Christian) – one of the “nine ranks of angels.” According to the classification of Pseudo-Dionysius, the Areopagite is the fifth rank, together with dominions and authorities making up the second triad.

Great definition

Incomplete definition ↓

FORCE

non-mechanical, metaphysical). Polychronic orientation of latent absorption, which is complementary to any structure, to this structure itself. For subjective consciousness, S. can only appear as virtuality. There are also no forces in the objective. S. is always a symptom of a cut or cut in existence, a change in the nature of isolating a part from the whole.

Thus, the force-time-motion-structure complex is always a given of incompleteness in permeability, the incomprehensibility of the whole, on the border of a part and its complement. However, it is S., in its meaning, that is the greatest conceptual surrogate. It turns out to be locally here-now represented by the projection of a multiplicity of factors.

The subject does not feel this or that internal psychic force, but even in the most extreme or extreme case - only the pressure of “forces”. The utilization of these pressures in the form of acts and affects also leaves any supposed new forces hidden.

We may well move from ordinary phenomena to microphenomena, real, but lying outside the usual everyday and scientific appearances, but the transition to any kind of micromotority, microkinestheticity is impossible.

The trivial definition of force as a measure of influence is heuristically unacceptable. Everything that is associated with energy appears as a breakthrough of non-existence through one or another system of prohibitions, determined by the structures of a specific given. At the same time, the breakthrough itself is channeled in a certain way. The question is complicated by the fact that structures cannot exist in any capacity if they are not already a given form of an energy breakthrough. At some hypothetical absolute moment there are no structures - they are temporary creations, and beyond

the edge of cycles is inert repetitions.

Great definition

Incomplete definition ↓

1. Newton's laws of dynamics

laws or axioms of motion (as formulated by Newton himself in the book “Mathematical Principles of Natural Philosophy” of 1687): “I. Every body continues to be maintained in its state of rest or uniform and rectilinear motion until and unless it is forced by applied forces to change this state. II. The change in momentum is proportional to the applied driving force and occurs in the direction of the straight line along which this force acts. III. An action always has an equal and opposite reaction, otherwise the interactions of two bodies on each other are equal and directed in opposite directions.”

2. What is force?

Force is characterized by magnitude and direction. Force characterizes the action of other bodies on a given body. The result of a force acting on a body depends not only on its magnitude and direction, but also on the point of application of the force. Resultant is one force, the result of which will be the same as the result of the action of all real forces. If the forces are co-directed, the resultant is equal to their sum and directed in the same direction. If the forces are directed in opposite directions, then the resultant is equal to their difference and is directed towards the greater force.

Gravity and body weight

Gravity is the force with which a body is attracted to the Earth due to universal gravitation. All bodies in the Universe are attracted to each other, and the greater their mass and the closer they are located, the stronger the attraction.

To calculate the force of gravity, the body mass should be multiplied by a coefficient denoted by the letter g, approximately equal to 9.8 N/kg. Thus, the force of gravity is calculated by the formula

Body weight is the force with which the body presses on a support or stretches a suspension due to attraction to the Earth. If a body has neither support nor suspension, then the body has no weight - it is in a state of weightlessness.

Elastic force

Elastic force is a force that arises inside a body as a result of deformation and prevents a change in shape. Depending on how the shape of the body changes, several types of deformation are distinguished, in particular, tension and compression, bending, shear and shear, and torsion.

The more the shape of a body is changed, the greater the elastic force generated in it.

A dynamometer is a device for measuring force: the measured force is compared with the elastic force arising in the spring of the dynamometer.

Friction force

The force of static friction is the force that prevents a body from moving from its place.

The reason friction occurs is that any surface has irregularities that engage each other. If the surfaces are polished, then the cause of friction is the forces of molecular interaction. When a body moves on a horizontal surface, the friction force is directed against the movement and is directly proportional to the force of gravity:

The sliding friction force is the resistance force when one body slides over the surface of another. The rolling friction force is the resistance force when one body rolls over the surface of another; it is significantly less than the sliding friction force.

