Solve the following equation.
$\tan ^ { 2 } x + \tan x = 0$
A) $x = \pi + 2 n \pi$ and $x = \frac { 3 \pi } { 2 } + 2 n \pi$, where $n$ is an:
B) $x = n \pi$ and $x = \frac { 3 \pi } { 4 } + n \pi$, where $n$ is an integer
C) $x = \frac { 2 \pi } { 3 } + 2 n \pi$ and $x = \frac { 5 \pi } { 3 } + 2 n \pi$, where $n$ is at
D) $x = n \pi$ and $x = \frac { \pi } { 2 } + n \pi$, where $n$ is an integer
E) $x = n \pi$ and $x = \frac { 3 \pi } { 2 } + 2 n \pi$, where $n$ is an integ!

Question

Quizplus · Accepted Answer

The equation $\tan^2x + \tan x = 0$ can be factored as $\tan x(\tan x + 1) = 0$, leading to $\tan x = 0$ or $\tan x = -1$. For $\tan x = 0$, $x = n\pi$ where $n$ is an integer. For $\tan x = -1$, $x = \frac{3\pi}{4} + n\pi$, where $n$ is an integer, because the tangent function is negative in the second and fourth quadrants, and $\tan(\frac{3\pi}{4}) = -1$.

Solve the Following Equation tan⁡2x+tan⁡x=0\tan ^ { 2 } x + \tan x = 0tan2x+tanx=0

Solve the Following Equation $\tan ^ { 2 } x + \tan x = 0$