New School Algebra |
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Page 3
... dividend above the divisor with a horizontal line between them ; or by separating the dividend from the divisor by an oblique line , called the solidus . a Thus , or a / b , means the same as a ÷ b . b NOTE . The operation of adding b ...
... dividend above the divisor with a horizontal line between them ; or by separating the dividend from the divisor by an oblique line , called the solidus . a Thus , or a / b , means the same as a ÷ b . b NOTE . The operation of adding b ...
Page 19
... dividend is 20 and the quotient 5 ? if the dividend is a and the quotient b ? 6. What is the dividend , if the divisor is 4 , the quotient 3 , and the remainder 2 ? if the divisor is d , the quotient q , and the remainder r ? 7. What ...
... dividend is 20 and the quotient 5 ? if the dividend is a and the quotient b ? 6. What is the dividend , if the divisor is 4 , the quotient 3 , and the remainder 2 ? if the divisor is d , the quotient q , and the remainder r ? 7. What ...
Page 20
... dividend is 20 and the quotient 5 ? if the dividend is a and the quotient b ? 6. What is the dividend , if the divisor is 4 , the quotient 3 , and the remainder 2 ? if the divisor is d , the quotient q , and the remainder r ? 7. What ...
... dividend is 20 and the quotient 5 ? if the dividend is a and the quotient b ? 6. What is the dividend , if the divisor is 4 , the quotient 3 , and the remainder 2 ? if the divisor is d , the quotient q , and the remainder r ? 7. What ...
Page 46
... dividend , the given factor the divisor , and the required factor the quotient . Law of Signs in Division . X Since ( + a ) × ( + b ) = + ab , Since ( + a ) × ( − b ) = − ab , X X Since ( -a ) × ( + b ) = − ab , X Since ( -a ) ...
... dividend , the given factor the divisor , and the required factor the quotient . Law of Signs in Division . X Since ( + a ) × ( + b ) = + ab , Since ( + a ) × ( − b ) = − ab , X X Since ( -a ) × ( + b ) = − ab , X Since ( -a ) ...
Page 47
... dividend minus the exponent of the letter in the divisor . Division of Monomials . 1. Divide 24 a ' by 8 a5 . 24 a 8 a5 = 3a7-53 a2 . We obtain the factor 3 of the quotient by dividing 24 by 8 ; and the factor a2 of the quotient , by ...
... dividend minus the exponent of the letter in the divisor . Division of Monomials . 1. Divide 24 a ' by 8 a5 . 24 a 8 a5 = 3a7-53 a2 . We obtain the factor 3 of the quotient by dividing 24 by 8 ; and the factor a2 of the quotient , by ...
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Common terms and phrases
9 x² a²b a²b² a²x² ab² ab³ arithmetical arithmetical mean arithmetical series ax² binomial called cent change the sign coefficient cologarithm common factor Compound Expressions cube root denominator difference digits Divide dividend divisible divisor equal equation exact divisor EXERCISE exponent Extract the square feet Find the H. C. F. Find the number Find the sum find the value fraction geometrical series given number greater number harmonical series Hence highest common factor integral number logarithm mantissa miles an hour monomial Multiply negative number number of dollars number of terms parenthesis positive integer quadratic quotient ratio remainder Resolve into factors smaller number Solve square root Subtract surd THEOREM Transpose unknown numbers x²y x²y² xy² yards ΙΟ ах у² х² ху ху²
Popular passages
Page 330 - There are four numbers in geometrical progression, the second of which is less than the fourth by 24 ; and the sum of the extremes is to the sum of the means, as 7 to 3. What are the numbers ? Ans.
Page 10 - If an expression within a parenthesis is preceded by the sign +, the parenthesis may be removed without making any change in the signs of the terms of the expression.
Page 316 - The area of a circle varies as the square of its radius, and the area of a circle whose radius is 1 foot is 3.1416 square feet.
Page 166 - A person has a hours at his disposal. How far may he ride in a coach which travels b miles an hour, so as to return home in time, walking back at the rate of с miles an hour?
Page 370 - If the number is less than 1, make the characteristic of the logarithm negative, and one unit more than the number of zeros between the decimal point and the first significant figure of the given number.
Page 23 - Two men start from the same place and travel in the same direction ; one, 5 miles an hour ; the other, 7 miles an hour.
Page 56 - To multiply a polynomial by a monomial, multiply each term of the polynomial by the monomial and add the partial products: (6a — 3ft) x 3c = 18uc -96c.
Page 172 - If necessary, multiply the given equations by such numbers as will make the coefficients of one of the unknown numbers in the resulting equations of equal absolute value.
Page 317 - The volume of a sphere varies as the cube of its radius. If the...
Page 36 - From these four cases we see that subtracting a positive number is equivalent to adding an equal negative number ; and that subtracting a negative number is equivalent to adding an equal positive number.