First Lessons in Algebra: Embracing the Elements of the ScienceWiley & Putnam, 1839 - 252 sider |
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Resultat 1-5 av 13
Side 29
... changing the arrangement of the factors ; that is , 12ab is the same as abx 12 , or as ba x 12 , or as ax 12 xb ( See Arithmetic , § 22 ) . 35. Let us now multiply 3a2b2 by 2a2b , placed under the form 3a2b2 × 2a2b = 3 × 2aaaabbb ...
... changing the arrangement of the factors ; that is , 12ab is the same as abx 12 , or as ba x 12 , or as ax 12 xb ( See Arithmetic , § 22 ) . 35. Let us now multiply 3a2b2 by 2a2b , placed under the form 3a2b2 × 2a2b = 3 × 2aaaabbb ...
Side 32
... c , which gives ac - bc , we have got too much by a - b taken ' times ; that is , we have ad - db a -b C -d -bc ac- -ad + bd ac - bc - ad + bd . too much . Changing the signs , and subtracting this 32 FIRST LESSONS IN ALGEBRA .
... c , which gives ac - bc , we have got too much by a - b taken ' times ; that is , we have ad - db a -b C -d -bc ac- -ad + bd ac - bc - ad + bd . too much . Changing the signs , and subtracting this 32 FIRST LESSONS IN ALGEBRA .
Side 33
Embracing the Elements of the Science Charles Davies. too much . Changing the signs , and subtracting this from the first product ( Art . 30 ) , we have ( a — b ) ( cd ) = ac - bc - ad + bd . Let us suppose a = 10 , b = 6 , c = 5 , and d ...
Embracing the Elements of the Science Charles Davies. too much . Changing the signs , and subtracting this from the first product ( Art . 30 ) , we have ( a — b ) ( cd ) = ac - bc - ad + bd . Let us suppose a = 10 , b = 6 , c = 5 , and d ...
Side 70
... changing its sign . 70. We will now apply the preceding principles to the resolution of equations . 1. Take the equation 4x - 3 = 2x + 5 . By transposing the terms -3 and 2x , it becomes 70 FIRST LESSONS IN ALGEBRA . Resolution of ...
... changing its sign . 70. We will now apply the preceding principles to the resolution of equations . 1. Take the equation 4x - 3 = 2x + 5 . By transposing the terms -3 and 2x , it becomes 70 FIRST LESSONS IN ALGEBRA . Resolution of ...
Side 79
... changing the signs of both members , which does not destroy their equality . Verification . 126 126 . - + 21 = 42 + 21 = 63 = 3 2 6. A fish was caught whose tail weighed 976. , his head weighed as much as his tail and half his body ...
... changing the signs of both members , which does not destroy their equality . Verification . 126 126 . - + 21 = 42 + 21 = 63 = 3 2 6. A fish was caught whose tail weighed 976. , his head weighed as much as his tail and half his body ...
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First Lessons in Algebra: Embracing the Elements of the Science Charles Davies Uten tilgangsbegrensning - 1840 |
First Lessons in Algebra: Embracing the Elements of the Science Charles Davies Uten tilgangsbegrensning - 1839 |
First Lessons in Algebra: Embracing the Elements of the Science Charles Davies Uten tilgangsbegrensning - 1841 |
Vanlige uttrykk og setninger
algebraic quantities arithmetical means arithmetical progression binomial Binomial Theorem called cents common denominator common difference complete equation completing the square composed contain contrary sign cube decimal denotes Divide dividend division divisor dollars double product enunciation equation involving EXAMPLES exponent extracting the square fifth power figure find a number Find the square Find the sum Find the values following RULE four quantities fourth power geometrical progression Give the rule given number greater greyhound Hence last term least common multiple minus mixed quantity monomial Multiply negative number expressed number of terms obtain ounces of silver perfect square polynomial question quotient radical sign ratio Reduce remainder second degree second power second term simplest form square root Substituting this value take the equation tens third three terms tion transposing trinomial twice the product unknown quantity values of x Verification whence yards
Populære avsnitt
Side 230 - To express that the ratio of A to B is equal to the ratio of C to D, we write the quantities thus : A ; B ; : C : D; and read, A is to B as C to D.
Side 231 - Quantities are said to be in proportion by composition, when the sum of the antecedent and consequent is compared either with antecedent or consequent.
Side 155 - Obtain the exponent of each literal factor in the quotient by subtracting the exponent of each letter in the divisor from the exponent of the same letter in the dividend; Determine the sign of the result by the rule that like signs give plus, and unlike signs give minus.
Side 233 - AC and by clearing the equation of fractions we have BO=AD; that is, Of four proportional quantities, the product of the two extremes is equal to the product of the two means.
Side 175 - Since the square of a binomial is equal to the square of the first term, plus twice the product of the first term by the second, plus the square of the second...
Side 138 - 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 But if any of the products should be greater than the dividend, diminish the last figure of the root.
Side 214 - A merchant bought cloth for which he paid £33 15s., which he sold again at £2 8s. per piece, and gained by the bargain as much as one piece cost him : how many pieces did he buy ? Ans.
Side 35 - The square of the sum of two quantities is equal to the square of the first, plus twice the product of the first and second, plus the square of the second.
Side 214 - To find a number such that if you subtract it from 10, and multiply the remainder by the number itself, the product shall be 21. Ans. 7 or 3.
Side 230 - Of four proportional quantities, the first and third are called the antecedents, and the second and fourth the consequents ; and the last is said to be a fourth proportional to the other three taken in order...