From Förberedande kurs i matematik 1
If we examine the equation, we see that x only occurs as sinx and it can therefore be appropriate to take an intermediary step and solve for sinx, instead of trying to solve for x directly.
If we write t=sinx and treat t as a new unknown variable, the equation becomes
and it is expressed completely in terms of t. This is a normal quadratic equation; after dividing by 2, we complete the square on the left-hand side,
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| t2+21t−21= t+41 2−412−21=t+412−916 |
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and then obtain the equation
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| t+412=916
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which has the solutions t=−41
916=−4143 , i.e.
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| t=−41+43=21andt=−41−43=−1.
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Because t=sinx, this means that the values of x that satisfy the equation in the exercise will necessarily satisfy one of the basic equations sinx=21 or sinx=−1.
sinx=21:
This equation has the solutions x=
6 and x=−6=56 in the unit circle and the general solution is
where n is an arbitrary integer.
sinx=−1:
The equation has only one solution x=32 in the unit circle, and the general solution is therefore
where n is an arbitrary integer.
All of the solution to the equation are given by
where n is an arbitrary integer.
