Numbers Symbolized: An Elementary AlgebraD. Appleton, 1889 - 364 páginas |
Dentro del libro
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Página vii
... Algebraic subtraction · • Definitions of subtraction Principle of subtraction and applications Subtraction of monomials Algebraic multiplication . Definitions of multiplication Multiplication of monomial by monomial Multiplication of ...
... Algebraic subtraction · • Definitions of subtraction Principle of subtraction and applications Subtraction of monomials Algebraic multiplication . Definitions of multiplication Multiplication of monomial by monomial Multiplication of ...
Página viii
... algebraic involution - Definitions and prin- ciples . 62 Involution of monomials 64 Squaring of binomials - Principles and applications Cubing of binomials - Principles and applications Composition - Definitions and general principles ...
... algebraic involution - Definitions and prin- ciples . 62 Involution of monomials 64 Squaring of binomials - Principles and applications Cubing of binomials - Principles and applications Composition - Definitions and general principles ...
Página ix
An Elementary Algebra David Martin Sensenig. CHAPTER II . ALGEBRAIC FRACTIONS . Preliminary definitions · Reduction of fractions - Definition and ... Algebraic evolution - Definitions and principles Roots of numerical quantities CONTENTS .
An Elementary Algebra David Martin Sensenig. CHAPTER II . ALGEBRAIC FRACTIONS . Preliminary definitions · Reduction of fractions - Definition and ... Algebraic evolution - Definitions and principles Roots of numerical quantities CONTENTS .
Página x
An Elementary Algebra David Martin Sensenig. Algebraic evolution - Definitions and principles Roots of numerical quantities by factoring . Roots of monomials Square root of a polynomial . Square root of numbers Cube root of polynomials ...
An Elementary Algebra David Martin Sensenig. Algebraic evolution - Definitions and principles Roots of numerical quantities by factoring . Roots of monomials Square root of a polynomial . Square root of numbers Cube root of polynomials ...
Página 12
... the symbols + ( plus ) and — ( minus ) , and are called Positive and Negative Quantities . - Note . For complete definitions , see pages 298 and 299 . CHAPTER I. INTEGRAL QUANTITIES . Algebraic Addition . EXERCISE B. 12 ELEMENTARY ALGEBRA .
... the symbols + ( plus ) and — ( minus ) , and are called Positive and Negative Quantities . - Note . For complete definitions , see pages 298 and 299 . CHAPTER I. INTEGRAL QUANTITIES . Algebraic Addition . EXERCISE B. 12 ELEMENTARY ALGEBRA .
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Numbers Symbolized: An Elementary Algebra David M. (David Martin) Sensenig Sin vista previa disponible - 2012 |
Términos y frases comunes
a b c a+b)² a+b)³ a+b+c a² b² a² b³ a²x² a³ b² a³ b³ acres arithmetical arithmetical progression bushels cent Clear of fractions coefficient complete divisor Complete the square cube root Definitions and Principles denominator difference Divide dividend divisible dollars exponent Extract the square feet Find the numbers Find the value geometrical progression horse Illustration Illustrations.-1 last term miles minuend monomial Multiply negative quantity number of terms polynomial positive quantity quadratic equation quan quantities equals quotient radical ratio Reduce Required the number rods SIGHT EXERCISE Solution Solve square root Subtract surd tity Transpose trial divisor trinomial twice unknown quantities x² y¹ x² y² x² y³ x³ y² x³ y³
Pasajes populares
Página 40 - AXIOM is a self-evident truth ; such as, — 1. Things which are equal to the same thing, are equal to each other. 2. If equals be added to equals, the sums will be equal. 3. If equals be taken from equals, the remainders will be equal. 4. If equals be added to unequals, the sums will be unequal. 5. If equals be taken from unequals, the remainders will be unequal. 6. Things which are double of the same thing, or of equal things, are equal to each other.
Página 160 - ... term is found by multiplying the coefficient of the preceding term by the exponent of the leading letter of the same term, and dividing the product by the number which marks its place.
Página 74 - Divide the first term of the dividend by the first term of the divisor, and write the result as the first term of the quotient.
Página 278 - ... that is, Any term of a geometric series is equal to the product of the first term, by the ratio raised to a power, whose exponent is one less than the number of terms.
Página 174 - At the left of the dividend write three times the square of the root already found, for a trial divisor ; divide the first term of the dividend by this divisor, and write the quotient for the next term of the root.
Página 260 - In a series of equal ratios, the sum of the antecedents is to the sum of the consequents as any antecedent is to its consequent.
Página 169 - Tlie result will be the complete divisor. Multiply the complete divisor by the last term of the root found, and subtract this product from the dividend.
Página 153 - A and B can do a piece of work in 4 days, A and C in 6 days...
Página 271 - ... the sum of the terms. The first term and last term are called the extremes, and all the terms between the extremes are called arithmetical means.
Página 300 - The product of two binomials having a common term equals the square of the common term, plus the algebraic sum of the other two terms into the common term, and the product of the unlike terms.