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- A compound expression in which all the terms are of the same dimension is said to be homogeneous.
- Base Two Numerals
- Something about Mathematical Sentences
ADDITION AND SUBTRACTION 32. We know, from Arithmetic, that the operations of addition and subtraction are mutually opposed. If we add to and subtract from the same number some other number, we shall not alter the number with which we started. For example, suppose we start with 7. Add and subtract 3, thus: 7 + 3—3 = 7; adding and subtracting 3 has not altered the 7. This is true in Algebra. In Arithmetic we can add together two or more abstract numbers and express them more shortly as a single number, thus : 2 + 3 + 5 = 10; but in Algebra we can only add together and express more shortly terms which are alike, thus: 2a + 3a + 5a = 10a. Terms which are unlike cannot be added together; thus a + b + c cannot be expressed in a shorter form. 33. The rules for addition are as follows: —
Remember that when no numerical coefficient is expressed the coefficient 1 is understood. 34. Subtraction. — If we add together —7 and 20, we get 13. If we subtract + 7 from 20, we get 13. Therefore to subtract + 7 from 20 gives the same result as adding -7 to 20. Conversely, since +7 added to 20 gives 27, we might infer that —7 subtracted from 20 would give 27, and this would be correct. Hence we can also infer a general rule for subtraction, viz.: — Change the signs of all the terms in the express-ion which has to lie subtracted, and then proceed as in addition. For example: — Subtract 3a—4b from 8a + 2b. Set down as in addition, and change the signs in the lower line, thus: 8a +2b -3a+4b 5a+6b By adding, we get 5a + 6i as the difference required. In working subtraction sums, the signs in the lower lines should be changed mentally. The above sum would then appear thus:
The actual process of working this sum after setting it down would be as follows: — Begin with the a's, minus 3 and plus 8; the plus is the larger by 5; therefore set down 5a, omitting the plus sign because 5a is the first term. Again, plus 4 and plus 2 give plus 6; therefore set down plus 6b. 35. As in addition, like terms must be arranged under like terms. Take another example. From 5a3 + 5a2 — 7a + 3a4—5 take 5a2 — 6a + 7 — 2a4 + 2a3. Arrange in order thus:
Suppose +2 × -3 or -2 × +3. Evidently the product will not be the same in either of these cases as in +2 × +3. Therefore we assume that +2 × -3 = -6 and -2 × +3= -6. Therefore, when one term has a plus sign and the other term has a minus sign the product is minus. Again, suppose -2 × -3. This is different from the last two cases, and we assume that -2 × -3 = +6. Therefore, when two terms with minus signs are multiplied together the product is plus. From these results we can infer the rule of signs.
(+a)2 =+a × +a =+a2 = a2. (-a)2 =-a × -a =+a2 = a2. (+a)3 =+a × +a ×+a =+a3 = a3. (-a)3 =-a × -a ×-a = -a3. We see that a plus quantity raised to any power produces a plus result; a minus quantity raised to an even power produces a plus result, e.g., (-a)6 = a6; but a minus quantity raised to an odd power produces a minus result, e.g., (-a)7 = -a7. Again, with roots √(a2) = either +a or -a, since + a × +a = a2, and -a × - a = a2 also. So that the square root of a positive or plus quantity is either plus or minus; that is, every positive quantity which is an exact square has two roots, these roots being of opposite sign — the one plus and the other minus. Since like signs produce plus, we cannot find the square root of any negative or minus quantity, e.g., √(-a2) is impossible quantity, for - a ×- a = +a2, and a × a = +a2. Again, 3√(+a3) = +a3, since +a × +a × +a = +a3; and 3√(-a3) = -a3, since -a × -a × -a = -a3. We see, therefore, that apparently there is only one real or possible cube root of a given quantity, but this given quantity may be either plus or minus. Similarly, for higher powers; if we are asked to find the 4th, 6th, 8th, or any even root of a, given quantity, we can only do so when the given quantity is plus, and then we can find two real roots, one of each sign. But, if we are asked to find the 5th, 7th, 9th, or any odd root of a given quantity, we may be able to do so whatever the sign of the quantity is, but we can only find one real root, and the sign of this root will be the same as the sign of the given quantity. 40. These conclusions must be understood to be true only in a limited sense. It is only in a few cases that any root can be obtained exactly; as, for example, the square roots of 4, 9, 16, &c., of a2, a4, a6, &g. ; the cube roots of 8, 27, &o., and of a3, a6, a9, &c. But we can calculate roots of numbers to some required degree of accuracy, or we can express the roots algebraically without actually calculating them, e.g., 5√(a4), 7√(a2), 8√(a3), &g. The student also will learn afterwards to consider that every quantity has just as many roots as the power of the root, e.g., there are 5 fifth roots of any quantity, 6 sixth roots, 7 seventh roots, and so on. One or more of these roots will be real, and the rest only imaginary. 41. We have already seen that when any term is multiplied by itself the product may be expressed in a simple form by the use of an index or power. Thus a×a=a2; b×b×b=b3; c×c×c×c=c4; and so on. By reversing the process, b4=b×b×b ×b and b×b= b2. Therefore b4×b2=b×b×b ×b ×b ×b =b6. Hence we infer that different powers of the same form may be multiplied by writing the quantity with an index equal to the sum of the indices of the multipliers. In the above example, 4 + 2 = 6; therefore b4×b2 =b6. Similarly, b3×b5 =b8. Also, since a= a1, a2 × a= a3, a4 × a= a5; and so on. Also we have seen that when two different terms are multiplied together the product may be expressed by writing the two terms side by side. Thus: a × b = ab; c2 ×d4 =c2d4.