If friction is useful, it is increased; if it is harmful, reduce it.

3. CONSERVATION LAWS

CONSERVATION LAWS, physical laws according to which some property of a closed system remains unchanged despite any changes in the system. The most important are laws of conservation of matter and energy. The law of conservation of matter states that matter is neither created nor destroyed; During chemical transformations, the total mass remains unchanged. The total amount of energy in the system also remains unchanged; energy is only converted from one form to another. Both of these laws are only approximately correct. Mass and energy can be converted into one another according to the equation E = ts 2. Only the total amount of mass and its equivalent energy remains unchanged. Another conservation law concerns electric charge: it also cannot be created and cannot be destroyed. When applied to nuclear processes, the conservation law is expressed in the fact that the total charge, spin and other QUANTUM NUMBERS of interacting particles must remain the same for the particles resulting from the interaction. In strong interactions, all quantum numbers are conserved. In weak interactions, some of the requirements of this law are violated, especially with regard to PARITY.

The law of conservation of energy can be explained using the example of a ball weighing 1 kg falling from a height of 100 m. The initial total energy of the ball is its potential energy. When it falls, the potential energy gradually decreases and the kinetic energy increases, but the total amount of energy remains unchanged. Thus, conservation of energy takes place. A - kinetic energy increases from 0 to maximum: B - potential energy decreases from maximum to zero; C is the total amount of energy, which is equal to the sum of kinetic and poten The law of conservation of matter states that during chemical reactions matter is neither created nor destroyed. This phenomenon can be demonstrated using a classical experiment in which a candle burning under a glass bell is weighed (A). At the end of the experiment, the weight of the cap and its contents remained the same as it was at the beginning, although the candle, the substance of which consists mainly of carbon and hydrogen, “disappeared”, since volatile reaction products (water and carbon dioxide) were released from it. Only after scientists recognized the principle of conservation of matter at the end of the 18th century did a quantitative approach to chemistry become possible.

Mechanical work occurs when a body moves under the influence of a force applied to it.

Mechanical work is directly proportional to the distance traveled and proportional to the force:

Power

The speed of performing work in technology is characterized by power.

Power is equal to the ratio of work to the time during which it was performed:

Energy This is a physical quantity that shows how much work a body can do. Energy is measured in joules.

When work is done, the energy of bodies is measured. Work done is equal to the change in energy.

Potential energy determined by the relative position of interacting bodies or parts of the same body.

E p = F h = gmh.

Where g = 9.8 N/kg, m is body weight (kg), h is height (m).

Kinetic energy possesses a body as a result of its movement. The greater the body's mass and speed, the greater its kinetic energy.

5. basic law of dynamics of rotational motion

Moment of power

1. Moment of force relative to the axis of rotation, (1.1) where is the projection of the force onto a plane perpendicular to the axis of rotation, is the arm of the force (the shortest distance from the axis of rotation to the line of action of the force).

2. Moment of force relative to a fixed point O (origin). (1.2) It is determined by the vector product of the radius vector drawn from point O to the point of application of the force by this force; - a pseudo-vector, its direction coincides with the direction of translational motion of the right screw when it rotates away (“gimlet rule”). Modulus of the moment of force, (1.3) where is the angle between the vectors and is the arm of the force, the shortest distance between the line of action of the force and the point of application of the force.

Momentum

1. Momentum of momentum of a body rotating about the axis, (1.4) where is the moment of inertia of the body, is the angular velocity. The angular momentum of a system is the vector sum of the angular momentum of all bodies in the system: . (1.5)

2. Momentum of a material point with momentum relative to a fixed point O (origin). (1.6) It is determined by the vector product of the radius vector drawn from point O to the material point by the momentum vector; - pseudo-vector, its direction coincides with the direction of translational motion of the right propeller when it rotates away (“gimlet rule”). Modulus of the angular momentum vector, (1.7) where is the angle between the vectors and is the arm of the vector relative to point O.

