Textbook Question
Find the angle between each pair of vectors. Round to two decimal places as necessary.
3i + 4j, j
406
views
8. Vectors
Dot Product
Problem 7.78
Textbook Question
Determine whether each pair of vectors is orthogonal.
i + 3√2j, 6i - √2j
Verified step by step guidance1
Step 1: Recall that two vectors are orthogonal if their dot product is zero.
Step 2: Identify the components of the vectors. The first vector is \( \mathbf{v_1} = \langle 1, 3\sqrt{2} \rangle \) and the second vector is \( \mathbf{v_2} = \langle 6, -\sqrt{2} \rangle \).
Step 3: Use the formula for the dot product of two vectors \( \mathbf{v_1} = \langle a_1, b_1 \rangle \) and \( \mathbf{v_2} = \langle a_2, b_2 \rangle \), which is \( a_1 \cdot a_2 + b_1 \cdot b_2 \).
Step 4: Substitute the components of the vectors into the dot product formula: \( 1 \cdot 6 + 3\sqrt{2} \cdot (-\sqrt{2}) \).
Step 5: Simplify the expression to determine if the dot product equals zero, which will confirm if the vectors are orthogonal.
Verified video answer for a similar problem:This video solution was recommended by our tutors as helpful for the problem above
Was this helpful?
Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Orthogonal Vectors
Two vectors are considered orthogonal if their dot product equals zero. This means that the angle between them is 90 degrees, indicating that they are perpendicular to each other in a geometric sense. Understanding this concept is crucial for determining the relationship between the given vectors.
Recommended video:
03:48
Introduction to Vectors
Dot Product
The dot product of two vectors is calculated by multiplying their corresponding components and then summing those products. For vectors A = ai + bj and B = ci + dj, the dot product is given by A · B = ac + bd. This operation is fundamental in assessing whether two vectors are orthogonal.
Recommended video:
05:40Introduction to Dot Product
Vector Components
Vectors can be expressed in terms of their components along the coordinate axes, typically represented as i (horizontal) and j (vertical) components. For example, the vector i + 3√2j has components of 1 and 3√2. Recognizing these components is essential for performing calculations like the dot product.
Recommended video:
03:55Position Vectors & Component Form
5:40mWatch next
Master Introduction to Dot Product with a bite sized video explanation from Patrick
Start learningRelated Videos
Related Practice