The Elements of Algebra: Designed for the Use of Students in the UniversityJ. Smith, 1815 - 305 σελίδες |
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Αποτελέσματα 1 - 5 από τα 10.
Σελίδα 15
... dividend ; 5 3 - therefore × quotient = ; let these equal quantities 4 be multiplied by the same quantity , and the pro- ducts must be equal ; that is , 3.7 X 4 5 = - 7.5 X > quotient 5 7 35 21 35 or × quotient ; but 35 20 35 21 fore ...
... dividend ; 5 3 - therefore × quotient = ; let these equal quantities 4 be multiplied by the same quantity , and the pro- ducts must be equal ; that is , 3.7 X 4 5 = - 7.5 X > quotient 5 7 35 21 35 or × quotient ; but 35 20 35 21 fore ...
Σελίδα 19
... dividend exceeds the number in the divisor . Ex . Divide 77.922 by 3.7 . 77.922 3.7 21.06 : here there are three decimals in the dividend , and one in the divisor ; therefore , there are two in the quotient . The truth of this rule is ...
... dividend exceeds the number in the divisor . Ex . Divide 77.922 by 3.7 . 77.922 3.7 21.06 : here there are three decimals in the dividend , and one in the divisor ; therefore , there are two in the quotient . The truth of this rule is ...
Σελίδα 20
... dividend does not contain as many decimals as the divisor , cyphers must be added to the right of the decimals in the dividend , till that is the case . Ex . Divide 36 by .012 . 36 = 36.000 ; and 36.000 divided by .012 is 3000 ...
... dividend does not contain as many decimals as the divisor , cyphers must be added to the right of the decimals in the dividend , till that is the case . Ex . Divide 36 by .012 . 36 = 36.000 ; and 36.000 divided by .012 is 3000 ...
Σελίδα 25
... dividend over the divisor * By quantities , we understand such magnitudes as can be represented by numbers ; we may therefore without impropriety speak of the multiplication , division , & c . of quantities by each other . Ex . 9 . px3 ...
... dividend over the divisor * By quantities , we understand such magnitudes as can be represented by numbers ; we may therefore without impropriety speak of the multiplication , division , & c . of quantities by each other . Ex . 9 . px3 ...
Σελίδα 38
... dividend , the other part of the dividend , with the sign determined by the last rule , is the quotient . abc Thus , ab = c ; because ab multiplied by c gives abc . If we first divide by a , and then by b , the result abc will be the ...
... dividend , the other part of the dividend , with the sign determined by the last rule , is the quotient . abc Thus , ab = c ; because ab multiplied by c gives abc . If we first divide by a , and then by b , the result abc will be the ...
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Συχνά εμφανιζόμενοι όροι και φράσεις
abscissa algebraical quantities annuity arithmetical progression assumed binomial biquadratic coefficients common denominator conic section cube root cubic equation curve decimal Diff difference divided dividend division divisor equa equal expressed factors find the sum former fraction geometrical progression greater greatest common measure greatest root hence impossible roots increment integral last term least common multiple less Let the roots limiting equation logarithm m.m+r m+r.m+2r manner multiplied negative roots nth term numerator and denominator obtained odd number ordinates original equation parabola positive possible roots present value probability proportionals proposed equation quadratic surds quan quotient ratio reduced remainder represented shillings signs simple equation square root substituted subtracted suppose supposition taken tion tities unity unknown quantity vulgar fraction whole number
Δημοφιλή αποσπάσματα
Σελίδα 64 - This process of adding the square of half the coefficient of the first power of the unknown quantity to the first member, in order to make it a perfect square, is called COMPLETING THE SQUARE.
Σελίδα 44 - Divide this quantity, omitting the last figure, by twice the part of the root already found, and annex the result to the root and also to the divisor, then multiply the divisor as it now stands by the part of the root last obtained for the subtrahend.
Σελίδα 52 - Find the value of one of the unknown quantities, in terms of the other and known quantities...
Σελίδα 37 - Now .} of f- is a compound fraction, whose value is found by multiplying the numerators together for a new numerator, and the denominators for a new denominator.
Σελίδα 73 - Ratio is the relation which one quantity bears to another in respect of magnitude, the comparison being made by considering what multiple, part, or parts, one is of the other.
Σελίδα 44 - Divide the number thus formed, omitting the last figure, by twice the part of the root already obtained, and annex the result to the root and also to the divisor. Then multiply the divisor, as it now stands, by the part of the root last obtained, and subtract the product from the number formed, as above mentioned, by the first remainder and second period. If there be more periods- to be brought down, the operation must be repeated.
Σελίδα 13 - Multiply as in whole numbers, and point off as many decimal places in the product as there are in both multiplicand and multiplier. DIVISION. Divide as in whole numbers, and point off...
Σελίδα 73 - If the product of two quantities be equal to the product of two others, two of them may be made the extremes and the other two the means of a proportion.
Σελίδα 73 - 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.
Σελίδα 50 - Let the equation first be cleared of fractions ; then transpose all the terms which involve the unknown quantity to one side of the equation, and the known quantities to the other...