2 ×3 ×4 = 2 ×4 ×3 = 3 ×4 ×2 = 4 ×3 ×2, &c., for each product is equal to 24. So also in Algebra the terms in any product may be taken in any order. So that abc = acb = bca = bac = cab = cba. If, therefore, in Algebra we have to multiply together two or more simple factors, we may place the numerical factors all together, and we may gather together any factors which are powers of the same quantity, and apply the rule for the multiplication of indices. For example: 3a2 b3c4 × 2a b2 c3=3×2 × a2× a× b3× b2× c4× c3 =6× a3× b5 × c7=6a3b5c7. 43. In the multiplication of simple expressions like the above, the student will find it advisable to take the numbers first, then the letters in alphabetical order, and, lastly, to apply the rule of signs. 44. Dimension and degree. — If we take a simple expression and write down separately all the letters used as factors of the expression, and if we then count the letters, we obtain the number of the dimensions, or the degree of the term. Thus 3a2 b3 = 3×a×a×b×b×b, is of five dimensions, or of the fifth degree; or 3a2 b3 is of two dimensions in a, and of three dimensions in b. In multiplication, the dimensions of the product must be equal to the sum of the dimensions of the factors. With integral indices, the dimension or degree of any term is equal to the sum of all the indices; thus 3abc2 is of the fourth degree, the indices being 1, 1, 2. 45. The following considerations will enable the student to test the correctness of his work. Notice that — (1) There are as many lines as there are terms in the multiplier. (2) There are as -many terms in each line as there are
(3) With regard to signs, a plus sign in the multiplier will leave all the signs the same as in the multiplicand. Conversely, a minus sign in the multiplier will change all the signs of the multiplicand in the corresponding line of the product. (4) It is advisable to arrange both multiplicand and multiplier in descending powers of some letter, because by so doing we shall find that the products produced in the working will be easier to arrange in columns. 46. A compound expression in which all the terms are of the same dimension is said to be homogeneous. Since the dimension of every term in a product is equal to the sum of the dimensions of its factors, it follows that, if we multiply together two homogeneous expressions, we shall obtain a homogeneous product. 47. The following rules will therefore enable us to read off the product when two binomial expressions, such as x + 7 and x — 8, are multiplied together. (1) The first and last terms in the product are obtained by multiplying together the two first terms, and then the two last terms. (2) The coefficient of the middle term in the product is obtained by adding together, algebraically, the two last terms; e.g.,
Similar rules will hold if, instead of a number, we use any other kind of term for the second term in each multiplier; e.g., (a + 2b)(a + 3b) = a2 +5ab+6b2.
During the latter part of the seventeenth century a great German philosopher and mathematician Gottfried Wilhelm von Leibnitz (1646—1716), was doing research on the simplest numeration system. He developed a numeration system using only the symbols 1 and 0. This system is called a base two or binary numeration system. Leibnitz actually built a mechanical calculating machine which until recently was standing useless in a museum in Germany. Actually he made his calculating machine some 3 centuries before they were made by modern machine makers. The binary numeration system introduced by Leibnitz is used only in some of the most complicated electronic computers. The numeral 0 corresponds to off and the numeral 1 corresponds to on for the electrical circuit of the computer. Base two numerals indicate groups of ones, twos, fours, eights, and so on. The place value of each digit in 1101two is shown by the above words (on or off) and also by powers of 2 in base ten notation as shown below. The numeral 1101two means (1x23)4 + (1x22) + (0x2) + (1x1) = (1x8) + (1x4) + (0x2) + (lxl) = 8 + 4 + + 0 + 1 = 13. Therefore 1101two = 13
A base ten numeral can be changed to a base two numeral by dividing by powers of two. From the above you know that the binary system of numeration is used extensively in high-speed electronic computers. The correspondence between the two digits used in the binary system and the two positions (on and off) of a mechanical switch used in an electric circuit accounts for this extensive use. The binary system is the simplest5 place-value, power-position system of numeration. In every such numeration system there must be symbols for the numbers zero and one. We are using 0 and 1 because we are well familiar with them. The binary numeration system has the advantage of having only two digit symbols but it also has a disadvantage of using many more digits to name the same numeral in base two than in base ten. See for example: 476 = 111011100 two It is interesting to note that any base two numeral looks like a numeral in any other base. The sum of 10110 and 1001 appears the same in any numeration system, but the meaning is quite different. Compare these numerals: 10110 two 10110ten 10110seven
