An Introduction to Algebra: Upon the Inductive Method of InstructionHilliard, Gray & Company, 1837 - 276 σελίδες |
Αναζήτηση στο βιβλίο
Αποτελέσματα 1 - 5 από τα 38.
Σελίδα 9
... figures ; it will now be shown that the reasoning , previous to calculation , may receive as great assistance from another set of arbitrary signs . 1 Some of the signs have already been explained in Arithmetic ; they will here be ...
... figures ; it will now be shown that the reasoning , previous to calculation , may receive as great assistance from another set of arbitrary signs . 1 Some of the signs have already been explained in Arithmetic ; they will here be ...
Σελίδα 13
... figure written before a letter showing how many times the letter is to be taken , is called the coefficient of that letter . In the quantities 7 x , 15 x , 22 x ; 7 , 15 , 22 , are coefficients of x . The process of forming an equation ...
... figure written before a letter showing how many times the letter is to be taken , is called the coefficient of that letter . In the quantities 7 x , 15 x , 22 x ; 7 , 15 , 22 , are coefficients of x . The process of forming an equation ...
Σελίδα 67
... figures , because their value depends upon the place in which they stand . 3 a b multiplied by 2 cd , for instance , cannot be written 32 a b c d . If it is required to express the multiplication of the figures as well as of the letters ...
... figures , because their value depends upon the place in which they stand . 3 a b multiplied by 2 cd , for instance , cannot be written 32 a b c d . If it is required to express the multiplication of the figures as well as of the letters ...
Σελίδα 68
... figure a little above the letter , and a little to the right of it , to show how many times that letter is a factor in the product . The figure 3 over the a shows , that a enters three times as a factor ; and the 2 over the b , that b ...
... figure a little above the letter , and a little to the right of it , to show how many times that letter is a factor in the product . The figure 3 over the a shows , that a enters three times as a factor ; and the 2 over the b , that b ...
Σελίδα 70
... figures . Add together 17+ 10 and 20 6. Now 20 - 6 is 14 and 17 + 10 + 206 is equal to 17 + 10 + 14 . From the above observations we derive the following rule for the addition of compound quantities . Write the quantities after each ...
... figures . Add together 17+ 10 and 20 6. Now 20 - 6 is 14 and 17 + 10 + 206 is equal to 17 + 10 + 14 . From the above observations we derive the following rule for the addition of compound quantities . Write the quantities after each ...
Περιεχόμενα
13 | |
19 | |
45 | |
66 | |
72 | |
74 | |
80 | |
81 | |
182 | |
189 | |
193 | |
195 | |
197 | |
202 | |
208 | |
217 | |
88 | |
89 | |
95 | |
102 | |
107 | |
112 | |
121 | |
131 | |
137 | |
142 | |
150 | |
159 | |
175 | |
221 | |
226 | |
228 | |
233 | |
239 | |
242 | |
254 | |
256 | |
260 | |
264 | |
267 | |
268 | |
Άλλες εκδόσεις - Προβολή όλων
An Introduction to Algebra Upon the Inductive Method of Instruction Warren Colburn Πλήρης προβολή - 1826 |
An Introduction to Algebra Upon the Inductive Method of Instruction Warren Colburn Πλήρης προβολή - 1831 |
An Introduction to Algebra upon the Inductive Method of Instruction Warren Colburn Πλήρης προβολή - 1844 |
Συχνά εμφανιζόμενοι όροι και φράσεις
12 rods 3d power 3d root 5th power a b c A's share a² b² a² b³ ac² added algebra algebraic quantities apples approximate root Arith arithmetic becomes binomial Binomial Theorem bought breadth bushels coefficient compound interest compound quantities consisting contained decimal difference divide the number dividend division divisor equal equation example exponent expression factor figure formula fourth fraction gallons gives greater Hence length less Let the learner letter logarithm merator miles multiplicand negative quantity number of terms observe pears question quotient remainder required to find rule second power second root second term shillings sold subtracted Suppose third power third root twice unknown quantity whole number yards zero
Δημοφιλή αποσπάσματα
Σελίδα 186 - The 3d power of (2 a — rf)4 is (2a — rf)^«+« = (2a — d)4x3=(2a — d)". That is, any quantity, which is already a power of a compound quantity, may be raised to any power by multiplying its exponent by the exponent of the power to which it is to be raised. 7. Express the 2d power of (3 b — c)4. 8. Express the 3d power of (a — c -J- 2 d)*. 9. Express the 7th power of (2 a* — 4 c3)3.
Σελίδα 2 - DISTRICT OF MASSACHUSETTS, TO WIT: District Clerk's Office. BE IT REMEMBERED, that on the...
Σελίδα 101 - 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. Multiply the whole divisor by the first term of the quotient, and subtract the product from the dividend.
Σελίδα 92 - It will be seen by the above section that if both the numerator and denominator be multiplied by the same number, the value of the fraction will not be altered...
Σελίδα 2 - District Clerk's Office. BE IT REMEMBERED, That on the seventh day of May, AD 1828, in the fifty-second year of the Independence of the UNITED STATES OF AMERICA, SG Goodrich, of the said District, has deposited in this office the...
Σελίδα 21 - A cask, which held 146 gallons, was filled with a mixture of brandy, wine, and water. In it there were 15 gallons of wine more than there were of brandy, and as much water as both wine and brandy. What quantity was there of each...
Σελίδα 232 - I, n, d, and. S; any three of which being given, the other two may be found, by combining the two equations. I shall leave the learner to trace these ' himself as occasion may require. Examples in Progression by Difference.
Σελίδα 35 - How many days did he work, and how many days was he idle ? Let x = the number of days he worked.
Σελίδα 229 - Hence, any term may be found by adding the product of the common difference by the number of terms less one, to the first term.
Σελίδα 273 - A gentleman bought a rectangular lot of valuable land, giving 10 dollars for every foot in the perimeter. If the same quantity had been in a square, and he had bought it in the same way, it would have cost him $33 less ; and if he had bought a square piece of the same perimeter he would have had 12^ rods more.