A Course of Mathematics: In Two Volumes. For the Use of the Royal Military Academy, Volume 1Gilberte and Rivington, 1841 - Mathematics |
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Page 13
... rule is obvious ; for any number multiplied by the component parts of another , must give the same product as if it were multiplied by that number at once . Thus , in the 1st example , 7 times the product of 8 by the given number , make ...
... rule is obvious ; for any number multiplied by the component parts of another , must give the same product as if it were multiplied by that number at once . Thus , in the 1st example , 7 times the product of 8 by the given number , make ...
Page 13
... Rule . Having placed the divisor before the dividend , as above directed , find how often the divisor is contained in as many figures of the dividend as are just necessary , and place the number on the right in the quotient . Multiply ...
... Rule . Having placed the divisor before the dividend , as above directed , find how often the divisor is contained in as many figures of the dividend as are just necessary , and place the number on the right in the quotient . Multiply ...
Page 14
... Rule . Having placed the divisor before the dividend , as above directed , find how often the divisor is contained in as many figures of the dividend as are just necessary , and place the number on the right in the quotient . Multiply ...
... Rule . Having placed the divisor before the dividend , as above directed , find how often the divisor is contained in as many figures of the dividend as are just necessary , and place the number on the right in the quotient . Multiply ...
Page 17
... rule may be given as follows ; and the example worked will show the nature of the notation employed . Let the several remainders ( reckoned backwards ) be r1 , 72 , 73 , and the divisors which gave them be d1 , d2 , dз , . . . . Then ...
... rule may be given as follows ; and the example worked will show the nature of the notation employed . Let the several remainders ( reckoned backwards ) be r1 , 72 , 73 , and the divisors which gave them be d1 , d2 , dз , . . . . Then ...
Page 26
... RULES FOR REDUCTION . I. When the Numbers are to be reduced from a Higher Denomination to a Lower : MULTIPLY the number in ... rule by division . And the like , it is evident , will be true in the reduction of numbers consisting of any ...
... RULES FOR REDUCTION . I. When the Numbers are to be reduced from a Higher Denomination to a Lower : MULTIPLY the number in ... rule by division . And the like , it is evident , will be true in the reduction of numbers consisting of any ...
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Common terms and phrases
ABCD algebraic altitude arithmetical arithmetical progression base bisect breadth centre chord circle circumference coefficients common cone cosec cube root decimal denominator denoted diagonal diameter difference dihedral angle distance divided divisor draw drawn equal equation equiangular EXAMPLES expression figure fraction frustum geometrical given line greater hence inscribed integer intersection join length less lineation logarithms mantissa measure meeting method multiplied parallel parallel ruler parallelogram perpendicular plane polygon prism PROBLEM proportional quantity quotient radii radius ratio rectangle Reduce right angles rule Scholium segment sides sine solid angle solution square root straight line subtraction tangent THEOREM third trapezium triangle ABC u₁ vulgar fraction Whence