What is the angle between $< 2, 5, 4 >$ $<2,5,4 >$ and $< 6, 8, 1 >$ $< 6,8,1 >$ ?

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What is the angle between $< 2, 5, 4 >$ $<2,5,4 >$ and $< 6, 8, 1 >$ $< 6,8,1 >$ ?

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Answer 1 · 2015-12-27T18:46:26

${33.83}^{\circ}$ $33.83^@$

Explanation:

There are 2 methods we can use to calculate this algebraically, either using the vector cross product or the vector inner product.
I shall use the latter method as it is quicker and also more general.

The angle between any 2 vectors $A and B$ $A and B$ in any dimensional vector space may be given by the inverse cosine of the Euclidean inner product of the 2 vectors divided by the product of the norms of the 2 vectors.
ie. $cos θ = \frac{A \cdot B}{| | A | | \cdot | | B | |}$ $costheta=(A*B)/(||A||*||B||)$

$therefore theta=cos^(-1) (([(2,5,4) * (6,8,1)]) / (||((2,5,4))|| * ||((6,8,1))||))$

$=cos^(-1)((12+40+4)/(sqrt(45sqrt101)))$

$=33.83^@$ .

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What is the angle between $< 2, 5, 4 >$ $<2,5,4 >$ and $< 6, 8, 1 >$ $< 6,8,1 >$ ?

1 Answer

Explanation:

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What is the angle between $< 2, 5, 4 >$ $<2,5,4 >$ and $< 6, 8, 1 >$ $< 6,8,1 >$ ?