \begin{cases} x = 3 + 2t \\ y = 1 + t \\ z = -2 - 3t \end{cases} \qquad \text{and} \qquad L_2 : \begin{cases} x = t \\ y = -4 + 4t \\ z = 1 \end{cases} \] Does \( L_1 \) and \( L_2 \) intersect? Describe the intersection. Find an equation of the plane containing \( L_1 \) and \( L_2 \).