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Homework Set 12 A

PH 111 – 03

Q1. (A) What does **A**•**A**, the scalar product of a vector with itself, give? (B) What does

**A**×**A**, the vector product of a vector with itself, give?

Q2. (A) If **A**•**B** = 0, does it necessarily follow that either A = 0 or B = 0? Explain. (B) If

**A**×**B **= 0, does it necessarily follow that A = 0 or B = 0? Explain.

For the problems, please use the following vectors:

𝐴⃑ = 5.0𝑖̂ − 6.3𝑗̂

𝐵

𝐶⃑ = 4.0𝑖̂ + 2.1𝑗̂

P1. List the x- and y- components of vectors **A**, **B**, and **C**.

P2. Calculate **A**•**B.**

P2. Calculate the angle between vectors **A** and **B**.

P3. Calculate the magnitude of vector **C**.

P4. Calculate C×A.

(For this exercise, please set up the determinant and show how you evaluate it! Remember that I do not care what the final numbers are, but I do want you to show me you understand the process to get the final numbers!)

EC1: Construct unit vectors for **A**, **B**, and **C**.

EC2: Let

𝐷

Calculate D•(A×B).