In this lesson we shall be concerned with the closure property. If we add two natural numbers, the sum will also be a natural number. For example, 5 is a natural number and 3 is a natural number. The sum of these two numbers, 8, is also a natural number. Following are other examples in which two natural numbers are being added and the sum is another natural number. 19+4 = 23 and only 23; 6+6=12 and only 12; 1429+357=1786 and only 1786. In fact, if you add any two natural numbers, the sum is again a natural number. Because this is true, we say that the set of natural numbers is closed under addition. Notice that in each of the above equations we were able to name the sum. That is, the sum of 5 and 3 exists, or there is a number which is the sum of 19 and 4. In fact, the sum of any two numbers exists. This is called the existence property. Notice also that if you are to add 5 and 3, you will get 8 and only 8 and not some other number. Since there is one and only one sum for 19+4, we say that the sum is unique. This is called the uniqueness property. Both uniqueness and existence are implied in the definition of closure. Now, let us state the closure property of addition. If a and b are numbers of a given set, then a+ b is also a number of that same set. For example, if a and b are any two natural numbers, then a + b exists, it is unique, and it is again a natural number. If we use the operation of subtraction instead of the operation of addition, we shall not be able to make the statement we made above. If we are to subtract natural numbers, the resullt is sometimes a natural number, and sometimes not. 11—6 = 5 and 5 is a natural number, while 9—9 = 0 and 0 is not a natural number. Consider the equation 4—7 = n. We shall not be able to solve it if we must have a natural number as an answer. Therefore, the set of natural numbers is not closed under subtraction. What about the operation of multiplication? Find the product of several pairs of natural numbers. Given two natural numbers, is there always a natural number which is the product of the two numbers? Every pair of natural numbers has a unique product which is again a natural number. Thus the set of natural numbers is closed under multiplication. In general, the closure property may be defined as follows: if x and y are any elements, not necessarily the same, of set A (A capital) and * (asterisk) denotes an operation *, then set A is closed under the operation asterisk if (x*y) is an element of set A. To summarize, we shall say that there are two operations, addition and multiplication, for which the set of natural numbers is closed. Given any two natural numbers x and y, x + y and x x y are again natural numbers. This implies that the sum and the product of two natural numbers exists. It so happens that with the set of natural numbers (but not with every mathematical system) the results of the operations of addition and multiplication are unique. It should be pointed out that it is practically impossible to find the sum or the product of every possible pair of natural numbers. Hence, we have to accept the closure property without proof, that is, as an axiom.
In all branches of mathematics you need to write many sentences about numbers. For example, you may be asked to write an arithmetic sentence that includes two numerals which may name the same number or even different numbers. Suppose that for your sentence you choose the numerals 8 and 11—3 which name the same number. You can denote this by writing the following arithmetic sentence, which is true: 8= 11—3. Suppose that you choose the numerals 9+6 and 13 for your sentence. If you use the equal sign ( = ) between the numerals you will get the following sentence 9+6=13. But do 9+6 and 13 both name the same number? Is 9+6= 13 a true sentence? Why or why not? You will remember that the symbol of equality ( = ) in an arithmetic sentence is used to mean is equal to. Another symbol that is the symbol of non-equality (≠) is used to mean is not equal to. When an equal sign ( = ) is replaced by a non-equal sign (≠), the opposite meaning is implied. Thus the following sentence (9+6≠13) is read: nine plus six is not equal to thirteen. Is it a true sentence? Why or why not? An important feature about a sentence involving numerals is that it is either true or false, but not both. A mathematical sentence that is either true or false, but not both is called a closed sentence. To decide whether a closed sentence containing an equal sign ( = ) is true or false, we check to see that both elements, or expressions, of the sentence name the same number. To decide whether a closed sentence containing a non-equal sign (≠) is true or false, we check to see that both elements do not name the same number. As a matter of fact, there is nothing incorrect or wrong, about writing a false sentence; in fact, in some mathematical proofs it is essential that you write false sentences. The important thing is that you must be able to determine whether arithmetic sentences are true or false. The following properties of equality will help you to do so. Reflexive: a = a Symmetric: If a = b, then b — a. Transitive: If a = b and b = c, then a = c. The relation of equality between two numbers satisfies these basic axioms for the numbers a, b, and c. Using mathematical symbols, we are constantly building a new language. In many respects it is more concise and direct than our everyday language. But if we are going to use this mathematical language correctly we must have a very good understanding of the meaning of each symbol used. You already know that drawing a short line across the = sign (equality sign) we change it to ≠ sign (non-equality sign). The non-equality symbol (≠) implies either of the two things, namely: is greater then or is less than. In other words, the sign of non-equality (≠) in 3+4≠6 merely tells us that the numerals 3+4 and 6 name different numbers; it does not tell us which numeral names the greater or the lesser of the two numbers. If we are interested to know which of the two numerals is greater we use the conventional symbols meaning less than (<) or greater than (>). These are inequality symbols or ordering symbols because they indicate order of numbers. If you want to say that six is less than seven, you will write it in the following way: 6<7. If you want to show that twenty is greater than five, you will write 20>5. The signs which express equality or inequality (=, ≠, >, <) are called relation symbols because they indicate how two expressions are related.
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