How do you solve $5 sin x + 3 cos x = 5$ $5sin x + 3 cos x = 5$ ?

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Answer 1 · 2016-03-21T20:54:09

Make into a quadratic in $sin x$ $sin x$ to find solutions:

${ (x = pi/2 + 2kpi), (x = sin^(-1)(8/17) + 2kpi) :}$

for all $k in ZZ$

Subtract $5 sin x$ from both sides to get:

$3 cos x = 5 - 5 sin x$

Square both sides (noting that this may introduce spurious solutions) to get:

$9 cos^2 x = 25 - 50 sin x + 25 sin^2 x$

Now $sin^2 x + cos^2 x = 1$ , so $cos^2 x = 1 - sin^2 x$ and we get:

$9 (1 - sin^2 x) = 25 - 50 sin x + 25 sin^2 x$

Subtracting the left hand side from the right, this becomes:

$34 sin^2x - 50 sin x + 16 = 0$

Divide through by $2$ to get:

$0 = 17 sin^2 x - 25 sin^2 x + 8 = (sin x - 1)(17 sin x - 8)$

So $sin x = 1$ or $sin x = 8/17$

If $sin x = 1$ then $color(blue)(x = pi/2 + 2kpi)$ for any $k in ZZ$

These are valid solutions since $cos (pi/2+2kpi) = 0$

How about $x = sin^(-1) (8/17)$ ?

$5 - 5 sin x = 5 - 40/17 = (85-40)/17 = 45/17$

So $(5 - 5 sin x)/3 = 15/17$

With $sin x = 8/17$ and $cos x = 15/17$ we require a value of $x$ in Q1 plus any integer multiple of $2pi$ .

So we have solutions: $color(blue)(x = sin^(-1)(8/17) + 2kpi)$ for any $k in ZZ$

How do you solve 5sin x + 3 cos x = 55sinx+3cosx=55sin x + 3 cos x = 5?