Where are the asymptotes for COTX?
Where are the asymptotes for COTX?
In your case, the function cot(x) is defined as 1tan(x) , which is cos(x)sin(x) . So, the zeros of the denominator are the ones of the sine function which, periodicity apart, are 0 and π . So, your vertical asymptotes are vertical lines of equations x=0 and x=π .
What are the asymptotes for Cotangent?
The cotangent function does the opposite — it appears to fall when you read from left to right. Equations of the asymptotes are of the form y = nπ, where n is an integer. Some examples of the asymptotes are y = –3π, y = –2π, y = –π, y = 0, y = π, y = 2π, and y =3π.
What is the domain and range of Y COTX?
all real numbers
The graph of the cotangent function looks like this: The domain of the function y=cot(x)=cos(x)sin(x) is all real numbers except the values where sin(x) is equal to 0 , that is, the values πn for all integers n . The range of the function is all real numbers.
Where is the cotangent?
The cotangent of an angle in a right triangle is a relationship found by dividing the length of the side adjacent to the given angle by the length of the side opposite to the given angle. This is the reciprocal of the tangent function.
What is the range of COTX?
The range of cotx is (−∞,∞) or all real numbers.
What is cot angle?
In a right angled triangle, the cotangent of an angle is: The length of the adjacent side divided by the length of the side opposite the angle. The abbreviation is cot. cot(θ) = adjacent / opposite. It is not commonly used, and is equal to 1/tangent.
Where is cot on the unit circle?
The cotangent function is the reciprocal of the tangent function (cotx=1tanx=costsint) x = 1 tan . It can be found for an angle by using the x – and y -coordinates of the associated point on the unit circle: cott=costsint=xy t = x y .
How do you find cotangent?
The cotangent of x is defined to be the cosine of x divided by the sine of x: cot x = cos x sin x .
What is the domain and range of Y 2 COTX?
Period and Amplitude of Basic Trig Functions
A | B |
---|---|
Range of y=cot x | All Real numbers |
Domain of y=sec x | All x≠π/2 + nπ |
Range of y=sec x | y≤-1, y≥1 |
Domain of y=csc x | All x≠nπ |