Elements of AlgebraHilliard and Metcalf, 1825 - 276 pages |
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Page vii
... reduction of algebraic quantities Subtraction of Algebraic Quantities Rule for performing subtraction Multiplication of Algebraic Quantities Manner of indicating multiplication - What is to be understood by powers of a quantity Of ...
... reduction of algebraic quantities Subtraction of Algebraic Quantities Rule for performing subtraction Multiplication of Algebraic Quantities Manner of indicating multiplication - What is to be understood by powers of a quantity Of ...
Page x
... reduce to the same degree , any number of radical quantities of different degrees - To place under the radical sign a ... reduced to equations having only one 188 Formula of elimination in two equations of the second degree To determine ...
... reduce to the same degree , any number of radical quantities of different degrees - To place under the radical sign a ... reduced to equations having only one 188 Formula of elimination in two equations of the second degree To determine ...
Page xv
... reduce to the same degree , any number of radical quantities of different degrees · To place under the radical sign a ... reduced to equations having only one 188 Formula of elimination in two equations of the second degree To determine ...
... reduce to the same degree , any number of radical quantities of different degrees · To place under the radical sign a ... reduced to equations having only one 188 Formula of elimination in two equations of the second degree To determine ...
Page xv
... reducing all the terms of a progression by quotients from the expression of the sum Division of m by m 1 , continued to infinity 222 ib . 226 ib . 229 ib . 231 234 ib . 235 236 237 238 239 - 240 In what cases the quotient of this ...
... reducing all the terms of a progression by quotients from the expression of the sum Division of m by m 1 , continued to infinity 222 ib . 226 ib . 229 ib . 231 234 ib . 235 236 237 238 239 - 240 In what cases the quotient of this ...
Page 5
... reduces itself to augmenting by the half of b , or by . It is evident then that α 2 - b 2 α b b + b becomes ; and by trans- lating this expression we learn , that of the two parts sought the greater is equal to half of the number to be ...
... reduces itself to augmenting by the half of b , or by . It is evident then that α 2 - b 2 α b b + b becomes ; and by trans- lating this expression we learn , that of the two parts sought the greater is equal to half of the number to be ...
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Common terms and phrases
a² b³ algebraic Algebraic Quantities Arith arithmetic becomes binomial coefficient common divisor consequently cube root deduce denominator denoted divided dividend division double the product employed entire number enunciation equa equal to zero evident example exponent extract the root extract the square figures follows formula fraction given in art given number gives greater greatest common divisor last term letters logarithm method multiplicand multiplied negative number of arrangements number of factors observed obtain operation perfect square proposed equation proposed number proposed quantity quan question quotient radical quantities radical sign reduced remainder represent resolve result rule given second degree second term simple quantities square root subtract suppose tens terms involving tion tities units unity unknown quantity vulgar fractions whence whole numbers
Popular passages
Page 91 - Which proves that the square of a number composed of tens and units, contains the square of the tens plus twice the product of the tens by the units, plus the square of the units.
Page 23 - RULE. Multiply all the terms of the multiplicand by each term of the multiplier, observing that like signs give plus in the product, and unlike signs minus.
Page 125 - Adding to the trial-divisor 3 ab, that is, three times the product of the first term of the root by the second, and...
Page 256 - To divide the number 90 into four such parts, that if the first be increased by 2, the second diminished by 2, the third multiplied...
Page 256 - A hare is 50 leaps before a greyhound, and takes 4 leaps to- the greyhound's 3, but 2 of the greyhound's leaps are as much as 3 of the hare's ; how many leaps must the greyhound take to catch the hare ? Ans. 300.
Page 233 - From what has preceded, we perceive that the value of a fraction is the quotient arising from the division of the numerator by the denominator, or from the expression of this division.
Page 256 - There is a fish whoso tail weighs 9 pounds, his head weighs as much as his tail and half his body, and his body weighs as much as his head and his tail ; what is the whole weight of the fish ? Ans.
Page 112 - Therefore, in the third and fourth forms, when q is greater than p2, that is, when the known term is negative, and greater than the square of half the coefficient of the first power of x, both values of the unknown quantity are impossible.
Page 98 - This process, founded upon what was laid down in article 96, that the square of a fraction is expressed by the square of the numerator divided by the square of the denominator, may evidently be applied to any kind of fraction whatever, and more readily to decimals than to others.
Page 256 - A man has a lease for 99 years ; and being asked how much of it was already expired, answered, that two thirds of the time past was equal to four fifths of the time to come. Required the time past, and the time to come.