Is My Solution for 4sinx - 3cosx Correct?

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The solution for the expression 4sinx - 3cosx is proposed as 5sin(x + sin^-1(-3/5). The method used involves converting the linear combination of sine and cosine into a single sine function using the formula for amplitude and phase shift. The angle is calculated as sin^-1(b / (a^2 + b^2)^1/2), and the reverse process using the angle addition identity confirms the correctness of the solution. The final verification shows that the answer checks out with the original equation, indicating a complete solution.
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I'm unsure as to whether I'm correct with this:

4sinx - 3cosx

My answer ended up being 5sin(x + sin^-1 (-3/5)).

The equations I used were:

asinx + bcosx = (a^2 + b^2)^1/2 * sin(x + angle)
angle = sin^-1 (b / (a^2 + b^2)^1/2))

Can someone clarify whether I'm correct? I would appreciate it.
 
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A good way to check your answer is to reverse the process using the angle addition identity:

sin (θ + φ) = sin θ cos φ + cos θ sin φ

And using the facts

sin arcsin (3/5) = 3/5
and
cos arcsin (3/5) = 4/5. (why?)
 
I checked my answer and it equals the original equation, but have I fully solved it?
 
If it checks (and I agree that it does), then yep!
 

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