Elements of Algebra: Including Sturm's TheoremA. S. Barnes & Company, 1847 - 368 σελίδες |
Αναζήτηση στο βιβλίο
Αποτελέσματα 1 - 5 από τα 50.
Σελίδα 18
... known or given , and which are called known quantities ; and 2dly , Those whose values are unknown , which are called un- known quantities . The known quantities are represented by the first letters of the alphabet , a , b , c , d , & c ...
... known or given , and which are called known quantities ; and 2dly , Those whose values are unknown , which are called un- known quantities . The known quantities are represented by the first letters of the alphabet , a , b , c , d , & c ...
Σελίδα 19
... known , the greater could be found by adding to it the difference 19 ; or in other words , the less number , plus 19 , is equal to the greater . If , then , we make and x the less number , x + 19 the greater , 2x + 19 the sum . But from ...
... known , the greater could be found by adding to it the difference 19 ; or in other words , the less number , plus 19 , is equal to the greater . If , then , we make and x the less number , x + 19 the greater , 2x + 19 the sum . But from ...
Σελίδα 24
... known ; but since 3c cannot be taken from 2b , 2b is first subtracted from 4a , which gives 4a2b . Now , in subtracting the number of units contained in 2b , the number taken away from 4a , is too great by the number of units contained ...
... known ; but since 3c cannot be taken from 2b , 2b is first subtracted from 4a , which gives 4a2b . Now , in subtracting the number of units contained in 2b , the number taken away from 4a , is too great by the number of units contained ...
Σελίδα 33
... known principles , ( a + b ) 2 = ( a + b ) × ( a + b ) = a2 + 2ab + b2 , which result is the enunciation of the theorem in the language of Algebra . To apply this result to finding the square of the binomial we have Also , also , 5a2 + ...
... known principles , ( a + b ) 2 = ( a + b ) × ( a + b ) = a2 + 2ab + b2 , which result is the enunciation of the theorem in the language of Algebra . To apply this result to finding the square of the binomial we have Also , also , 5a2 + ...
Σελίδα 47
... known sign , and in this case , the quotient is presented under the form of a fraction , which we have already learned how to simplify ( Art . 51 ) . With respect to polynomial fractions , the following are cases which are easily ...
... known sign , and in this case , the quotient is presented under the form of a fraction , which we have already learned how to simplify ( Art . 51 ) . With respect to polynomial fractions , the following are cases which are easily ...
Περιεχόμενα
193 | |
206 | |
214 | |
220 | |
226 | |
232 | |
238 | |
244 | |
70 | |
79 | |
98 | |
104 | |
113 | |
119 | |
126 | |
132 | |
144 | |
151 | |
157 | |
163 | |
169 | |
175 | |
181 | |
187 | |
254 | |
262 | |
272 | |
279 | |
286 | |
292 | |
300 | |
307 | |
318 | |
327 | |
333 | |
341 | |
349 | |
361 | |
367 | |
Άλλες εκδόσεις - Προβολή όλων
Συχνά εμφανιζόμενοι όροι και φράσεις
affected algebraic quantities arithmetical arrangements becomes binomial called co-efficient common difference consequently contain continued fraction contrary signs cube root decimal deduced denominator dividend division entire number enunciation equa equal equation involving example exponent factors figure formula fourth given equation given number gives greater greatest common divisor hence inequality last term least common multiple less logarithm manner method monomial multiply nth root number of terms obtain operation ounces perfect square positive roots preceding problem progression proposed equation quan quotient real roots Reduce remainder required to find resolved result rule second degree second member second term simplest form square root substituted subtract superior limit suppose take the equation taken third tion transformed transposing unity unknown quantity whence whole number
Δημοφιλή αποσπάσματα
Σελίδα 277 - The characteristic of a number less than 1 is found by subtracting from 9 the number of ciphers between the decimal point and the first significant digit, and writing — 10 after the result.
Σελίδα 29 - Hence, for the multiplication of polynomials we have the following 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.
Σελίδα 348 - VARIATIONS of signs, nor the number of negative roots greater than the number of PERMANENCES. Consequence. 328. When the roots of an equation are all real, the number of positive roots is equal to the number of variations, and the number of negative roots to the number of permanences.
Σελίδα 33 - The square of the difference of two quantities is equal to the square of the first minus twice the product of the first by the second, plus the square of the second.
Σελίδα 111 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.
Σελίδα 298 - ... is equal to the sum of the products of the roots taken three and three ; and so on.
Σελίδα 204 - In each succeeding term the coefficient is found by multiplying the coefficient of the preceding term by the exponent of a in that term, and dividing by the number of the preceding term.
Σελίδα 182 - If the product of two quantities is equal to the product of two other quantities, two of them may be made the extremes, and the other two the means of a proportion.
Σελίδα 27 - We have seen that multiplying by a whole number is taking the multiplicand as many times as there are units in the multiplier.
Σελίδα 115 - ... equal to the square root of the numerator divided by the square root of the denominator.