Moment of inertia about the axis of rotation

1. Moment of inertia of a material point, (1.8) where is the mass of the point, is its distance from the axis of rotation.

2. Moment of inertia of a discrete rigid body, (1.9) where is the element of mass of the rigid body; is the distance of this element from the axis of rotation; is the number of elements of the body.

3. Moment of inertia in the case of continuous mass distribution (solid solid body). (1.10) If the body is homogeneous, i.e. its density is the same throughout the entire volume, then the expression (1.11) is used, where and is the volume of the body.

In physics, the concept of “force” is very often used: gravitational force, repulsive force, electromagnetic force, etc. One gets the misleading impression that force is something that influences objects and exists on its own.

Where does strength actually come from, and what is it anyway?

Let's look at this concept using sound as an example. When we sing, we can vary the strength of the sound emitted, i.e. volume. To do this, we increase the speed of exhalation and narrow the space between the vocal cords. What happens? The rate of change in the condition of the vocal cords increases. Voices are divided into low and high. How are they different from each other? The voice seems low when the rate of change gradually decreases, and high when, on the contrary, it increases towards the end of exhalation.

All musical instruments are built on the same principle. All of them allow you to vary the ratios of the instrument in such a way as to change the speed and direction of its change, or to combine sounds with different parameters, as in strings.

In any natural system, constant changes in state occur. We associate energy and strength with a high rate of change in state, and rest and staticity with low energy but high gravity.

The concept of force is necessary for us in the case when we consider the influence of some objects on others. But if we consider the system as a whole, then instead of force we talk about the rate of change in the state of the system. But what causes the speed change?

Any system is an oscillatory process. Usually, when we talk about fluctuation, we think of a change in one value within some range. For example, the vibration of a guitar string is its vibration around a central axis. But this happens only because the ends of the string are strictly fixed, which limits it in space.

If we are talking about a natural system, then fluctuations in it are always a change in at least two parameters. Moreover, the physical parameters are interrelated with each other in such a way that an increase in one leads to a decrease in the other. For example, a decrease in pressure leads to an increase in volume; the maximum of the electric field corresponds to the minimum of the magnetic field. This cyclic feedback causes the system to oscillate within a certain value, which can be considered a rate constant.

It is thanks to this constant that we always feel the direction that is in the system. For example, from a short segment of a piece of music we feel what its further sound will be. We can grasp the logic of further development. From a mathematical point of view, this means calculating the differential - the rate and direction of change of the system at a given point in time. This is what distinguishes music from simple noise.

And the fact that this is possible suggests that the world as a whole is a single system where all processes are connected with each other. And all speed changes in it are predictable and logically interconnected.

There are a number of laws that characterize physical processes during the mechanical movements of bodies.

The following basic laws of forces in physics are distinguished:

• law of gravity;
• law of universal gravitation;
• laws of friction force;
• law of elastic force;
• Newton's laws.

Law of Gravity

Note 1

Gravity is one of the manifestations of the action of gravitational forces.

Gravity is represented as a force that acts on a body from the side of the planet and gives it acceleration due to gravity.

Free fall can be considered in the form $mg = G\frac(mM)(r^2)$, from which we obtain the formula for the acceleration of free fall:

$g = G\frac(M)(r^2)$.

The formula for determining gravity will look like this:

$(\overline(F))_g = m\overline(g)$

Gravity has a certain vector of distribution. It is always directed vertically downwards, that is, towards the center of the planet. The body is constantly subject to gravity and this means that it is in free fall.

The trajectory of movement under the influence of gravity depends on:

• module of the object's initial velocity;
• direction of body speed.

A person encounters this physical phenomenon every day.

Gravity can also be represented as the formula $P = mg$. When accelerating due to gravity, additional quantities are also taken into account.

