How do you find all solutions of the equation ${sin}^{2} x = 2 sin x + 3$ $sin^2x=2sin x+3$ ?

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How do you find all solutions of the equation ${sin}^{2} x = 2 sin x + 3$ $sin^2x=2sin x+3$ ?

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Answer 1 · 2015-05-14T03:41:11

First of all, let's analyze this equation. There is no restriction for $x$ $x$ since the domain of a function $sin (x)$ $sin(x)$ is all real numbers.

Secondly, we can introduce an intermediary variable $y = sin (x)$ $y=sin(x)$ and express this equation in terms of $y$ $y$ :
$y^{2} = 2 y + 3$ $y^2=2y+3$ or
$y^{2} - 2 y - 3 = 0$ $y^2-2y-3=0$
This equation has solutions:
$y_{1, 2} = \frac{2 \pm \sqrt{4 + 12}}{2}$ $y_(1,2)=(2+-sqrt(4+12))/2$ or
$y_{1} = 3$ $y_1=3$ and $y_{2} = - 1$ $y_2=-1$

Now we have to take into consideration that $y = sin (x)$ $y=sin(x)$ and, as such, is restricted in values from $- 1$ $-1$ to $1$ $1$ (inclusive).
Therefore, solution $y_{1} = 3$ $y_1=3$ would not lead to any value of $x$ $x$ .
The second solution $y_{2} = - 1$ $y_2=-1$ can be used to find $x$ $x$ :
$sin (x) = - 1$ $sin(x)=-1$ implies that
$x = - \frac{π}{2} + 2 π N$ $x=-pi/2+2piN$ , where $N$ $N$ - any integer number or, in degrees,
$x = - 90^{o} + 360^{o} \cdot N$ $x=-90^o + 360^o*N$
This is a final solution to the problem.

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How do you find all solutions of the equation ${sin}^{2} x = 2 sin x + 3$ $sin^2x=2sin x+3$ ?

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How do you find all solutions of the equation ${sin}^{2} x = 2 sin x + 3$ $sin^2x=2sin x+3$ ?