An elementary course of practical mathematics, Del 11860 |
Fra bogen
Resultater 1-5 af 32
Side 2
... number stands before it to which it can be added ( as +7 ) , the number to which the sign ... quantity is either to be added to , or subtracted from , the first ... simple value of each of the following expressions ? 7x9 ; 9x7 ; 5 × 8 × 2 ...
... number stands before it to which it can be added ( as +7 ) , the number to which the sign ... quantity is either to be added to , or subtracted from , the first ... simple value of each of the following expressions ? 7x9 ; 9x7 ; 5 × 8 × 2 ...
Side 4
... quantity , as a , or the combination of any number of quantities , by multiplication or division , as ab cd ' b × c ... Simple Quantity is that which consists of a single term , as a3 or √ ( 3xy ) . 28. A Compound Quantity consists of ...
... quantity , as a , or the combination of any number of quantities , by multiplication or division , as ab cd ' b × c ... Simple Quantity is that which consists of a single term , as a3 or √ ( 3xy ) . 28. A Compound Quantity consists of ...
Side 5
... quantity , is called a Vinculum ; as m + n , or ( a + b - c ) , or Sax by It indicates that the compound - 3 2 ... simple quantity , or into a compound quantity in its simplest form . In Arithmetic the addition of a number always ...
... quantity , is called a Vinculum ; as m + n , or ( a + b - c ) , or Sax by It indicates that the compound - 3 2 ... simple quantity , or into a compound quantity in its simplest form . In Arithmetic the addition of a number always ...
Side 13
... simple quantity its use is obvious , but will be rendered more familiar by a few practical examples . EXERCISE 1. What are the simple numerical values of 3 × 22 and ( 3 × 2 ) 2 ? Ans . 12 and 36 . A. Of 5 × 42 and ( 5 × 4 ) 2 ? X 2 ...
... simple quantity its use is obvious , but will be rendered more familiar by a few practical examples . EXERCISE 1. What are the simple numerical values of 3 × 22 and ( 3 × 2 ) 2 ? Ans . 12 and 36 . A. Of 5 × 42 and ( 5 × 4 ) 2 ? X 2 ...
Side 14
... quantity within the vinculum , and not to any one of its terms . Thus ( a + ... quantities without the vinculum : a + ( b + c ) , a + ( b −c ) , απ − ( b + ... simple numerical value of each of the four compound quantities mentioned in ...
... quantity within the vinculum , and not to any one of its terms . Thus ( a + ... quantities without the vinculum : a + ( b + c ) , a + ( b −c ) , απ − ( b + ... simple numerical value of each of the four compound quantities mentioned in ...
Indhold
1 | |
5 | |
11 | |
13 | |
15 | |
22 | |
28 | |
31 | |
34 | |
36 | |
43 | |
46 | |
70 | |
73 | |
84 | |
92 | |
98 | |
102 | |
104 | |
105 | |
112 | |
144 | |
148 | |
155 | |
162 | |
166 | |
172 | |
177 | |
189 | |
194 | |
196 | |
214 | |
219 | |
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Almindelige termer og sætninger
a²+b² added Algebra ar² arithmetical progression binomial CHAPTER co-efficients common difference common ratio Completing the square compound quantities consequently containing cube root Cubic Equation denominator Divide dividend divisor equal EXAMPLE EXERCISE expressed Extract the square Find the square find the value four numbers four Quantities fourth geometrical progression given equation given quantity greater greatest common measure Hence integer last term least common multiple letters Multiply negative NOTE number of terms obtain preceding PROBLEM proved Quadratic Equation Quadratic Surd quan Quantities are Proportionals quotient radical sign Reduce remainder resolved RULE second term side simple factor simple quantity simplest form square root subtract THEOREM three numbers tion tities unknown quantity vinculum whole number
Populære passager
Side 187 - ... fourth ; if the multiple of the first be less than that of the second, the multiple of the third is also less than that of the fourth...
Side 220 - Iff a straight line be divided into any two parts, four times the rectangle contained by the whole line, and one of the parts, together with the square of the other part, is equal to the square of the straight line which is made up of the whole and that part.
Side 184 - When there is a series of quantities, such that the ratios of the first to the second, of the second to the third, of the third to the fourth, &c., are all equal ; the quantities are said to be in continued proportion.
Side 26 - 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.
Side 179 - Ratios tnat are equal to the same ratio are equal to one another.
Side 185 - If three quantities are proportional, the first is to the third, as the square of the first to the square of the second ; or as the square of the second, to the square of the third.
Side 184 - IF there be any number of magnitudes, and as many others, which, taken two and two, in a cross order, have the same ratio; the first shall have to the last of the first magnitudes the same ratio which the first of the others has to the last.
Side 93 - The first and fourth terms of a proportion are called the extremes, and the second and third terms, the means. Thus, in the foregoing proportion, 8 and 3 are the extremes and 4 and 6 are the means.
Side 180 - Division, when the difference of the first and second is to the second as the difference of the third and fourth is to the fourth...
Side 181 - If four magnitudes are in proportion, the sum of the first and second is to their difference as the sum of the third and fourth is to their difference.