Vectors – Calculate angle between two vectors in vector representation – Exercise 3586 Post category:Vectors Post comments:0 Comments Exercise Given a⃗=3i⃗+2j⃗\vec{a}=3\vec{i}+2\vec{j}a=3i+2j b⃗=i⃗+5j⃗\vec{b}=\vec{i}+5\vec{j}b=i+5j Calculate the angle between vectors a and b. Final Answer Show final answer π4=45∘\frac{\pi}{4}=45^{\circ}4π=45∘ Solution Coming soon… Share with Friends Read more articles Previous PostVectors – Calculate one vector projection on another vector – Exercise 3589 Next PostVectors – Calculation of scalar multiplication between vectors in vector presentation – Exercise 3584 You Might Also Like Vectors – Calculate the scalar multiplication of vectors – Exercise 3564 February 26, 2019 Vectors – Prove an equation of vectors – Exercise 3573 February 26, 2019 Vectors – Proof that the rhombus diagonals are perpendicular – Exercise 3576 February 26, 2019 Vectors – Calculate angle between two vectors – Exercise 3581 February 27, 2019 Vectors – Calculation of scalar multiplication between vectors in vector presentation – Exercise 3584 February 27, 2019 Vectors – Calculate one vector projection on another vector – Exercise 3589 February 27, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Vectors – Calculation of scalar multiplication between vectors in vector presentation – Exercise 3584 February 27, 2019
