Solve 3sin(x+10)=4cos(x-10) - Help!

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To solve the equation 3sin(x+10)=4cos(x-10), users suggest applying trigonometric identities, specifically the addition formulas for sine and cosine. Expanding the equation and collecting like terms can lead to a form where coefficients of sine and cosine can be isolated. This allows for the use of the relationship A cos x = B sin x, leading to the conclusion that tan x = A/B. Ultimately, the solution involves calculating x using the inverse tangent function based on the derived coefficients.
brandon26
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Solve for x

3sin(x+10)=4cos(x-10)

I tried changinf everything into tan nothing out. I tried expaning the brackets and collecting like terms, that didnt work out either.
Please help.
 
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Yeh, but I can't simplify anything to solve the problem
 
Well expand the sin and cos and apply cos (-x) = cos x, and sin (-x) = -sin x.

Then collect terms/coefficients of cos x and sin x.

If one has a form A cos x = B sin x, the tan x = A/B and x = tan-1 (A/B). In this problem A and B have terms of sin 10 and cos 10.
 

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