If cot θ + cos θ = p and cot θ − cos θ = q, prove that 𝑝^2 −𝑞^2 =4⁢√𝑝⁢𝑞.

Question

If cot &theta; + cos &theta; = p and cot &theta; &minus; cos &theta; = q, prove that `p^2 - q^2 = 4sqrt(pq)`.

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p = cot &theta; + cos &theta; = `cos &theta;/sin &theta; + cos &theta;` = `(cos &theta;(1 + sin &theta;))/sin &theta;` q = cot &theta; &minus; cos &theta; = `(cos &theta;(1 - sin &theta;))/sin &theta;` &rArr; p2 &minus; q2 = `((cos &theta;(1 + sin &theta;))/sin &theta;)^2 - ((cos &theta;(1 - sin &theta;))/sin &theta;)^2` = `(cos^2 &theta;(1 + sin &theta;)^2)/(sin^2 &theta;) - (cos^2 &theta;(1 - sin &theta;)^2)/sin^2 &theta;` = `(cos^2 &theta;)/(sin^2 &theta;)` [1 + sin2 &theta; + 2sin &theta; &minus; 1 &minus; sin2 &theta; + 2 sin &theta;] = `(cos^2 &theta;)/(sin^2 &theta;) xx 4sin &theta;` = `(4 cos^2 &theta;)/sin &theta;` &rArr; p &times; p = `(cos &theta;(1 + sin &theta;))/(sin &theta;) xx (cos &theta;(1 - sin &theta;))/sin &theta;` = `(cos^2 &theta;)/(sin^2 &theta;) (1 - sin^2 &theta;)` = `(cos^2 &theta;)/(sin^2 &theta;) cos^2 &theta;` &rArr; pq = `(cos^4 &theta;)/(sin^ 2 &theta;)` `sqrt(pq) = cos^2&theta;/sin&theta;` `4sqrt(pq) = (4cos^2&theta;)/sin&theta; - p^2 - q^2` &there4; `p^2 - q^2 = 4sqrt(pq)` &there4; Hence proved.

If cot θ + cos θ = p and cot θ − cos θ = q, prove that 𝑝^2 −𝑞^2 =4⁢√𝑝⁢𝑞. - Mathematics

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If cot θ + cos θ = p and cot θ − cos θ = q, prove that 𝑝^2 −𝑞^2 =4⁢√𝑝⁢𝑞. - Mathematics

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