Question
Question: Find the principal solutions of the equation \[\tan x=\sqrt{3}\]...
Find the principal solutions of the equation tanx=3
Solution
Hint: We will first find a standard angle for which the value is given and then we will cancel the terms to get x. Then using the quadrants, we will find other values. Finally we will check the values that will lie between 0 to 2π and these values will be our principal solutions.
Complete step-by-step answer:
Before proceeding with the question we should understand the concept of the principal solution of trigonometric equations. The solutions lying between 0 to 2π or between 0∘ to 360∘ are called principal solutions.
The trigonometric equation mentioned in the question is tanx=3......(1)
Now we know that tan60∘=3 and hence substituting this in equation (1) we get,
⇒tanx=tan60∘.......(2)
Now simplifying and solving for x in equation (2) we get,
⇒x=60∘
We also know that tan is positive in the first quadrant and in the third quadrant.
So the value in the first quadrant is x that is 60∘.
And the value in third quadrant is 180+x that is 180∘+60∘=240∘.
So the principal solutions are x=60∘ and x=240∘.
Also x=60×180π=3π and x=240×180π=34π.
Hence both 3π and 34π lies between 0 and 2π and is known as our principal solution.
Note: We should remember that in the first quadrant the values for all trigonometric functions(sin, cos, tan, cot, sec and cosec) are positive. And in the second quadrant the values for sin and cosec are only positive. In the third quadrant the values for tan and cot are only positive. And in the fourth quadrant the values for cos and sec are only positive.