Chapter 9: Problem 38
Describe the solid satisfying the condition. \(x^{2}+y^{2}+z^{2}>4\)
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In Exercises 61 and \(62,\) use vectors to determine whether the points are collinear. (0,-2,-5),(3,4,4),(2,2,1)
Find the angle \(\theta\) between the vectors. $$ \begin{array}{l} \mathbf{u}=\langle 1,1,1\rangle \\ \mathbf{v}=\langle 2,1,-1\rangle \end{array} $$
The initial and terminal points of a vector \(v\) are given. (a) Sketch the directed line segment, (b) find the component form of the vector, and (c) sketch the vector with its initial point at the origin. Initial point: (2,-1,-2) Terminal point: (-4,3,7)
Use vectors to find the point that lies two-thirds of the way from \(P\) to \(Q\). \(P(1,2,5), \quad Q(6,8,2)\)
Consider the vectors \(\mathbf{u}=\langle\cos \alpha, \sin \alpha, 0\rangle\) and \(\mathbf{v}=\langle\cos \beta, \sin \beta, 0\rangle\) where \(\alpha>\beta\) Find the dot product of the vectors and use the result to prove the identity \(\cos (\alpha-\beta)=\cos \alpha \cos \beta+\sin \alpha \sin \beta\).
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