2015-04-01
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2.3.1 Match words and word-combinations with their translation:
| legitimate | нейтральная ось |
| multiplication | приближенно равный |
| avoirdupois pound | погружаться, сливаться, проникать |
| multiple | десятичная метрическая система |
| derived unit | точные отношения |
| circumference | плотность |
| great rigidity | делить, подразделять |
| scalar / vector quantity | обоснованный, оправданный |
| volume | плавучий эффект |
| humidity | вычитание |
| mercury | солнечные (астрономические) сутки |
| density | коэффициент расширения |
| addition | чистый, беспримесный |
| magnitude | полный делитель; величина, делящаяся без остатка |
| assumption | кратное число |
| fluid ounce | сплав |
| decimal metric system | окружность |
| to merge | фунт “эвердьюпойс”, фунт британской системы массы (0,453 кг) |
| subdivide | законный, истинный, настоящий |
| submultiple | умножение |
| Tresca (cross) section | производная единица |
| buoyant effect | как для жидких веществ, так и нет |
| solar day | поперечное сечение (сечение Треска) |
| subtraction | величина |
| division | ртуть |
| pure | основание, предположение |
| alloy | кубический дюйм |
| coefficient of expansion | деление |
| exact relations | скалярная / векторная величина |
| cubic inch | тонкая линия |
| approximately equal | влажность |
| justified | огромная ригидность (твердость, упругость) |
| neutral axis | сложение |
| both liquid and dry | жидкая унция (мера жидкостей; в Великобритании = 28,4 см3, в США = 29,57 см3) |
| fine line | емкость, объем |
Find the sentences with these words and word-combinations in texts 2.1 - 2.2 and translate them.
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Prepare the words and word-combinations for a dictation.
Texts Statics
Read and translate the text about Forces, choose one or two main sentences for every of six chapters.
Forces
1. Nature of a Force. — The word force is a general term for any push or pull. A force is always exerted on a body by another body, or on a part of a body by another part. Though a force is really an action of one body on another, it is customary and convenient to speak of the force itself as acting on the body to which it is applied.
A force may act through contact like the pressures of a crankshaft on its bearings, or it may act from a distance like gravitational or magnetic attraction. It may act on or be distributed over a considerable area of contact like the thrust of earth against a retaining wall, or it may act on so small an area as to be practically concentrated at a point like the pressure of a locomotive wheel on a rail.
But whether exerted through contact or from a distance, whether distributed or concentrated, a force is always exerted on something by something.
The gravitational force exerted on a body by the earth acts toward the earth's center; it is a distributed force, acting on all the particles that make up the body, but for many purposes it is convenient and correct to regard it as concentrated force acting at a point called the center of gravity of the body.
The gravitational attraction or earth pull on a body is commonly called the weight of the body.
2. Description and Representation of a Force. — Your earliest ideas about forces were based on your own experience with forces exerted by or on yourself. For example, when moving a heavy body you realize that the force you applied had 1) magnitude, according to how hard you pushed or pulled, 2) direction, according to whether you pushed or pulled up, down, to the right, or to the left, 3) place of application, according to where you grasped the body. These three attributes - magnitude, direction, and place of application — serve to describe a force and are called the elements or characteristics of a force.
The line of action of a concentrated force, or a force so considered, is a line of indefinite length, parallel to the direction of the force, and containing its point of application.
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In other words it is the line along which the force acts.
3. Composition and Resolution of Forces. — A force is an action exerted by one body on another that tends to change the state of motion of the body acted upon. To specify a force, it is necessary to know its direction, magnitude, and sense. Hence, forces are vector quantities. They must be added, subtracted, multiplied, and divided vectorially. The ordinary arithmetical rules of addition, subtraction, multiplication, and division, which are valid for scalar quantities, cannot be used except in special cases. Forces like other vector quantities can be represented by straight lines. The length of the line represents the magnitude of the force. The direction of the line represents the direction, in which the force acts, and the head of an arrow on the line shows whether the force acts up or down, to the right or to the left, east or west, etc.
4. Resultant. — If a force acts on a body that is free to move, the body moves in the direction of the force. When two forces are applied in opposite directions, the body moves in the direction of the greater force. The force tending to displace the body in this case is the difference between the two forces. When the forces act in the same direction, the effective force is the sum of the two forces. This effective, or equivalent, force is known as the resultant of the forces. In the case of two oppositely directed forces acting at the same point this resultant is found by taking the difference between the applied forces, and its direction is the direction of the greater force. When the forces act in the same direction, the resultant is found by adding the applied forces.
A b
Figure 15 (a) - Forces acting on a simple crane;
(b) - Rectangular components of a force
In Figure 15 (a) a simple crane illustrates the composition of two forces.
Let the top of the beam BC be connected by means of a cord to
the wall at A, in such a way that when the beam is in equilibrium
the cord AB is at right angles to the wall. A spring balance inserted
in this cord indicates the tension in it. A weight W is hung from B. Under the action of those two forces, the beam exerts a thrust that is just enough to overcome their combined action. This thrust is equal in magnitude and opposite in direction to the resultant of these two forces. To obtain the force diagram, lay off on a vertical line a distance which represents the weight W, and at right angles to this line lay off a second line which represents the magnitude and direction of the tension Т in the cord AB. Now, draw the rectangle of which Т and W are the two sides. The diagonal of this rectangle represents the resultant of the horizontal and vertical forces and is equal to the force exerted on the beam.
5. Resolution of Forces. — It has been seen that two forces can be combined into a single force. On the other hand, a single force may be broken up into two or more forces to which it is equivalent. When one force is given, it is possible to find two other forces which when applied simultaneously will produce the same effect as the single force. This process of splitting up a single force into two or more parts is known as the resolution of forces, and the parts into which the force is split up are called the components of the force.
6. Rectangular Components of a Force. — Most frequently the force is resolved in such a way that the components are at right angles to each other. In Figure 15 (b) OR represents a given force, and the components are desired along OX and OY, two directions which are at right angles to each other. By completing the rectangle OARB, the magnitudes of the components are found to be О A and OB. The relation between the components and the original forces is given by the trigonometric formulas
OA = OR cos x
OB = AR = OR sin x
The forces acting on a body may neutralize each other in such a way that there is no tendency for the body to change either its motion of translation or its motion of rotation. The body is then said to be in equilibrium under the action of the applied forces. If the body is at rest, it will remain at rest, and if it is in uniform motion — either motion of translation or motion of rotation — it will continue to move with uniform motion [2, С. 45 - 47].
