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Question: How do you solve \(2\sin x + \csc x = 0\) in the interval \(0\) to \(2\pi?\)...

How do you solve 2sinx+cscx=02\sin x + \csc x = 0 in the interval 00 to 2π?2\pi?

Explanation

Solution

In this question, we are going to solve the given equation for the given interval.
First we are going to write the cosecant xx by the reciprocal identity and then multiplying by sinx\sin x on both sides.
And then simplifying the equation we get the result and then we can get the solution from the given interval.
Hence, we get the required solution from the given interval.

Formula used: The reciprocal identity is written as
cosecx=1sinx\cos ecx = \dfrac{1}{{\sin x}}

Complete step-by-step solution:
In this question, we are going to solve the given equation by the given interval.
First write the given equation and mark it as (1)\left( 1 \right)
2sinx+cscx=0.....(1)2\sin x + \csc x = 0……….....\left( 1 \right)
Now by applying the reciprocal identity to the cosecant xx in equation (1)\left( 1 \right) we get,
2sinx+1sinx=0\Rightarrow 2\sin x + \dfrac{1}{{\sin x}} = 0
Multiplying sinx\sin x on both sides of the equation we get,
2sin2x+sinxsinx=0\Rightarrow 2{\sin ^2}x + \dfrac{{\sin x}}{{\sin x}} = 0
On cancel the term and we get
2sin2x+1=0\Rightarrow 2{\sin ^2}x + 1 = 0
On rewriting the term and we get
2sin2x=1\Rightarrow 2{\sin ^2}x = - 1
Let us divide the term and we get,
sin2x=12\Rightarrow {\sin ^2}x = \dfrac{{ - 1}}{2}
But as sin2x{\sin ^2}x cannot be negative
Hence we do not have any solution to 2sinx+cscx=02\sin x + \csc x = 0
The solution can also be checked from the graph of 2sinx+cscx=02\sin x + \csc x = 0, which never has a value zero.
Hence the given equation has no solution.

Note: Solving the trigonometric equation is a tricky work that often leads to errors and mistakes. Therefore, answers should be carefully checked. After solving, you can check the answers by using a graph.
The unit circle or trigonometric circle as it is also known is useful to know because it let us easily calculate the cosine, sine, and tangent of any angle between 00 and 360360 degrees.
Trigonometry is also helpful to measure the height of the mountain, to find the distance of long rivers, etc. its applications are in various fields like oceanography, astronomy, navigation, electronics, physical sciences etc.