An Introduction to Algebra: Being the First Part of a Course of Mathematics : Adapted to the Method of Instruction in the American CollegesHowe & Spalding, 1820 - 332 sider |
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Side
... Binomial Theorem , XVIII . Evolution of Compound Quantities , Composition and Resolution of the higher Equations , XXI . Application of Algebra to Geometry , XXII . Equations of Curves , 226 233 242 252 259 278 292 308 INTRODUCTORY ...
... Binomial Theorem , XVIII . Evolution of Compound Quantities , Composition and Resolution of the higher Equations , XXI . Application of Algebra to Geometry , XXII . Equations of Curves , 226 233 242 252 259 278 292 308 INTRODUCTORY ...
Side 11
... binomial . Thus a + b and a - bare binomials . The latter is also called a residual quantity , because it expresses the difference of two quantities , or the remainder , after one is taken from the other . A compound quantity consisting ...
... binomial . Thus a + b and a - bare binomials . The latter is also called a residual quantity , because it expresses the difference of two quantities , or the remainder , after one is taken from the other . A compound quantity consisting ...
Side 88
... binomial and residual quantities oc- çur so frequently in algebraic processes , that it is important to make them familiar . If we multiply a + h into itself , and also a - h , We have a + h a + h a2 + ah And a - h a - h + ah + h2 a2 + ...
... binomial and residual quantities oc- çur so frequently in algebraic processes , that it is important to make them familiar . If we multiply a + h into itself , and also a - h , We have a + h a + h a2 + ah And a - h a - h + ah + h2 a2 + ...
Side 89
... BINOMIAL , THE TERMS OF WHICH ARE BOTH POSITIVE , IS EQUAL TO THE SQUARE OF THE FIRST TERM , + TWICE THE PRODUCT OF THE TWO TERMS ; THE SQUARE OF THE LAST TERM . And the square of a residual quantity , is equal to the square of the ...
... BINOMIAL , THE TERMS OF WHICH ARE BOTH POSITIVE , IS EQUAL TO THE SQUARE OF THE FIRST TERM , + TWICE THE PRODUCT OF THE TWO TERMS ; THE SQUARE OF THE LAST TERM . And the square of a residual quantity , is equal to the square of the ...
Side 109
... binomial and re- sidual quantities , which it will be proper to attend to in this place . It has been shown , ( Art . 214 , ) that the square of a binomial quantity consists of three terms , two of which are complete powers , and the ...
... binomial and re- sidual quantities , which it will be proper to attend to in this place . It has been shown , ( Art . 214 , ) that the square of a binomial quantity consists of three terms , two of which are complete powers , and the ...
Vanlige uttrykk og setninger
12 rods abscissa added algebraic antecedent applied arithmetical become binomial calculation co-efficients common difference Completing the square compound quantity consequent contain cube root cubic equation curve Divide the number dividend division divisor dollars equa errour Euclid exponents expression extracting factors fourth fraction gallons geometrical geometrical progression given quantity greater greatest common measure Hence inches infinite series inverted last term length less letters manner mathematics Mult multiplicand multiplied or divided negative quantity notation nth power nth root number of terms ordinate parallelogram perpendicular positive preceding prefixed principle Prob proportion proposition quadratic equation quan quotient radical quantities radical sign ratio reciprocal Reduce the equation remainder rule sides square root substituted subtracted subtrahend supposed supposition third tion tity Transp Transposing triangle twice unit unknown quantity varies α α
Populære avsnitt
Side 298 - If a straight line be divided into any two parts, the square of the whole line is equal to the squares of the two parts, together with twice the rectangle contained by the parts.
Side 186 - Conversely, if the product of two quantities is equal to the product of two other quantities, the first two may be made the extremes, and the other two the means of a proportion.
Side 199 - If three quantities are proportional, the first is to the third, as the square of the first, to the square of the second ; or as the square of the second, to the square of the third.
Side 231 - 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.
Side 203 - What two numbers are those, whose difference, sum, and product, are as the numbers 2, 3, and 5, respectively ? Ans.
Side 42 - As the product of the divisor and quotient is equal to the dividend, the quotient may be found, by resolving the dividend into two such factors, that one of them shall be the divisor. The other will, of course, be the quotient. Suppose abd is to be divided by a. The factors a and Id will produce the dividend.
Side 215 - THE EXTREMES IS EQUAL TO THE SUM OF ANY OTHER TWO TERMS EQUALLY DISTANT FROM THE EXTREMES.
Side 81 - ... of this part. At the end of the third year, his original stock was doubled. What was that stock ? Ans.
Side 237 - Divide one of the quantities by the other, and the preceding divisor by the last remainder, till nothing remains ; the last divisor will be the greatest common measure.