Trigonometric equations are equations including trigonometric functions. If they have only such functions and constants, then the solution involves finding an unknown which is an argument to a trigonometric function.
Basic trigonometric equations
sin(x) = n
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The equation has solutions only when is within the interval . If is within this interval, then we first find an such that:
The solutions are then:
Where is an integer.
In the cases when equals 1, 0 or -1 these solutions have simpler forms which are summarized in the table on the right.
For example, to solve:
First find :
Then substitute in the formulae above:
Solving these linear equations for gives the final answer:
Where is an integer.
cos(x) = n
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Like the sine equation, an equation of the form only has solutions when n is in the interval . To solve such an equation we first find one angle such that:
Then the solutions for are:
Where is an integer.
Simpler cases with equal to 1, 0 or -1 are summarized in the table on the right.
tan(x) = n
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General case
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An equation of the form has solutions for any real . To find them we must first find an angle such that:
After finding , the solutions for are:
When equals 1, 0 or -1 the solutions have simpler forms which are shown in the table on the right.
cot(x) = n
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General case
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The equation has solutions for any real . To find them we must first find an angle such that:
After finding , the solutions for are:
When equals 1, 0 or -1 the solutions have simpler forms which are shown in the table on the right.
csc(x) = n and sec(x) = n
The trigonometric equations and can be solved by transforming them to other basic equations:
Further examples
Generally, to solve trigonometric equations we must first transform them to a basic trigonometric equation using the [[../Trigonometric_Identities_Reference|trigonometric identities]]. This sections lists some common examples.
a sin(x)+b cos(x) = c
To solve this equation we will use the identity:
The equation becomes:
This equation is of the form and can be solved with the formulae given above.
For example we will solve:
In this case we have:
Apply the identity:
So using the formulae for the solutions to the equation are:
Where is an integer.
Resources
Licensing
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