Elements of GeometryGinn and Heath, 1881 - 250 σελίδες |
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Σελίδα v
... Ratio , and Limits . The changes are not sufficient to prevent the simulta- neous use of the old and new editions in the class ; still they are very important , and have been made after the most careful and prolonged consideration . I ...
... Ratio , and Limits . The changes are not sufficient to prevent the simulta- neous use of the old and new editions in the class ; still they are very important , and have been made after the most careful and prolonged consideration . I ...
Σελίδα 85
... isosceles triangle whose vertex C is without the circle , and whose equal sides meet the circle in D and E. Show that CD is equal to CE . P ratio oftioauratus of the same kinde Почин rentaltowed you , STRAIGHT LINES AND CIRCLES . 85.
... isosceles triangle whose vertex C is without the circle , and whose equal sides meet the circle in D and E. Show that CD is equal to CE . P ratio oftioauratus of the same kinde Почин rentaltowed you , STRAIGHT LINES AND CIRCLES . 85.
Σελίδα 86
... Ratio , and this ratio is always an ab- stract number . When two quantities of the same kind are measured by the same unit , their ratio is the ratio of their numerical measures . a b ' 195. The ratio of a to b is written or a : b , and ...
... Ratio , and this ratio is always an ab- stract number . When two quantities of the same kind are measured by the same unit , their ratio is the ratio of their numerical measures . a b ' 195. The ratio of a to b is written or a : b , and ...
Σελίδα 87
... ratio correct within " b 2 n 1 n2 By continuing this process , a series of variable values , m . m ' m " n n2 , 89 n etc. , will be obtained , which will differ less and α less from the exact value of We may thus find a fraction b which ...
... ratio correct within " b 2 n 1 n2 By continuing this process , a series of variable values , m . m ' m " n n2 , 89 n etc. , will be obtained , which will differ less and α less from the exact value of We may thus find a fraction b which ...
Σελίδα 89
... ratio . Q. E. D. variables be in a constant ratio , For , let x and y be two variables X 1 having the constant ratio r , then r , or , x = ry , therefore y lim . ( x ) = lim . ( r y ) = r × lim . ( y ) , therefore lim . ( x ) r . lim ...
... ratio . Q. E. D. variables be in a constant ratio , For , let x and y be two variables X 1 having the constant ratio r , then r , or , x = ry , therefore y lim . ( x ) = lim . ( r y ) = r × lim . ( y ) , therefore lim . ( x ) r . lim ...
Άλλες εκδόσεις - Προβολή όλων
Συχνά εμφανιζόμενοι όροι και φράσεις
A B C AABC AACB ABCD acute adjacent angles alt.-int altitude apothem arc A B BC² bisect centre chord A B circumference circumscribed coincide COROLLARY describe an arc diagonals diameter divided Draw equal arcs equal distances equal respectively equiangular polygon equilateral equilateral polygon equivalent exterior angles figure given line given point given polygon greater homologous sides hypotenuse Iden isosceles triangle Let A B limit line A B measured by arc middle point number of sides parallelogram perimeter perpendicular plane PROBLEM prove Q. E. D. PROPOSITION quadrilateral radii radius equal ratio rect rectangles regular inscribed regular polygon required to construct rhombus right angles right triangle SCHOLIUM segment sides of equal sides of similar similar polygons subtend tangent THEOREM third side triangle ABC variable vertex vertices