If we consider the law of universal gravitation, which was formulated by Isaac Newton, all bodies have a certain mass. They are attracted to each other with force. It will be called the gravitational force.

$F = G\frac(m_1m_2)(r^2)$

This force is directly proportional to the product of the masses of two bodies and inversely proportional to the square of the distance between them.

$G = 6.7\cdot (10)^(-11)\ (H\cdot m^2)/((kg)^2\ )$, where $G$ is the gravitational constant and it has according to the international system SI measurements constant value.

Definition 1

Weight is the force with which a body acts on the surface of the planet after gravity occurs.

In cases where the body is at rest or moves uniformly along a horizontal surface, then the weight will be equal to the support reaction force and will coincide in value with the magnitude of the force of gravity:

With uniformly accelerated movement vertically, the weight will differ from the force of gravity, based on the acceleration vector. When the acceleration vector is directed in the opposite direction, an overload condition occurs. In cases where the body and the support move with acceleration $a = g$, then the weight will be equal to zero. A state of zero weight is called weightlessness.

The gravitational field strength is calculated as follows:

$g = \frac(F)(m)$

The quantity $F$ is the gravitational force that acts on a material point of mass $m$.

The body is placed at a certain point in the field.

The potential energy of gravitational interaction of two material points with masses $m_1$ and $m_2$ must be at a distance $r$ from each other.

The gravitational field potential can be found using the formula:

$\varphi = \Pi / m$

Here $П$ is the potential energy of a material point with mass $m$. It is placed at a certain point in the field.

Laws of friction

Note 2

The friction force arises during movement and is directed against the sliding of the body.

The static frictional force will be proportional to the normal reaction. The static friction force does not depend on the shape and size of the rubbing surfaces. The static coefficient of friction depends on the material of the bodies that come into contact and generate the friction force. However, the laws of friction cannot be called stable and accurate, since various deviations are often observed in the research results.

The traditional writing of the friction force involves the use of the friction coefficient ($\eta$), $N$ is the normal pressure force.

Also distinguished are external friction, rolling friction force, sliding friction force, viscous friction force and other types of friction.

Law of Elastic Force

The elastic force is equal to the rigidity of the body, which is multiplied by the amount of deformation:

$F = k \cdot \Delta l$

In our classical force formula for searching for elastic force, the main place is occupied by the values ​​of body rigidity ($k$) and body deformation ($\Delta l$). The unit of force is newton (N).

A similar formula can describe the simplest case of deformation. It is commonly called Hooke's law. It states that when trying to deform a body in any available way, the elastic force will tend to return the shape of the object to its original form.

To understand and accurately describe a physical phenomenon, additional concepts are introduced. The elasticity coefficient shows the dependence on:

• material properties;
• rod sizes.

In particular, the dependence on the size of the rod or cross-sectional area and length is distinguished. Then the elasticity coefficient of the body is written in the form:

$k = \frac(ES)(L)$

In this formula, the quantity $E$ is the elastic modulus of the first kind. It is also called Young's modulus. It reflects the mechanical characteristics of a certain material.

When performing calculations of straight rods, Hooke's law is written in relative form:

$\Delta l = \frac(FL)(ES)$

It is noted that the application of Hooke's law will be effective only for relatively small deformations. If the level of the proportionality limit is exceeded, then the relationship between strains and stresses becomes nonlinear. For some media, Hooke's law cannot be applied even for small deformations.

If a body accelerates, then something acts on it. How to find this “something”? For example, what kind of forces act on a body near the surface of the earth? This is the force of gravity directed vertically downward, proportional to the mass of the body and for heights much smaller than the radius of the earth $(\large R)$, almost independent of the height; it is equal

$(\large F = \dfrac (G \cdot m \cdot M)(R^2) = m \cdot g )$

$(\large g = \dfrac (G \cdot M)(R^2) )$

so-called acceleration due to gravity. In the horizontal direction the body will move at a constant speed, but the movement in the vertical direction is according to Newton's second law:

$(\large m \cdot g = m \cdot \left (\dfrac (d^2 \cdot x)(d \cdot t^2) \right) )$

after contracting $(\large m)$, we find that the acceleration in the direction $(\large x)$ is constant and equal to $(\large g)$. This is the well-known motion of a freely falling body, which is described by the equations

$(\large v_x = v_0 + g \cdot t)$

$(\large x = x_0 + x_0 \cdot t + \dfrac (1)(2) \cdot g \cdot t^2)$

How is strength measured?

