R = 2î + 3ĵ – 6k, R2 = 2î – mỹ – 8k and R3 = nî + 4.5) – 9k - Explain why R1 & R2 are not parallel to each other. R1 || R3 & 2|R2 × R3| = [R1 . (R2 × R3 )] + v58.8n, calculate the value of m. Calculate the angles that the vector (R3 – R2) makes with î, ĵ & k axis. -

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1. Three vectors are given by,

 

R₁ = 2î + 3ĵ-6k,

 

R₂ = 2î -mj-8k and

 

R3 = nî + 4.5ĵ-9k

 

(a) Explain why R₁ & R₂ are not parallel to each other.

 

(b)If R₁ || R3 & 2|R₂ X R3 = [R₁ (R₂ R3 )] + √58.8n, calculate the value of m.

 

(c) Calculate the angles that the vector (R3 makes with î, ĵ & k axis.?

Transcribed Image Text:

R = 21 + 3ĵ – 6k, R2 = 2î – mỹ – 8k and R3 = nî + 4.5j – 9k Explain why R1 & R2 are not parallel to each other. R || R3 & 2|R2 × R3| = [R1 . (R2 × R3 )] + V58.8n, calculate the value of m. Calculate the angles that the vector (R3 – R2) makes with î, ĵ & k axis.