Volume In Exercises 37 and 38, find the volume of the parallelepiped with the given vertices.
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Calculus: Early Transcendental Functions
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- Exercise: Let u=[3,−2,1]�=[3,−2,1], v=[1,1,1]�=[1,1,1] and w=[2,−2,0]�=[2,−2,0]. The area of the parallelogram formed by u� and v� is A=√�=Answer 1 Question 14. The volume of the parallelepiped formed by u,v�,� and w� is V=�=Answer 2 Question 14. Given that the volume of a parallelepiped is the area of its base times its height, the height of the parallelepiped formed by u,v�,� and w� when its base is viewed as the parallelogram formed by u� and v� is h=ℎ=Answer 3 Question 14/√/Answer 4 Question 14. The parallelepiped formed by u� and v� and ku×v��×� will have the same volume as the parallelepiped formed by u,v�,� and w� if k=±1/�=±1/x. what is x ?arrow_forwardVolume of a prism Find the volume of the prism D in the first octantbounded by the planes y = 4 - 2x and z = 6.arrow_forward
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