In all textbooks and smart books, it is customary to express force in Newtons, but except in the models that physicists operate, Newtons are not used anywhere. This is extremely inconvenient.

Newton newton (N) is a derived unit of force in the International System of Units (SI).
Based on Newton's second law, the unit newton is defined as the force that changes the speed of a body weighing one kilogram by 1 meter per second in one second in the direction of the force.

Thus, 1 N = 1 kg m/s².

Kilogram-force (kgf or kg) is a gravitational metric unit of force equal to the force that acts on a body weighing one kilogram in the gravitational field of the earth. Therefore, by definition, a kilogram-force is equal to 9.80665 N. A kilogram-force is convenient because its value is equal to the weight of a body weighing 1 kg.
1 kgf = 9.80665 newtons (approximately ≈ 10 N)
1 N ≈ 0.10197162 kgf ≈ 0.1 kgf

1 N = 1 kg x 1 m/s2.

Law of gravitation

Every object in the Universe is attracted to every other object with a force proportional to their masses and inversely proportional to the square of the distance between them.

$(\large F = G \cdot \dfrac (m \cdot M)(R^2))$

We can add that any body reacts to a force applied to it with acceleration in the direction of this force, in magnitude inversely proportional to the mass of the body.

$(\large G)$ — gravitational constant

$(\large M)$ — mass of the earth

$(\large R)$ — radius of the earth

$(\large G = 6.67 \cdot (10^(-11)) \left (\dfrac (m^3)(kg \cdot (sec)^2) \right) )$

$(\large M = 5.97 \cdot (10^(24)) \left (kg \right) )$

$(\large R = 6.37 \cdot (10^(6)) \left (m \right) )$

Within the framework of classical mechanics, gravitational interaction is described by Newton’s law of universal gravitation, according to which the force of gravitational attraction between two bodies of mass $(\large m_1)$ and $(\large m_2)$ separated by a distance $(\large R)$ is

$(\large F = -G \cdot \dfrac (m_1 \cdot m_2)(R^2))$

Here $(\large G)$ is the gravitational constant equal to $(\large 6.673 \cdot (10^(-11)) m^3 / \left (kg \cdot (sec)^2 \right) )$. The minus sign means that the force acting on the test body is always directed along the radius vector from the test body to the source of the gravitational field, i.e. gravitational interaction always leads to the attraction of bodies.
The gravity field is potential. This means that you can introduce the potential energy of gravitational attraction of a pair of bodies, and this energy will not change after moving the bodies along a closed loop. The potentiality of the gravitational field entails the law of conservation of the sum of kinetic and potential energy, which, when studying the motion of bodies in a gravitational field, often significantly simplifies the solution.
Within the framework of Newtonian mechanics, gravitational interaction is long-range. This means that no matter how a massive body moves, at any point in space the gravitational potential and force depend only on the position of the body at a given moment in time.

Heavier - Lighter

The weight of a body $(\large P)$ is expressed by the product of its mass $(\large m)$ and the acceleration due to gravity $(\large g)$.

$(\large P = m \cdot g)$

When on earth the body becomes lighter (presses less on the scales), this is due to a decrease masses. On the moon, everything is different; the decrease in weight is caused by a change in another factor - $(\large g)$, since the acceleration of gravity on the surface of the moon is six times less than on the earth.

mass of the earth = $(\large 5.9736 \cdot (10^(24))\ kg )$

moon mass = $(\large 7.3477 \cdot (10^(22))\ kg )$

acceleration of gravity on Earth = $(\large 9.81\ m / c^2 )$

gravitational acceleration on the Moon = $(\large 1.62 \ m / c^2 )$

As a result, the product $(\large m \cdot g )$, and therefore the weight, decreases by 6 times.

