Syllabi of the American Society for the Extension of University TeachingAmerican Society for Extension of University Teaching., 1891 |
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Стр. 5
... integer power of a quantity is the continued product of unity by that quantity . A negative integer power of a quantity is the continued quotient of unity by that quantity . The base is the quantity , whose power is sought . The ...
... integer power of a quantity is the continued product of unity by that quantity . A negative integer power of a quantity is the continued quotient of unity by that quantity . The base is the quantity , whose power is sought . The ...
Стр. 6
... integer power of a root . The denominator indicates the root , the numerator the power ; 2 2 e . g . , ( 64 ) * = ( † / 64 ) 2 = 42 = 16 . 10. EXPRESSIONS . An algebraic expression is a number or combination of num- bers written in ...
... integer power of a root . The denominator indicates the root , the numerator the power ; 2 2 e . g . , ( 64 ) * = ( † / 64 ) 2 = 42 = 16 . 10. EXPRESSIONS . An algebraic expression is a number or combination of num- bers written in ...
Стр. 9
... integer . n an even integer . 1. a2 + 2ab + b2 = ( a + b ) ( a + b ) = ( a + b ) 3 , 2. a2 . 2ab + b2 — ( a — b ) ( a — b ) — ( a — b ) 3 , 3. x2 + ( b + c ) x + bc = ( x + 6 ) ( x + c ) , 4. ( a2 — b2 ) = ( a + b ) ( a — b ) ...
... integer . n an even integer . 1. a2 + 2ab + b2 = ( a + b ) ( a + b ) = ( a + b ) 3 , 2. a2 . 2ab + b2 — ( a — b ) ( a — b ) — ( a — b ) 3 , 3. x2 + ( b + c ) x + bc = ( x + 6 ) ( x + c ) , 4. ( a2 — b2 ) = ( a + b ) ( a — b ) ...
Стр. 17
... integer part . The mantissa of a logarithm is its decimal part ; e . g . , log1,200 = 2.2030 ; log10.02 = 2.2030 ... integers , from I to say 10,000 , systematically arranged , form a table of logarithms . VIII . EVOLUTION ( ROOTS ) . I ...
... integer part . The mantissa of a logarithm is its decimal part ; e . g . , log1,200 = 2.2030 ; log10.02 = 2.2030 ... integers , from I to say 10,000 , systematically arranged , form a table of logarithms . VIII . EVOLUTION ( ROOTS ) . I ...
Стр. 19
... integer , equals √ñ · √- m wherein √n stands for the arithmetical mth root of n ; e . 8. , √ — 4 = 2√ — 1 . √ — I , Complexes are expressions having each a real and an imaginary term ; e . g . , 6+ √ − 2 . Conjugate imaginaries ...
... integer , equals √ñ · √- m wherein √n stands for the arithmetical mth root of n ; e . 8. , √ — 4 = 2√ — 1 . √ — I , Complexes are expressions having each a real and an imaginary term ; e . g . , 6+ √ − 2 . Conjugate imaginaries ...
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Algebra American Society angle Bank of England bank-note banking system Bimetallism Book Brook Farm bullion capital Celtic cents century Chaps circulation Civil coefficients coin continued fraction COURSE debased demand deposit Economic Encyclopædia Britannica English literature equal equation Essay exchange EXERCISES exponent expression EXTENSION OF UNIVERSITY factors formula fraction given gold and silver government paper money History increase industry integer interest issue Jevons Labor legal tender limit logarithm Lord Liverpool Mabinogion mantissa ment modern Monetary money market monopoly multiplied note-issue notes panic paper money payment period Poets Political Economy pounds precious metals principles problem quadrant question ratio Recoinage References.-Jevons root seigniorage Shakespeare standard subtract supply SYLLABUS THEOREM theory tion trade triangle trigonometric functions United UNIVERSITY EXTENSION LECTURES UNIVERSITY OF PENNSYLVANIA UNIVERSITY TEACHING unknown quantity value of money VIII Walker Write ΙΟ