QUESTION IMAGE
Question
- determine if the two given vectors are orthogonal. if they are not orthogonal, then determine if the angle between them is acute or obtuse. 1. ⟨2,3⟩ and ⟨3,−2⟩. 2. ⟨2,3⟩ and ⟨−3,−2⟩. 3. ⟨2,3⟩ and ⟨3,2⟩. 4. ⟨4,4,−2⟩ and ⟨3,−2,2⟩. 5. ⟨1,0,2⟩ and ⟨−4,−1,3⟩. 6. ⟨1,1,2⟩ and ⟨4,4,−2⟩.
Step1: Recall dot product rule
For vectors $\langle a_1,a_2,...,a_n
angle$ and $\langle b_1,b_2,...,b_n
angle$, dot product is $\sum_{i=1}^n a_i b_i$.
- If dot product = 0: vectors are orthogonal
- If dot product > 0: angle is acute
- If dot product < 0: angle is obtuse
---
Subproblem 1: $\langle 2,3
angle$ and $\langle 3,-2
angle$
Step1: Calculate dot product
$\langle 2,3
angle \cdot \langle 3,-2
angle = (2)(3) + (3)(-2)$
$= 6 - 6 = 0$
---
Subproblem 2: $\langle 2,3
angle$ and $\langle -3,-2
angle$
Step1: Calculate dot product
$\langle 2,3
angle \cdot \langle -3,-2
angle = (2)(-3) + (3)(-2)$
$= -6 - 6 = -12$
---
Subproblem 3: $\langle 2,3
angle$ and $\langle 3,2
angle$
Step1: Calculate dot product
$\langle 2,3
angle \cdot \langle 3,2
angle = (2)(3) + (3)(2)$
$= 6 + 6 = 12$
---
Subproblem 4: $\langle 4,4,-2
angle$ and $\langle 3,-2,2
angle$
Step1: Calculate dot product
$\langle 4,4,-2
angle \cdot \langle 3,-2,2
angle = (4)(3) + (4)(-2) + (-2)(2)$
$= 12 - 8 - 4 = 0$
---
Subproblem 5: $\langle 1,0,2
angle$ and $\langle -4,-1,3
angle$
Step1: Calculate dot product
$\langle 1,0,2
angle \cdot \langle -4,-1,3
angle = (1)(-4) + (0)(-1) + (2)(3)$
$= -4 + 0 + 6 = 2$
---
Subproblem 6: $\langle 1,1,2
angle$ and $\langle 4,4,-2
angle$
Step1: Calculate dot product
$\langle 1,1,2
angle \cdot \langle 4,4,-2
angle = (1)(4) + (1)(4) + (2)(-2)$
$= 4 + 4 - 4 = 4$
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- The vectors are orthogonal.
- The angle between the vectors is obtuse.
- The angle between the vectors is acute.
- The vectors are orthogonal.
- The angle between the vectors is acute.
- The angle between the vectors is acute.