The Derivative of a function f(x) at a particular point x0 is called the limit of the ratio of the increment function to increment of argument, assuming that x goes to 0, and the boundary exists. The derivative is usually denoted by a bar, sometimes using points or through a differential. Often the entry is derived across the border resulting in confusion, since such a representation is rarely used.
A Function that has a derivative at a point x0, is called differentiable at a point. Suppose D1 is the set of points in which the function f is differentiated. By putting in correspondence to each number of the number x, belonging to D f ' (x), we obtain the function with the area designation of D1. This function is the derivative of y=f(x). Denote it as: f ' (x).
In addition, derivative widely used in physics and engineering. Consider a very simple example. Material point moves along a straight coordinate, with it specified the law of motion, that is, the x-coordinate of this point is a known function of x(t). During the time interval from t0 to t0+t, the moving point is equal to x(t0+t)-x(t0)= x, and its average velocity v(t) is equal to x/t.
Sometimes the nature of the movement is presented in a way that for small time intervals the average speed does not change, refers to the fact that the movement with a greater degree of accuracy is considered to be uniform. Or the average speed, if t0 should be absolutely accurate to a certain value, which is called the instantaneous velocity v(t0) that point at a particular time t0. It is believed that instantaneous speed v(t) is known for any differential function x(t), what is v(t) will equal x ' (t). Simply put, speed – is derived from the coordinates in time.
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Instantaneous velocity has both positive and negative values, and a value of 0. If she at some time interval (t1; t2) is positive then the point moves in the same direction, that is, the coordinate x(t) increases with time, and if v(t) is negative, then the coordinate x(t) decreases.
In more complex cases, the point moves in the plane or in space. Then the velocity-a vector quantity and determines each of the coordinates of the vector v(t).
Similarly, you can compare with the acceleration of its motion. Speed is a function of time, i.e. v=v(t). And the derivative of a function - acceleration: a=v ' (t). It turns out that the derivative of speed over time is acceleration.
Suppose y=f(x) is any differential function. Then we can consider the motion of a point on the coordinate axis, which is the law x=f(t). Mechanical maintenance derivative gives the opportunity to present a visual interpretation of theorems of the differential calculus.
How to find the derivative? Finding the derivative of a function is called its differentiation.
Let's cite examples of how to find the derivative function:
The Derivative of a constant function is zero; the derivative of the function y=x is equal to one.
How to find the derivative of a fraction? For this we consider the following material:
For any x0<>0 we have
Y/x=-1/x0*(x+x)
There are several rules to find the derivative. Namely:
If the functions A and B differentiated at point x0, then their sum is differentiated at the point: (A+B) '=A '+B'. Simply put, the derivative of the sum is equal to the sum of the derivatives. If the function is differentiated at some point, then its growth should be zero in adherence to the zero growth argument.
If the functions A and B differentiated at point x0, then their product is differentiated at the point: (A*B) '=A 'B+AB'. (Values of functions and their derivatives are calculated at the point x0). If the function A(x) is differentiated at point x0, and – permanent, then the differentiated function of CA and (CA) '=CA'. That is, this constant factor is taken out of the sign of the derivative.
If the functions A and B differentiated at point x0, and the function B is not zero, then their ratio is also differentiated at the point: (A/B) '=(A 'B-AB')/B*B.
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Alin Trodden - author of the article, editor
"Hi, I'm Alin Trodden. I write texts, read books, and look for impressions. And I'm not bad at telling you about it. I am always happy to participate in interesting projects."
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