But it is impossible to describe both of these phenomena with the same expression “make it easier.” On the moon, bodies do not become lighter, but only fall less rapidly; they are “less epileptic”))).

Vector and scalar quantities

A vector quantity (for example, a force applied to a body), in addition to its value (modulus), is also characterized by direction. A scalar quantity (for example, length) is characterized only by its value. All classical laws of mechanics are formulated for vector quantities.

Picture 1.

In Fig. Figure 1 shows various options for the location of the vector $( \large \overrightarrow(F))$ and its projections $( \large F_x)$ and $( \large F_y)$ on the axis $( \large X)$ and $( \large Y )$ respectively:

• A. the quantities $( \large F_x)$ and $( \large F_y)$ are non-zero and positive
• B. the quantities $( \large F_x)$ and $( \large F_y)$ are non-zero, while $(\large F_y)$ is a positive quantity, and $(\large F_x)$ is negative, because the vector $(\large \overrightarrow(F))$ is directed in the direction opposite to the direction of the $(\large X)$ axis
• C.$(\large F_y)$ is a positive non-zero quantity, $(\large F_x)$ is equal to zero, because the vector $(\large \overrightarrow(F))$ is directed perpendicular to the axis $(\large X)$

Moment of power

A moment of power is called the vector product of the radius vector drawn from the axis of rotation to the point of application of the force and the vector of this force. Those. According to the classical definition, the moment of force is a vector quantity. Within the framework of our problem, this definition can be simplified to the following: the moment of force $(\large \overrightarrow(F))$ applied to a point with coordinate $(\large x_F)$, relative to the axis located at point $(\large x_0 )$ is a scalar quantity equal to the product of the force modulus $(\large \overrightarrow(F))$ and the force arm - $(\large \left | x_F - x_0 \right |)$. And the sign of this scalar quantity depends on the direction of the force: if it rotates the object clockwise, then the sign is plus, if counterclockwise, then the sign is minus.

It is important to understand that we can choose the axis arbitrarily - if the body does not rotate, then the sum of the moments of forces about any axis is zero. The second important note is that if a force is applied to a point through which an axis passes, then the moment of this force about this axis is equal to zero (since the arm of the force will be equal to zero).

Let us illustrate the above with an example in Fig. 2. Let us assume that the system shown in Fig. 2 is in equilibrium. Consider the support on which the loads stand. It is acted upon by 3 forces: $(\large \overrightarrow(N_1),\ \overrightarrow(N_2),\ \overrightarrow(N),)$ points of application of these forces A, IN And WITH respectively. The figure also contains forces $(\large \overrightarrow(N_(1)^(gr)),\ \overrightarrow(N_2^(gr)))$. These forces are applied to the loads, and according to Newton's 3rd law

$(\large \overrightarrow(N_(1)) = - \overrightarrow(N_(1)^(gr)))$

$(\large \overrightarrow(N_(2)) = - \overrightarrow(N_(2)^(gr)))$

Now consider the condition for the equality of the moments of forces acting on the support relative to the axis passing through the point A(and, as we agreed earlier, perpendicular to the drawing plane):

$(\large N \cdot l_1 - N_2 \cdot \left (l_1 +l_2 \right) = 0)$

Please note that the moment of force $(\large \overrightarrow(N_1))$ was not included in the equation, since the arm of this force relative to the axis in question is equal to $(\large 0)$. If for some reason we want to select an axis passing through the point WITH, then the condition for equality of moments of forces will look like this:

$(\large N_1 \cdot l_1 - N_2 \cdot l_2 = 0)$

It can be shown that, from a mathematical point of view, the last two equations are equivalent.

