Question

Two vectors A and B are orthogonal if
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Answer 1

Step-by-step explanation:

Definition. Two vectors a and b are orthogonal if they are perpendicular, i.e., angle between them is 90° (Fig. ... Condition of vectors orthogonality. Two vectors a and b are orthogonal, if their dot product is equal to zero.

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Answer 2

Two vectors A and B are orthogonal if they are perpendicular.

• If two vectors A and B are perpendicular or have a 90° angle between them, they are orthogonal.
• Because the angle between the vectors is 90 degrees, we can also argue that the dot product of the two vectors A and B is zero, i.e. A.B = 0.
• Because the value of dot product of A and B is ABcosθ and the value of cos90 = 1, this is the case.
• As this design comprises several orthogonal features, orthogonal refers to or involves lines that are perpendicular or create right angles. This is referred to as orthographic.
• Perpendicular lines connect or meet at a right angle to produce a right angle.