Solve all Q3, 5 explaining detailly each step

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1. With respect to the origin 0, the points A, B, C, have position vectors (i+ 2j + k), (3i + 3j + 4k), (-i+ j -k) respectively. a. Show that A. B and C are not collinear. b. Find a vector equation of the plane ABC. c. Find a Cartesian equation for the plane which passes through A and is perpendicular to AB. d. Find the cosine of the angle BAC. 2. Vector equations of two lines are given by F (9i+ 4j + 5k)+a (4i -j+ 2k);r = (4i+ 3j + 2k) + B(-3i+j- k), where a and B are scalar parameters. a) Find, the position vector of the points of intersection of the two line. Also find a) a vector equation of the plane which contains both iines b) a Cartesian equation of the plane which contains both lines. 3. A plane contains the points A, B, C whose position vectors, relative to the origin 0, are (2i - j+ k), (3i + 2j – k), (-i + 3j + 2k), respectively. Find a) the Cartesian equation of the plane ABC. b)a vector equation of the line AB. 4. Given that the position vectors of the points A, B, C and D relative to the origin O, are: a = 3k, b = 2i + 4j + 2k, c= 4i + 3j +k and d= 3i + 7j+ 5k respectively.Find a) a vector equation of the line AB b) Cartesian equation of the line 1, passing through a and d. c) A Cartesian equation of the plane, , containing A, B and C d) The angle between the plane, n and the line 1 to two decimal places. IT 5. i) The angle between two vectors a and b is- Given that /a/= 3 and /b/= 4, find 3 (a) /2a + 3b/ (b) /2a - 3b/