1 Answer

Rdrw · Answer 1 · 2022-09-28T23:58:14+0000

Answer:

Explanation:

I honestly have no idea what you mean by answer by formula, but I'm going to give it my best. I began by squaring both sides to get:

(a² - b²) tan²θ = b² and then distributed to get:

a² tan²θ - b² tan²θ = b² and then got the b terms on the side to get:

a² tan²θ = b² + b² tan²θ and then changed the tans to sin/cos to get:

$(a^2sin^2\theta)/(cos^2\theta)=b^2+(b^2sin^2\theta)/(cos^2\theta)$ and isolated the sin-squared on the left to get:

$a^2sin^2\theta=cos^2\theta(b^2+(b^2sin^2\theta)/(cos^2\theta))$ and distributed to get:

***
$a^2sin^2\theta=b^2cos^2\theta+b^2sin^2\theta$ *** and factored the right side to get:

$a^2sin^2\theta=b^2(sin^2\theta+cos^2\theta)$ and utilized a trig Pythagorean identity to get:

$a^2sin^2\theta=b^2(1)$ and then solved for sinθ in the following way:

$sin^2\theta=(b^2)/(a^2)$ so

$sin\theta=(b)/(a)$ This, along with the *** expression above will be important. I'm picking up at the *** to solve for cosθ:

$a^2sin^2\theta=b^2cos^2\theta+b^2sin^2\theta$ and get the cos²θ alone on the right by subtracting to get:

$a^2sin^2\theta-b^2sin^2\theta=b^2cos^2\theta$ and divide by b² to get:

$(a^2sin^2\theta)/(b^2)-sin^2\theta=cos^2\theta$ and factor on the left to get:

$sin^2\theta((a^2)/(b^2)-1)=cos^2\theta$ and take the square root of both sides to get:

$\sqrt{sin^2\theta((a^2)/(b^2)-1) }=cos\theta$ and simplify to get:

$(sin\theta)/(b)√(a^2-b^2)=cos\theta$ and go back to the identity we found for sinθ and sub it in to get:

$((b)/(a) )/(b)√(a^2-b^2)=cos\theta$ and simplifying a bit gives us:

$(1)/(a)√(a^2-b^2)=cos\theta$

That's my spin on things....not sure if it's what you were looking for. If not.....YIKES

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