If acosθ + bsinθ = c have roots α and β. Then, what will be the value of sinα + sinβ?(a) 2bc/(a^2 + b^2)(b) 0(c) 1(d) (c^2 + a^2)/(a^2 + b^2)I had been asked this question in quiz.My enquiry is from Quadratic Equations in division Complex Numbers and Quadratic Equations of Mathematics – Class 11

If acosθ + bsinθ = c have roots α and β. Then, what will be the va

1.	If acosθ + bsinθ = c have roots α and β. Then, what will be the value of sinα + sinβ?(a) 2bc/(a^2 + b^2)(b) 0(c) 1(d) (c^2 + a^2)/(a^2 + b^2)I had been asked this question in quiz.My enquiry is from Quadratic Equations in division Complex Numbers and Quadratic Equations of Mathematics – Class 11
Answer» Correct choice is (a) 2bc/(a^2 + b^2) Explanation: Given, acosθ + bsinθ = c So, this implies acosθ = c – bsinθ Now squaring both the sides we get, (acosθ)^2 = (c – bsinθ)^2 a^2 cos^2 θ = c^2 + b^2 sin^2 θ – 2b c sinθ a^2 (1- sin^2 θ) = c^2 + b^2 sin^2 θ – 2b c sinθ a^2 – a^2 sin^2 θ = c^2 + b^2 sin^2 θ – 2b c sinθ Now REARRANGING the ELEMENTS, (a^2 + b^2) sin^2 θ – 2b c sinθ+( c^2 – a^2) = θ So, as SUM of the roots are in the form –b/a if there is a quadratic equation ax^2 + bx + c = 0 Now, we can CONCLUDE that sinα + sinβ = 2bc/(a^2 + b^2).

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