Center of gravity

Center of gravity in a mechanical system is the point relative to which the total moment of gravity acting on the system is equal to zero.

Center of mass

The point of the center of mass is remarkable in that if a great many forces act on the particles forming a body (no matter whether it is solid or liquid, a cluster of stars or something else) (meaning only external forces, since all internal forces compensate each other), then the resulting the force leads to such an acceleration of this point as if the entire mass of the body $(\large m)$ were in it.

The position of the center of mass is determined by the equation:

$(\large R_(c.m.) = \frac(\sum m_i\, r_i)(\sum m_i))$

This is a vector equation, i.e. in fact there are three equations - one for each of the three directions. But consider only the $(\large x)$ direction. What does the following equality mean?

$(\large X_(c.m.) = \frac(\sum m_i\, x_i)(\sum m_i))$

Suppose the body is divided into small pieces with the same mass $(\large m)$, and the total mass of the body will be equal to the number of such pieces $(\large N)$ multiplied by the mass of one piece, for example 1 gram. Then this equation means that you need to take the $(\large x)$ coordinates of all the pieces, add them and divide the result by the number of pieces. In other words, if the masses of the pieces are equal, then $(\large X_(c.m.))$ will simply be the arithmetic mean of the $(\large x)$ coordinates of all the pieces.

Mass and density

Mass is a fundamental physical quantity. Mass characterizes several properties of the body at once and in itself has a number of important properties.

• Mass serves as a measure of the substance contained in a body.
• Mass is a measure of the inertia of a body. Inertia is the property of a body to maintain its speed unchanged (in the inertial frame of reference) when external influences are absent or compensate each other. In the presence of external influences, the inertia of a body is manifested in the fact that its speed does not change instantly, but gradually, and the more slowly, the greater the inertia (i.e. mass) of the body. For example, if a billiard ball and a bus are moving at the same speed and are braked by the same force, then it takes much less time to stop the ball than to stop the bus.
• The masses of bodies are the reason for their gravitational attraction to each other (see the section “Gravity”).
• The mass of a body is equal to the sum of the masses of its parts. This is the so-called additivity of mass. Additivity allows you to use a standard of 1 kg to measure mass.
• The mass of an isolated system of bodies does not change with time (law of conservation of mass).
• The mass of a body does not depend on the speed of its movement. Mass does not change when moving from one frame of reference to another.
• Density of a homogeneous body is the ratio of the mass of the body to its volume:

$(\large p = \dfrac (m)(V) )$

Density does not depend on the geometric properties of the body (shape, volume) and is a characteristic of the substance of the body. The densities of various substances are presented in reference tables. It is advisable to remember the density of water: 1000 kg/m3.

Newton's second and third laws

The interaction of bodies can be described using the concept of force. Force is a vector quantity, which is a measure of the influence of one body on another.
Being a vector, force is characterized by its modulus (absolute value) and direction in space. In addition, the point of application of the force is important: the same force in magnitude and direction, applied at different points of the body, can have different effects. So, if you grab the rim of a bicycle wheel and pull tangentially to the rim, the wheel will begin to rotate. If you pull along the radius, there will be no rotation.

Newton's second law

The product of the body mass and the acceleration vector is the resultant of all forces applied to the body:

$(\large m \cdot \overrightarrow(a) = \overrightarrow(F) )$

Newton's second law relates acceleration and force vectors. This means that the following statements are true.

1. $(\large m \cdot a = F)$, where $(\large a)$ is the acceleration modulus, $(\large F)$ is the resulting force modulus.
2. The acceleration vector has the same direction as the resultant force vector, since the mass of the body is positive.

Newton's third law

Two bodies act on each other with forces equal in magnitude and opposite in direction. These forces have the same physical nature and are directed along a straight line connecting their points of application.

