# Let A B C Be Three Unit Vectors Such That A B And A C And The Angle Be

This post categorized under Vector and posted on October 13th, 2019.

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[math]0 left( overrightarrow a overrightarrow b overrightarrow c right) cdot left( overrightarrow a overrightarrow b overrightarrow c right Let a b and c be three unit vectors such that a x ( b x c) 32 ( b c). If b is not parallel to c then the angle between a and b is Let mathbfa mathbfb and mathbfc be unit vectors such that mathbfamathbfbmathbfc mathbf0. Show that the angle between any two of these vectors is 120circ. Hi I have been having some trouble with this problem. I have tried to vectorign variables to the vectors and creating various equations with them

Let a b c be three unit vectors such that a.b and a.c 0 and the angle between b and c is pi6. Prove that a 2(bc) Davneet Singh is a graduate from Indian Insvectorute of Technology Kanpur. He has been teaching from the past 9 years. He provides courses for Maths and Science at Teachoo. 1 Expert Answer(s) - 189459 - Let a b and c be three vectors with magnitudes 1 1 and 2 respectively. If ax(axc) b 0 then t. Answer this question and win exciting prizes

5 Expert Answer(s) - 31662 - if abc are three unit vectors such that a b c 0 then find the value of a.b b.c a.c . Answer this question and win exciting prizes I suppose it makes pvectorty of sense in my head - there are three vectors here in 3-vectore and since a cross product finds the vector thats mutually perpendicular to the two vectors being crossed it stands to reason that these three vectors (i.e. a x b b x c and c x a) are equal just by using the right-hand rule. But how do I rigourously a b and c are unit vectors and abc0. This is the first part of a question and the solution involves the fact that a b and c form a triangle. I am having a really hard time how these vectors form a triangle. Can you pleases be as thorough as possible in your answer. Thank you so much for all