In the context of the question, "R3" refers to the three-dimensional Euclidean space, which is also called 3-dimensional Cartesian space or 3D space.
R3 stands for "real 3-dimensional space," which means that each point in this space is described by three real numbers or coordinates (x, y, z), where x, y, and z represent the distances along the three mutually perpendicular axes.
In other words, R3 is the space that contains all possible combinations of three real numbers, which can be thought of as the set of all ordered triples (x, y, z).
In this space, geometric objects such as points, lines, planes, and solids can be visualized and analyzed using concepts and tools of analytic geometry and linear algebra.
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Answer:
Step-by-step explanation:
In the context of the question, "R3" refers to the three-dimensional Euclidean space, which is also called 3-dimensional Cartesian space or 3D space.
R3 stands for "real 3-dimensional space," which means that each point in this space is described by three real numbers or coordinates (x, y, z), where x, y, and z represent the distances along the three mutually perpendicular axes.
In other words, R3 is the space that contains all possible combinations of three real numbers, which can be thought of as the set of all ordered triples (x, y, z).
In this space, geometric objects such as points, lines, planes, and solids can be visualized and analyzed using concepts and tools of analytic geometry and linear algebra.