Superposition principle

Experience shows that if several other bodies act on a given body, then the corresponding forces add up as vectors. More precisely, the principle of superposition is valid.
The principle of superposition of forces. Let the forces act on the body$(\large \overrightarrow(F_1), \overrightarrow(F_2),\ \ldots \overrightarrow(F_n))$ If you replace them with one force$(\large \overrightarrow(F) = \overrightarrow(F_1) + \overrightarrow(F_2) \ldots + \overrightarrow(F_n))$ , then the result of the impact will not change.
The force $(\large \overrightarrow(F))$ is called resultant forces $(\large \overrightarrow(F_1), \overrightarrow(F_2),\ \ldots \overrightarrow(F_n))$ or resulting by force.

Forwarder or carrier? Three secrets and international cargo transportation

Forwarder or carrier: who to choose? If the carrier is good and the forwarder is bad, then the first. If the carrier is bad and the forwarder is good, then the latter. This choice is simple. But how can you decide when both candidates are good? How to choose from two seemingly equivalent options? The fact is that these options are not equivalent.

Horror stories of international transport

BETWEEN A HAMMER AND A HILL.

It is not easy to live between the customer of transportation and the very cunning and economical owner of the cargo. One day we received an order. Freight for three kopecks, additional conditions for two sheets, the collection is called.... Loading on Wednesday. The car is already in place on Tuesday, and by lunchtime the next day the warehouse begins to slowly throw into the trailer everything that your forwarder has collected for its recipient customers.

AN ENCHANTED PLACE - PTO KOZLOVICHY.

According to legends and experience, everyone who transported goods from Europe by road knows what a terrible place the Kozlovichi VET, Brest Customs, is. What chaos the Belarusian customs officers create, they find fault in every possible way and charge exorbitant prices. And it is true. But not all...

ON THE NEW YEAR'S TIME WE WERE BRINGING POWDERED MILK.

Loading with groupage cargo at a consolidation warehouse in Germany. One of the cargoes is milk powder from Italy, the delivery of which was ordered by the Forwarder.... A classic example of the work of a forwarder-“transmitter” (he doesn’t delve into anything, he just transmits along the chain).

Documents for international transport

International road transport of goods is very organized and bureaucratic; as a result, a bunch of unified documents are used to carry out international road transport of goods. It doesn’t matter if it’s a customs carrier or an ordinary one - he won’t travel without documents. Although this is not very exciting, we tried to simply explain the purpose of these documents and the meaning that they have. They gave an example of filling out TIR, CMR, T1, EX1, Invoice, Packing List...

Axle load calculation for road freight transport

The goal is to study the possibility of redistributing loads on the axles of the tractor and semi-trailer when the location of the cargo in the semi-trailer changes. And applying this knowledge in practice.

In the system we are considering there are 3 objects: a tractor $(T)$, a semi-trailer $(\large ((p.p.)))$ and a load $(\large (gr))$. All variables related to each of these objects will be marked with the superscript $T$, $(\large (p.p.))$ and $(\large (gr))$ respectively. For example, the tare weight of a tractor will be denoted as $m^(T)$.

Why don't you eat fly agarics? The customs office exhaled a sigh of sadness.

What is happening in the international road transport market? The Federal Customs Service of the Russian Federation has already banned the issuance of TIR Carnets without additional guarantees in several federal districts. And she notified that from December 1 of this year she will completely terminate the agreement with the IRU as not meeting the requirements of the Customs Union and is putting forward financial claims that are not childish.
IRU in response: “The explanations of the Federal Customs Service of Russia regarding the alleged debt of ASMAP in the amount of 20 billion rubles are a complete fiction, since all the old TIR claims have been fully settled..... What do we, common carriers, think?

Stowage Factor Weight and volume of cargo when calculating the cost of transportation

The calculation of the cost of transportation depends on the weight and volume of the cargo. For sea transport, volume is most often decisive, for air transport - weight. For road transport of goods, a complex indicator is important. Which parameter for calculations will be chosen in a particular case depends on specific gravity of the cargo (Stowage Factor) .