”Find
Answer 1
Ella Lewis
To find the values of $ \tan(\theta) $ that satisfy the equation $ \tan(\theta) = 2 $ in the interval $ [0, 2\pi] $, we need to determine the angles where the tangent function equals 2.
First, recall that the tangent function is periodic with period $ \pi $, and the angles where $ \tan(\theta) = 2 $ are:
$ \theta_1 = \arctan(2) $
and
$ \theta_2 = \arctan(2) + \pi $
Because the tangent function repeats every $ \pi $ radians, we only need to check within one period:
$ \theta_1 = \arctan(2) $
$ \theta_2 = \arctan(2) + \pi $
Thus, the solutions within $ [0, 2\pi] $ are:
$ \theta = \arctan(2) $
and
$ \theta = \arctan(2) + \pi $
Answer 2
Mia Harris
To find the values of $ an( heta) $ that satisfy the equation $ an( heta) = 2 $ in the interval $ [0, 2pi] $, we need to determine the angles where the tangent function equals 2.
The tangent function is periodic with period $ pi $, so we only need to find solutions within one period:
$ heta_1 = arctan(2) $
and
$ heta_2 = arctan(2) + pi $
Since these angles lie within $ [0, 2pi] $, the solutions are:
$ heta = arctan(2) $
and
$ heta = arctan(2) + pi $
Answer 3
Christopher Garcia
Find the values of $ an( heta) $ that satisfy $ an( heta) = 2 $ within $ [0, 2pi] $.
Solutions:
$ heta = arctan(2) $
and
$ heta = arctan(2) + pi $
Start Using PopAi Today