Plane GeometryGinn, 1899 - 256 sider |
Inni boken
Resultat 1-5 av 61
Side v
... a Book has been read in this way , the pupil should review the Book , and should be required to draw the figures free - hand . should state and prove the propositions orally , using a pointer to indi- cate on the figure every line and ...
... a Book has been read in this way , the pupil should review the Book , and should be required to draw the figures free - hand . should state and prove the propositions orally , using a pointer to indi- cate on the figure every line and ...
Side 1
... line . 3. The intersection of any three of these lines is called a point . 4. The block extends in three principal ... given , length , breadth ( or width ) , and thickness ( height or depth ) . 5. A solid , in common language , is a. 1 ...
... line . 3. The intersection of any three of these lines is called a point . 4. The block extends in three principal ... given , length , breadth ( or width ) , and thickness ( height or depth ) . 5. A solid , in common language , is a. 1 ...
Side 8
George Albert Wentworth. THE STRAIGHT LINE . 44. Postulate . A straight line can be drawn from one point to another ... given when required . T 55. If any point , C , is taken in 8 BOOK I. PLANE GEOMETRY .
George Albert Wentworth. THE STRAIGHT LINE . 44. Postulate . A straight line can be drawn from one point to another ... given when required . T 55. If any point , C , is taken in 8 BOOK I. PLANE GEOMETRY .
Side 9
George Albert Wentworth. 55. If any point , C , is taken in a given straight line , AB , the two parts CA and CB are said to have opposite directions from the point C ( Fig . 5 ) . A ← B FIG . 5 . Every straight line , as AB , may be ...
George Albert Wentworth. 55. If any point , C , is taken in a given straight line , AB , the two parts CA and CB are said to have opposite directions from the point C ( Fig . 5 ) . A ← B FIG . 5 . Every straight line , as AB , may be ...
Side 10
George Albert Wentworth. 58. If there is but one angle at a given vertex ... line or plane that divides a geometric magnitude into two equal parts is called the bisector of ... line meets another straight line and 10 BOOK I. PLANE GEOMETRY .
George Albert Wentworth. 58. If there is but one angle at a given vertex ... line or plane that divides a geometric magnitude into two equal parts is called the bisector of ... line meets another straight line and 10 BOOK I. PLANE GEOMETRY .
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Vanlige uttrykk og setninger
AB² ABCD AC² acute angle adjacent angles altitude angles are equal apothem arc A'B base bisector bisects called centre chord circumference circumscribed circle coincide decagon diagonals diameter divide Draw equal circles equiangular equiangular polygon equidistant equilateral triangle exterior angle feet Find the area Find the locus given angle given circle given line given point given straight line given triangle greater Hence homologous sides hypotenuse inches inscribed regular intercepted intersecting isosceles trapezoid isosceles triangle legs limit line drawn median middle point number of sides parallelogram perimeter perpendicular plane PROBLEM Proof prove Q. E. D. PROPOSITION quadrilateral radii radius ratio rectangle regular hexagon regular inscribed regular polygon rhombus right angle right triangle secant segments straight angle supplementary tangent THEOREM third side trapezoid triangle ABC triangle is equal variable vertex
Populære avsnitt
Side 33 - The sum of two sides of a triangle is greater than the third side, and their difference is less than the third side.
Side 150 - If two triangles have an angle of the one equal to an angle of the other, and the including sides proportional, they are similar. In the triangles ABC and A'B'C', let ZA = Z A', and let AB : A'B' = AC : A'C'. To prove that the A ABC and A'B'C
Side 66 - If two triangles have two sides of the one equal respectively to two sides of the other, but the included angle of the first greater than the included angle of the second, then the third side of the first is greater than the third side of the second. Given A ABC and A'B'C...
Side 191 - The areas of two triangles which have an angle of the one equal to an angle of the other are to each other as the products of the sides including the equal angles. To prove that Proof. A Let the triangles ABC and ADE have the common angle A. A ABC -AB X AC Now and A ADE AD X AE Draw BE.
Side 169 - In any triangle the product of two sides is equal to the product of the diameter of the circumscribed circle by the altitude upon the third side.
Side 32 - After remarking that the mathematician positively knows that the sum of the three angles of a triangle is equal to two right angles...
Side 71 - The sum of the perpendiculars dropped from any point within an equilateral triangle to the three sides is constant, and equal to the altitude.
Side 156 - In a series of equal ratios, the sum of the antecedents is to the sum of the consequents as any antecedent is to its consequent.
Side 75 - PERIPHERY of a circle is its entire bounding line ; or it is a curved line, all points of which are equally distant from a point within called the centre.
Side 162 - The sum of the squares of the two legs of a right triangle is equal to the square of the hypotenuse.