Category:Taxicab Metric
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This category contains results about the taxicab metric.
Definitions specific to this category can be found in Definitions/Taxicab Metric.
The taxicab metric on $A_{1'} \times A_{2'}$ is defined as:
- $\map {d_1} {x, y} := \map {d_{1'} } {x_1, y_1} + \map {d_{2'} } {x_2, y_2}$
where $x = \tuple {x_1, x_2}, y = \tuple {y_1, y_2} \in A_{1'} \times A_{2'}$.
Subcategories
This category has the following 3 subcategories, out of 3 total.
Pages in category "Taxicab Metric"
The following 7 pages are in this category, out of 7 total.
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- Taxicab Metric is Metric
- Taxicab Metric is Topologically Equivalent to Chebyshev Distance on Real Vector Space
- Taxicab Metric on Metric Space Product is Continuous
- Taxicab Metric on Real Number Plane is not Rotation Invariant
- Taxicab Metric on Real Number Plane is Translation Invariant
- Taxicab Metric on Real Vector Space is Metric