Progression (AP), is a series in which each term, after the first, is formed by adding a constant number to the preceding term. Higher Algebra - Σελίδα 379των George Egbert Fisher, Isaac Joachim Schwatt - 1901 - 615 σελίδεςΠλήρης προβολή - Σχετικά με αυτό το βιβλίο
| Wooster Woodruff Beman, David Eugene Smith - 1897 - 256 σελίδες
...2, , " " " 0, 08, 66, 34, 2, , " " " —32. A geometric series (also called a geometric progression) is a series in which each term after the first is formed by multiplying the preceding term by a constant. Eg, 2, 5, 12£, 31i, , the constant being 2-J-, 3, -... | |
| George Egbert Fisher, Isaac Joachim Schwatt - 1898 - 712 σελίδες
...PROGRESSION. 1. An Arithmetical Series, or as it is more commonly called an Arithmetical Progression, is a series in which each term, after the first, is...constant number to the preceding term. See § 1, Art. 1, Ex. 1. Evidently this definition is equivalent to the statement, that the difference between any two... | |
| George Egbert Fisher, Isaac Joachim Schwatt - 1898 - 714 σελίδες
...PROGRESSION. 1. A Geometrical Series, or as it is more commonly called, a Geometrical Progression, is a series in which each term after the first is formed by multiplying the preceding term by a constant number. See § 1, Art. 1, Ex. 2. Evidently this definition... | |
| George Egbert Fisher, Isaac Joachim Schwatt - 1899 - 506 σελίδες
...PROGRESSION. 1. A Geometrical Series, or as it is more commonly called a Geometrical Progression (GP), is a series in which each term after the first is formed by multiplying the preceding term by a constant number. See § 1, Art. 1, (2). Evidently this definition... | |
| George Egbert Fisher - 1900 - 444 σελίδες
...chapter a few simple 'and yet very important series will be discussed. ARITHMETICAL PROGRESSION. 3. An Arithmetical Series, or, as it is more commonly...adding a constant number to the preceding term. See Art. 1, (1). 4. Evidently this definition is equivalent to the statement, that the difference between... | |
| Wooster Woodruff Beman, David Eugene Smith - 1900 - 500 σελίδες
...- , U, 98, 66, 34, 2, ---, " " " -32. 343. A geometric series (also called a geometric progression) is a series in which each term after the first is formed by multiplying the preceding term by a constant. Eg, 3, - 6, +12, -24, - - -, the constant being - 2,... | |
| George Egbert Fisher - 1900 - 438 σελίδες
...PROGRESSION. 17. A Geometrica1 Series, or, as it is more commonly called, a Geometrica1 Progression (GP), is a series in which each term after the -first is formed by multiplying the preceding term by a, constant number. See Art. 1, (2). 18. Evidently this definition... | |
| George Egbert Fisher, Isaac Joachim Schwatt - 1900 - 206 σελίδες
...PROGRESSION. 14. A Geometrical Series, or, as it is more commonly called, a Geometrical Progression (GP), is a series in which each term after the first is formed by multiplying the preceding term by a constant number. See Art. 1, (2). 15. Evidently this definition... | |
| George Egbert Fisher - 1901 - 622 σελίδες
...chapter a few simple and yet very important series will be discussed. ARITHMETICAL PROGEESSION. 3. An Arithmetical Series, or, as it is more commonly...adding a constant number to the preceding term. See Art. 1, (1). 4. Evidently this definition is equivalent to the statement, that the difference between... | |
| George Egbert Fisher, Isaac Joachim Schwatt - 1901 - 324 σελίδες
...PROGRESSION. 17. A Geometrical Series, or, as it is more commonly called, a Geometrical Progression (G-. P.), is a series in which each term after the first is formed by multiplying the preceding term by a constant number. See Art. 1, (2). 18. Evidently this definition... | |
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