First B.A. Examination, University of London: A Hand-book to the Study of Latin, Greek, French and German, English Language and Literature, Arithmetic, Algebra, Plane and Solid Geometry ... and Other Subjects Included in the Above Examination ...J. Heywood, 1878 - 372 pages |
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Page iii
... Factors ... 123 II . - Reduction and Manipulation of Fractions . The G. C.M. and the L.C.M. 127 III . - Ratio , Proportion , and Variation 130 IV . Permutations and Combinations 134 V. - Examples in Permutations and Combinations 140 VI ...
... Factors ... 123 II . - Reduction and Manipulation of Fractions . The G. C.M. and the L.C.M. 127 III . - Ratio , Proportion , and Variation 130 IV . Permutations and Combinations 134 V. - Examples in Permutations and Combinations 140 VI ...
Page 111
... factors . For instance , 78-13 × 3 × 2 , and 42 = 7x3x2 ; therefore , since the G.C.M. is the product of the common factors , and the common factors only , the G.C.M. - 3x 2 . On this principle is based the rule for finding the G.C.M. ...
... factors . For instance , 78-13 × 3 × 2 , and 42 = 7x3x2 ; therefore , since the G.C.M. is the product of the common factors , and the common factors only , the G.C.M. - 3x 2 . On this principle is based the rule for finding the G.C.M. ...
Page 112
... factors is the L.C.M. For since the product contains all the factors of each number , each number will divide it without remainder ; and by the nature of the above process in rejecting those factors of a number which occur in preceding ...
... factors is the L.C.M. For since the product contains all the factors of each number , each number will divide it without remainder ; and by the nature of the above process in rejecting those factors of a number which occur in preceding ...
Page 121
... Factors , " has been emphasised by their distinct enumeration in recent Regulations . Special attention to them in ... factor of each side ; - · 2√√ ( x2 + x + 5 ) − 14 = 0 ; 21 + d = 6 ; + V ( 5 + 10 ) = 8 ; - x2 - 7x + √ ( x2 - 7x ...
... Factors , " has been emphasised by their distinct enumeration in recent Regulations . Special attention to them in ... factor of each side ; - · 2√√ ( x2 + x + 5 ) − 14 = 0 ; 21 + d = 6 ; + V ( 5 + 10 ) = 8 ; - x2 - 7x + √ ( x2 - 7x ...
Page 123
... factors of such a form , but observe the form of the product of these factors as being given us in x3 + a3 . This principle is universally applicable , and the student should accustom himself to make such wide generalisations of simple ...
... factors of such a form , but observe the form of the product of these factors as being given us in x3 + a3 . This principle is universally applicable , and the student should accustom himself to make such wide generalisations of simple ...
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Algebra Arithmetic axes axis B.A. PASS Bell and Sons candidate centre Chaucer circle co-ordinates contains Dictionary edition elementary English History English Language English Literature equal Euclid examination examination-paper examples exercises expression factors find the equation find the number formulæ French French Grammar Geometry German give given equation given plane given point given straight line Grammar Greek illustrate intersection John Heywood Latin locus Longmans Macmillan means method notes number of combinations observe origin Paper Paradise Lost parallel parallelepiped permutations perpendicular principles private student problems propositions quadratic quadratic equation questions R. C. Jebb radius ratio readers rectangular reference represent Rivington rule Shakespeare sides Solid Geometry solve sphere square surface Syntax tangent tanß text-book theorems tion translation triangle Trigonometry University of London unknown quantities Verbs whence words δὲ καὶ μὲν
Popular passages
Page 202 - If two triangles have one angle of the one equal to one angle of the other and the sides about these equal angles proportional, the triangles are similar.
Page 303 - If a straight line be drawn parallel to one of the sides of a triangle, it shall cut the other sides, or these produced, proportionally : and if the sides, or the sides produced, be cut proportionally, the straight line which joins the points of section shall be parallel to the remaining side of the triangle.
Page 329 - LITERATURE with the HISTORY OF THE LANGUAGE. The scheme of the course and revolutions of the language which is followed here is extremely simple, and resting not upon arbitrary but upon natural or real distinctions, gives us the only view of the subject that can claim to be regarded as of a scientific character.
Page 351 - Like that self-begotten bird In the Arabian woods embost, That no second knows nor third, And lay erewhile a holocaust, From out her ashy womb now teemed, Revives, reflourishes, then vigorous most When most unactive deemed; And, though her body die, her fame survives, A secular bird, ages of lives.
Page 44 - Linus, huic mater quamvis atque huic pater adsit, Orphei Calliopea, Lino formosus Apollo. Pan etiam, Arcadia mecum si iudice certet, Pan etiam Arcadia dicat se iudice victum.
Page 180 - ... the sum of the roots is equal to the coefficient of the second term with its sign changed, and the product of the roots is equal to the last term.
Page 100 - At that ever memorable and instructive period, the letter of the law was superseded in favour of the substance of liberty. To the free choice, therefore, of the people, without either king or parliament, we owe that happy establishment, out of which both king and parliament were regenerated.
Page vi - Office, for the advancement of Religion and Morality, and the promotion of useful knowledge, to hold forth to all classes and denominations of our faithful subjects, without any distinction whatsoever, an encouragement for pursuing a regular and liberal course of Education...
Page 308 - Radian is the angle subtended, at the centre of a circle, by an arc equal in length to the radius...
Page 99 - Genius always imports something inventive or creative; which does not rest in mere sensibility to beauty where it is perceived, but which can, moreover, produce new beauties, and exhibit them in such a manner as itrongly to impress the minds of others.