Question 4 Skew lines are a pair of lines that are non-intersecting, non-parallel, and non-coplanar. This implies that skew lines can never intersect and are not parallel to each other. Given two lines (a) (b) (c) 4=+] and=+H + t 1 and L₂: 7 L₁: Prove that L₁ and L2 are skew lines. Find a vector that connects these two lines. t 0 Plane ß lies exactly halfway between the two lines and intersects neither. Use the results in Question 4(b) to find the Cartesian and vector equation of plane B.

Q4 Needed to be solved whole questions with all parts correctly in 90 minutes in the order to get positive feedback please show me neat and clean work for it by hand solution needed Hundred percent efficiency needed in the order to get positive response Please do all parts

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Question 4 Skew lines are a pair of lines that are non-intersecting, non-parallel, and non-coplanar. This implies that skew lines can never intersect and are not parallel to each other. Given two lines (a) (b) (c) 4=Q+Q] =+H +t 1 and L₂: t 0 7 Prove that L₁ and L2 are skew lines. Find a vector that connects these two lines. Plane ß lies exactly halfway between the two lines and intersects neither. Use the results in Question 4(b) to find the Cartesian and vector equation of plane ß.