First Lessons in Geometry: With Practical Applications in Mensuration, and Artificers' Work and MechanicsA.S. Barnes, 1840 - 252 σελίδες |
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Αποτελέσματα 1 - 5 από τα 12.
Σελίδα 22
... intersect each other , the opposite angles A and A are called vertical angles . These angles are equal to each other , and so also , are the opposite angles B and B. B B QUEST . - 11 . If one straight line meets another , what is the ...
... intersect each other , the opposite angles A and A are called vertical angles . These angles are equal to each other , and so also , are the opposite angles B and B. B B QUEST . - 11 . If one straight line meets another , what is the ...
Σελίδα 55
... . In how many points can a straight line cut the circumference of a circle ? 27. In how many points can the cir- cumferences of two circles intersect each other ? Of the Circle . 28. If two circles touch each PART 1. - SECTION VIII . 55.
... . In how many points can a straight line cut the circumference of a circle ? 27. In how many points can the cir- cumferences of two circles intersect each other ? Of the Circle . 28. If two circles touch each PART 1. - SECTION VIII . 55.
Σελίδα 56
... intersect each other the product , or rectangle of the parts of the one , is equal to the rectangle of the parts of the other . Thus , the two chords AB and CD , which intersect each other at E , give AEX EB CEXED . F C E QUEST . - 28 ...
... intersect each other the product , or rectangle of the parts of the one , is equal to the rectangle of the parts of the other . Thus , the two chords AB and CD , which intersect each other at E , give AEX EB CEXED . F C E QUEST . - 28 ...
Σελίδα 60
... intersect each other form an an- gle . This angle is measured by two lines , one in each plane , and both ... intersecting it in the line FC . Now , if from any point of the common intersection A as C , we draw CD in the plane E D F C ...
... intersect each other form an an- gle . This angle is measured by two lines , one in each plane , and both ... intersecting it in the line FC . Now , if from any point of the common intersection A as C , we draw CD in the plane E D F C ...
Σελίδα 64
... intersect , are called the vertices of the angles , or vertices of the polyedron . QUEST . - 1 . What is a solid ? 2 ... intersect each other ? What are the points called in which the edges intersect each other ? Of Solids bounded by ...
... intersect , are called the vertices of the angles , or vertices of the polyedron . QUEST . - 1 . What is a solid ? 2 ... intersect each other ? What are the points called in which the edges intersect each other ? Of Solids bounded by ...
Άλλες εκδόσεις - Προβολή όλων
Συχνά εμφανιζόμενοι όροι και φράσεις
12 feet 20 feet acres altitude bisect bounded by Planes breadth called centre of gravity chord circular sector circumfer circumference cone convex surface cubic feet cubic foot cubic inches cylinder decimal diagonals diameter distance divide draw equilateral triangle EXAMPLES Explain the manner feet 6 inches figure find the area find the solidity frustum given angle given line given point gles half hypothenuse intersect line be drawn linear unit lower base manner of inscribing Mensuration of Surfaces multiplied number of square parallel planes parallelogram parallelopipedon pentagon pentagonal pyramid perpendicular Practical Geometry.-Problems PROBLEM pulley pyramid radius rectangle regular polygon regular solids Required the area rhombus right angled triangle Round Bodies RULE scale of equal secant line segment similar polygons similar triangles slant height solid content solid feet Solids bounded specific gravity sphere square feet square yards straight line tangent thickness upper base weight
Δημοφιλή αποσπάσματα
Σελίδα 20 - Every circumference of a. circle, whether the circle be large or small, is supposed to be divided into 360 equal parts called degrees. Each degree is divided into 60 equal parts called minutes, and each minute into 60 equal parts called seconds.
Σελίδα 32 - The area of a rectangle is equal to the product of its base and altitude. Given R a rectangle with base b and altitude a. To prove R = a X b. Proof. Let U be the unit of surface. .R axb U' Then 1x1 But - is the area of R.
Σελίδα 40 - Similar triangles are to each other as the squares described on their homologous sides. Let ABC, DEF be two similar triangles...
Σελίδα 82 - A zone is a portion of the surface of a sphere included between two parallel planes.
Σελίδα 235 - An equilibrium is produced in all the levers, when the weight multiplied by its distance from the fulcrum is equal to the product of the power multiplied by its distance from the fulcrum. That...
Σελίδα 84 - The convex surface of a cylinder is equal to the circumference of its base multiplied by its altitude.
Σελίδα 34 - The area of a triangle is equal to half the product of the base and height.
Σελίδα 35 - If two triangles have two sides and the included angle of the one, equal to two sides and the included angle of the other, each to each, the two triangles will be equal in all their parts." Axiom 1. "Things which are equal to the same thing, are equal to each other.
Σελίδα 20 - For this purpose it is divided into 360 equal parts, called degrees, each degree is divided into 60 equal parts called minutes, and each minute into 60 equal parts called seconds. The degrees, minutes, and seconds, are marked thus, °, ', " ; and 9° 18' 10", are read, 9 degrees, 18 minutes, and 10 seconds.
Σελίδα 83 - The surface of a sphere is equal to the product of its diameter by the circumference of a great circle.