Mathematical Dictionary and Cyclopedia of Mathematical Science: Comprising Definitions of All the Terms Employed in Mathematics - an Analysis of Each Branch, and of the Whole, as Forming a Single Science |
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Page 15
... ratio and the products will be the respective amounts re- quired . Subtract the price of the mixture from each greater price of the simples , and write the dif- ference opposite the price or prices with which it is linked ; subtract ...
... ratio and the products will be the respective amounts re- quired . Subtract the price of the mixture from each greater price of the simples , and write the dif- ference opposite the price or prices with which it is linked ; subtract ...
Page 22
... ratio of ing from analogy is , and ought to be rejected , | F to G. in a course of rigid demonstration . It is not ... ratio of AC to BC is given , since the ratio of AC to BC is given , and , conse- quently , that of AD to DB is known ...
... ratio of ing from analogy is , and ought to be rejected , | F to G. in a course of rigid demonstration . It is not ... ratio of AC to BC is given , since the ratio of AC to BC is given , and , conse- quently , that of AD to DB is known ...
Page 31
... ratio of the number of individuals who enter upon any given year to the number. 1. At simple interest . At the end of the first year , a payment a will be due , at the end of the second year , a second payment a will be due , together ...
... ratio of the number of individuals who enter upon any given year to the number. 1. At simple interest . At the end of the first year , a payment a will be due , at the end of the second year , a second payment a will be due , together ...
Page 34
... ratio , is the first of the two terms which are compared together . As its name implies , it forms the standard of com- parison , since it must be known before the value of the consequent can be expressed . The measure of the ratio of ...
... ratio , is the first of the two terms which are compared together . As its name implies , it forms the standard of com- parison , since it must be known before the value of the consequent can be expressed . The measure of the ratio of ...
Page 36
... ratio . Let ABC be the given triangle , and suppose the re- be inscribed . Denote the base mous with division . In Arithmetic , the term is employed to denote the use of the princi- ples of science in the solution of practical problems ...
... ratio . Let ABC be the given triangle , and suppose the re- be inscribed . Denote the base mous with division . In Arithmetic , the term is employed to denote the use of the princi- ples of science in the solution of practical problems ...
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Common terms and phrases
algebraic altitude application arithmetical axes base bisect calculus called centre chords circle circles of latitude co-ordinates cone conic conic sections conic surface conjugate constructed cube cubic equation curve cycloid decimal deduced degree denote diameter differential co-efficient directrix distance divided divisor draw drawn elements ellipse equa equal equation expression factors formula fraction function generatrix Geometry given greatest common divisor hence horizontal hyperbola infinite number intersection latitude length logarithm mathematical means measure meridian method multiplied nth root operation ordinate parabola parallel pass perpendicular plane polygon principal vertex principles projection quotient radius ratio regular polygon result rhumb line right angles roots rule scale sides sphere spherical square straight line surface taken tangent term tion transverse axis triangle Trigonometry unit unknown quantity variable vertex vertical vulgar fraction whole number
Popular passages
Page 87 - A Circle is a plane figure bounded by a curved line every point of which is equally distant from a point within called the center.
Page 275 - If two triangles have the three sides of the one equal to the three sides of the other, each to each, the triangles are congruent.
Page 26 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees ; each degree into 60 equal parts, called minutes ; and each minute into 60 equal parts, called seconds.
Page 454 - Three lines are in harmonical proportion, when the first is to the third, as the difference between the first and second, is to the difference between the second and third ; and the second is called a harmonic mean between the first and third. The expression 'harmonical proportion...
Page 82 - Then multiply the second and third terms together, and divide the product by the first term: the quotient will be the fourth term, or answer.
Page 4 - This cyclopaedia of mathematical science defines, with completeness, precision, and accuracy, every technical term ; thus constituting a popular treatise on each branch and a general view of the whole subject. 50 The National Teachers
Page 462 - In any quadrilateral the sum of the squares of the four sides is equal to the sum of the squares of the diagonals, plus four times the square of the line joining the middle points of the diagonals.
Page 134 - Subtract the cube of this number from the first period, and to the remainder bring down the first figure of the next period for a dividend.
Page 453 - Four quantities are in proportion when the ratio of the first to the second is equal to the ratio of the third to the fourth.
Page 516 - Multiply the divisor, thus augmented, by the last figure of the root, and subtract the product from the dividend, and to the remainder bring down the next period for a new dividend.