Final answer:
Without specific vectors provided in the question, we cannot determine the value of scalar k for which two vectors are orthogonal. Orthogonality implies that the dot product of two vectors is zero, meaning they are perpendicular. More information about the vectors' components is needed to provide an accurate answer.
Step-by-step explanation:
To find the values of the scalar k for which two vectors are orthogonal, we need to know the vectors themselves or their components. Orthogonal vectors are vectors that are perpendicular to each other, which implies that their dot product is zero. However, since the actual vectors in question are not provided in the student's question, we cannot determine the specific value of k that would make them orthogonal. Typically, you would use the formula A · B = 0 for orthogonal vectors, where A and B are the vectors and · represents the dot product. If you provide me with the vector components or any additional information, I would be happy to assist you further in finding the values of k.
If we consider the information given regarding vector products, it's important to understand that for vectors à and B in three dimensions, their cross product A × B would result in a vector C that is perpendicular to both à and B. This is relevant if we were asked to find a vector orthogonal to both à and B, but for scalar k affecting orthogonality through the dot product, more specific vector information is needed.