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Graph of tangent and cotangent functions

We can draw the basic graph of tangent and cotangent Tangent and cotangent functions.

We will also look at transformations of function graphs:

Extension along the ordinate (y) axis
Extension (contraction) along the abscissa (x) axis
Rigid shift in the direction of the ordinate axis (shift of the function up or down along the y axis)
Rigid shift in the direction of the abscissa axis (shift of the function to the left or right along the x axis)

The value of the angle α is expressed in radians. This means that the value π is equal to 3.14159 ... and not 180°.

Graphs of the form f (x) = A tan (x), g (x) = A cot (x)

The function tan x (or cot x) is multiplied by A, where . We get a new feature:

The number A is the amplitude of the function. If

Example

The example is available to registered users free of charge.

Example

The example is available to registered users free of charge.

When the parameter k is multiplied by x, the extension (or contraction) of the angular function in the direction of the x axis is achieved.

The number k is the frequency of the function, which tells us the number of waves along the length of one period of the function.

The higher the frequency, the shorter the period. If

The period is the distance made by the function before it starts repeating (the period reflects exactly one round of a unit circle).

The period is most easily imagined on the graphs:

In the first (red) graph we read that the period is (since at the function starts to repeat).
In the second (green) graph we read that the period is (since at the function starts to repeat).
In the third (blue) graph, we simply read the period (since at the function starts to repeat).