Why Is Cot 0 Undefined at Jean Rivers blog

Why Is Cot 0 Undefined. In this interval, the cotangent is a continuous, monotonic, and. This occurs at x = (nπ)/2,. In the graph of #cottheta# , it seems like the graph is asymptoting #x=0# : that's undefined because as you approach 90° from either direction, tan approaches positive or negative infinity. since $\tan(25\pi/2)$ is undefined, and $\cot x = \frac{1}{\tan x}$, then why isn't $\cot(25\pi/2)$ undefined instead of $0$? since the cotangent is a periodic function with a period of π, it can be studied within the interval (0, π). notice, we have indeterminate form, so #cot(0)# is undefined. it is important to note that the cotangent function is undefined for x values that make sin x equal to zero. the value of `cot 0` is undefined because the tangent of `0` is equal to `0`, and the cotangent is defined as the reciprocal of the tangent, so.

notice, we have indeterminate form, so #cot(0)# is undefined. that's undefined because as you approach 90° from either direction, tan approaches positive or negative infinity. since $\tan(25\pi/2)$ is undefined, and $\cot x = \frac{1}{\tan x}$, then why isn't $\cot(25\pi/2)$ undefined instead of $0$? This occurs at x = (nπ)/2,. it is important to note that the cotangent function is undefined for x values that make sin x equal to zero. since the cotangent is a periodic function with a period of π, it can be studied within the interval (0, π). the value of `cot 0` is undefined because the tangent of `0` is equal to `0`, and the cotangent is defined as the reciprocal of the tangent, so. In the graph of #cottheta# , it seems like the graph is asymptoting #x=0# : In this interval, the cotangent is a continuous, monotonic, and.

[ANSWERED] For what value of θ is cot θ undefined? I .0° II. 1

Why Is Cot 0 Undefined notice, we have indeterminate form, so #cot(0)# is undefined. In the graph of #cottheta# , it seems like the graph is asymptoting #x=0# : the value of `cot 0` is undefined because the tangent of `0` is equal to `0`, and the cotangent is defined as the reciprocal of the tangent, so. since the cotangent is a periodic function with a period of π, it can be studied within the interval (0, π). that's undefined because as you approach 90° from either direction, tan approaches positive or negative infinity. This occurs at x = (nπ)/2,. In this interval, the cotangent is a continuous, monotonic, and. notice, we have indeterminate form, so #cot(0)# is undefined. since $\tan(25\pi/2)$ is undefined, and $\cot x = \frac{1}{\tan x}$, then why isn't $\cot(25\pi/2)$ undefined instead of $0$? it is important to note that the cotangent function is undefined for x values that make sin x equal to zero.