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  • What is an orthogonal vector?

    An orthogonal vector is a vector that is perpendicular to another vector. In other words, two vectors are orthogonal if their dot product is zero. Geometrically, this means that the two vectors form a 90-degree angle with each other. Orthogonal vectors are important in many areas of mathematics and physics, including linear algebra and vector calculus.

  • What does the term orthogonal mean?

    The term orthogonal refers to two things being perpendicular or at right angles to each other. In mathematics, it often refers to vectors or matrices that are perpendicular to each other. In a broader sense, it can also refer to any two things that are independent or unrelated to each other.

  • Are linearly independent vectors always orthogonal?

    No, linearly independent vectors are not always orthogonal. Linear independence means that no vector in the set can be written as a linear combination of the others, while orthogonality means that the vectors are perpendicular to each other. It is possible for linearly independent vectors to be orthogonal, but it is not a guarantee. For example, in three-dimensional space, the vectors (1, 0, 0), (0, 1, 0), and (0, 0, 1) are linearly independent and orthogonal, but the vectors (1, 1, 0) and (0, 1, 1) are linearly independent but not orthogonal.

  • When are planes and lines orthogonal?

    Planes and lines are orthogonal when the line is perpendicular to the plane. This means that the line forms a 90-degree angle with the plane, creating a right angle. In other words, the direction of the line is perpendicular to the direction of the plane. This relationship is important in geometry and engineering, as it affects the intersection and orientation of different geometric elements.

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  • How do you calculate the orthogonal complement?

    To calculate the orthogonal complement of a subspace, you first need to find a basis for the subspace. Then, you can use the Gram-Schmidt process to find an orthonormal basis for the subspace. Finally, the orthogonal complement is the set of all vectors in the vector space that are orthogonal to every vector in the orthonormal basis of the subspace.

  • How do I calculate the orthogonal complement?

    To calculate the orthogonal complement of a subspace, you first need to find a basis for the subspace. Then, you can use the Gram-Schmidt process to find an orthogonal basis for the subspace. Once you have the orthogonal basis, you can take the orthogonal complement by finding the orthogonal complement of each basis vector and then taking the span of those vectors. This will give you the orthogonal complement of the original subspace.

  • What is a proof of two orthogonal?

    Two vectors are considered orthogonal if their dot product is equal to zero. This means that the angle between the two vectors is 90 degrees, forming a right angle. Mathematically, if vectors u and v are orthogonal, then u ยท v = 0. This property can be used to prove that two vectors are orthogonal by calculating their dot product and showing that it equals zero.

  • What is a proof for two orthogonal?

    Two vectors are orthogonal if their dot product is zero. This can be proven by calculating the dot product of the two vectors and showing that it equals zero. If the dot product is zero, it means that the vectors are perpendicular to each other, which is the definition of orthogonality in Euclidean space.

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