Elements of algebra, compiled from Garnier's French translation of L. Euler. To which are added, solutions of several miscellaneous problems1824 |
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Resultat 1-5 av 56
Side 6
... number , since in Algebra simple quantities are numbers considered with respect to the sign which precede or affect ... terms , viz . 0 + 1 + 2 + 3 + 4+ 5+ 6+ 7+ 8+ 9+ 10 & c . ad infinitum . 16. But if instead of continuing the ...
... number , since in Algebra simple quantities are numbers considered with respect to the sign which precede or affect ... terms , viz . 0 + 1 + 2 + 3 + 4+ 5+ 6+ 7+ 8+ 9+ 10 & c . ad infinitum . 16. But if instead of continuing the ...
Side 16
... terms to add together , we frequently do nothing more than signify the addition by signs , placing each formula ... number d + e + f is to be added to the other , it is clear that this must be done by first adding to it + d then + e and then ...
... terms to add together , we frequently do nothing more than signify the addition by signs , placing each formula ... number d + e + f is to be added to the other , it is clear that this must be done by first adding to it + d then + e and then ...
Side 17
... number overadded . Taking away then these 6 units , by writing them with their negative sign , we shall get the true sum , 12-8 + 15-6 . From which it appears that these sums may always be found by stating all the terms , and giving to ...
... number overadded . Taking away then these 6 units , by writing them with their negative sign , we shall get the true sum , 12-8 + 15-6 . From which it appears that these sums may always be found by stating all the terms , and giving to ...
Side 34
... number , and the other a fraction , whose numerator is less than its denomi- nator . These fractions are called ... terms nu- merator and denominator owe their origin . For in the pre- ceding fraction , the number under the line denotes ...
... number , and the other a fraction , whose numerator is less than its denomi- nator . These fractions are called ... terms nu- merator and denominator owe their origin . For in the pre- ceding fraction , the number under the line denotes ...
Side 37
... the multiplication of both its terms by the same number . For it follows from this , that if the numerator and denominator of a fraction be both divided D 3 divided by the same number , the value of the PROPERTIES OF FRACTIONS . 37.
... the multiplication of both its terms by the same number . For it follows from this , that if the numerator and denominator of a fraction be both divided D 3 divided by the same number , the value of the PROPERTIES OF FRACTIONS . 37.
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Vanlige uttrykk og setninger
already seen arithmetic means arithmetic series arithmetical progression assume binomial cent CHAP coefficient common difference Completing the square consequently consider contains cube root decimal determine divided dividend divisible equal equation evident example exponent expressed Extracting the root factors find the greatest Find the sum find the values formula four roots fourth term geometric means geometrical progression given number gives greater number greatest common divisor greatest common measure Hence infinite series infinitum instance integer irrational last term less letters logarithm manner method multiplied negative numbers number of permutations number of terms obtain quadratic surds quotient radical sign ratio reduced remainder represented required to find rule second degree second term square root subtracted suppose third degree three numbers tion transposition unity unknown quantity whence whole number
Populære avsnitt
Side 46 - Now .} of f- is a compound fraction, whose value is found by multiplying the numerators together for a new numerator, and the denominators for a new denominator.
Side 24 - 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 228 - There are three numbers in geometrical progression ; the sum of the first and second of which is 9, and the sum of the first and third is 15.
Side 36 - Multiplying or dividing both the numerator and denominator of a fraction by the same number does not change the value of the fraction.
Side 248 - The logarithm of a product is equal to the sum of the logarithms of its factors.
Side 58 - We call this new species of numbers, irrational numbers ; they occur whenever we endeavour to find the square root of a number which is not a square. Thus, 2 not being a perfect square, the square root of 2, or the number which, multiplied by itself, would produce 2, is an irrational quantity. These numbers are also called surd quantities, or incommensurables.
Side 243 - Find two numbers, such, that their sum, their product, and the difference of their squares shall be all equal to each other.
Side 77 - any quantity may be transferred from "one side of the equation to the other, by changing its sign ;" and and it is founded upon the axiom, that " if equals be added to " or subtracted from equals, the sums or remainders will be
Side 113 - Ans. 3 and 7 8. The difference of two numbers is 2, and the difference of their cubes is 98; required the numbers. Ans. 5 and 3 9.
Side 37 - If the numerator and denominator are both, multiplied or both divided by the same number, the value of the fraction will not be altered.