Examples of columns in antis in the following topics:
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- Such aligned columns were referred to as columns in antis.
- It also had a set of prostyle columns in antis that completed the symmetrical appearance of the temple.
- There are three columns in antis across the pronaos.
- The opisthodomos was separated from the naos and had its own entrance and set of columns in antis.
- Both the pronaos and opisthodomos have two prostyle (free-standing) columns in antis and exterior access, although both lead into the temple's naos.
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- One peristyle of Doric columns (the order used in Archaic architecture) surrounded the perimeter of the stylobate, which rested atop two steps.
- The theatre was first built in the fourth century BCE and renovated multiple times in the following centuries.
- These buildings were single-room naosoi (plural of naos) fronted by two columns in antis and decorated in either the Doric or Ionic style.
- The two columns in antis were not typical columns but caryatids, supportive columns that took the shape of women.
- Reconstructed Doric columns mark the east end (front) of the temple.
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- Its colonnade has six columns across its width and twelve columns down its length.
- The columns have become more widely spaced and also more slender.
- Both the pronaos and opisthodomos have two prostyle columns in antis and exterior access, although both lead into the temple's naos.
- As in the Temple of Hera II, there are two rows of columns on either side of the temple's interior.
- In the case of both pediments, all figures are full-sized and carved completely in the round rather than in relief.
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- In other words the rows of $A$ have $m$ components while the columns of $A$ have $n$ components.
- This is easiest to visual if you keep in mind a picture of a generic $n$ by $m$ matrix (Figure 3.2).
- What about the column space and the null space of $A^T$ ?
- Here is probably the most important result in linear algebra: For any matrix whatsoever, the number of linearly independent rows equals the number of linearly independent columns.
- A generic $n \times m$ matrix can have more columns than rows (top), more rows than columns (bottom), or it could be square.
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- In addition, low-back pain may also be the result of bad lifting habits and posture.
- This results in misplaced force application within the spine, often resulting in hemorrhage of disks within the spinal column.
- Treatments include pain relievers, anti-inflammatory drugs, icing, bed rest, physical therapy, or surgery.
- The five vertebrae in the lumbar region of the back are the largest and strongest in the spinal column.
- In most mammals, the lumbar region of the spine curves outward.
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- Fill in your class limits in column one.
- Then, count the number of data points that falls in each class and write that number in column two.
- Next, start to fill in the third column.
- The first entry will be the same as the first entry in the Frequency column.
- The second entry will be the sum of the first two entries in the Frequency column, the third entry will be the sum of the first three entries in the Frequency column, etc.
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- A matrix is a rectangular arrays of numbers, symbols, or expressions, arranged in rows and columns.
- In mathematics, a matrix (plural matrices) is a rectangular array of numbers, symbols, or expressions, arranged in rows and columns.
- The horizontal and vertical lines of entries in a matrix are called rows and columns, respectively.
- The rule for matrix multiplication, however, is that two matrices can be multiplied only when the number of columns in the first equals the number of rows in the second.
- In some contexts, such as computer algebra programs, it is useful to consider a matrix with no rows or no columns, called an empty matrix.
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- Trajan was born in Spain and rose to prominence in the Roman army during the reign of Domitian.
- In a spiral relief that wraps around the column, from its bottom to its top, is a 625-foot frieze depicting Trajan's two military campaigns against the Dacians.
- Because of the column's location, nestled between the libraries and the basilica of the Trajan's Forum, the scenes, which are carved in low relief, are small and hard to read.
- A relief frieze encircles the column and depicts Marcus Aurelius's military campaigns at the end of his life in Germania.
- The figures in this column are stockier and their proportions are distorted.
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- When multiplying matrices, the elements of the rows in the first matrix are multiplied with corresponding columns in the second matrix.
- If $A$ is an $n\times m $ matrix and $B$ is an $m \times p$ matrix, the result $AB$ of their multiplication is an $n \times p$ matrix defined only if the number of columns $m$ in $A$ is equal to the number of rows $m$ in $B$.
- When multiplying matrices, the elements of the rows in the first matrix are multiplied with corresponding columns in the second matrix.
- First ask: Do the number of columns in $A$ equal the number of rows in $B$?
- The number of columns in $A$ is $2$, and the number of rows in $B$ is also $2$, therefore a product exists.
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- A "3 by 6" matrix has three rows and six columns; an "I by j" matrix has I rows and j columns.
- The elements (cells) of a matrix are identified by their "addresses. " Element 1,1 is the entry in the first row and first column; element 13,2 is in the 13th row and is the second element of that row.
- In web pages it's easier to use "tables" to represent matrices.
- The matrix in figure 5.3 for example, is a 4 by 4 matrix, with additional labels.
- The matrices used in social network analysis are frequently "square. " That is, they contain the same number of rows and columns.