Let α and β be two real roots of the equation (k + 1)tan²x − √2 ⋅ λtanx = (1 – k), where k(≠ -1) and λ are real numbers. If tan²(α + β) = 50, then a value of λ is: &lt;!-- [if !supportLineBreakNewLine]--&gt; &lt;!--[endif]--&gt;

5√2

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Complex Numbers and Quadratic Equations Ncert Solutions Maths class 11th Maths Class 11th

Let α and β be two real roots of the equation (k + 1)tan²x − √2 ⋅ λtanx = (1 – k), where k(≠ -1) and λ are real numbers. If tan²(α + β) = 50, then a value of λ is:

Option 1 -

Option 2 -

Option 3 -

5√2

Option 4 -

10√2

3 Views | Posted 4 weeks ago

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Answered by

alok kumar singh | Contributor-Level 10

4 weeks ago

Correct Option - 1

Detailed Solution:

For the quadratic equation (k+1)tan²x - √2λ tanx + (k-1) = 0, the roots are tanα and tanβ.
Sum of roots: tanα + tanβ = √2λ / (k+1).
Product of roots: tanα tanβ = (k-1) / (k+1).
tan (α + β) = (tanα + tanβ) / (1 - tanα tanβ)
tan (α + β) = [√2λ / (k+1)] / [1 - (k-1)/ (k+1)]
tan (α + β) = [√2λ / (k+1)] / [ (k+1 - k + 1)/ (k+1)] = (√2λ) / 2 = λ/√2.
Given tan² (α+β) = 50.
(λ/√2)² = 50
λ²/2 = 50 ⇒ λ² = 100 ⇒ &lambd

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Let α and β be two real roots of the equation (k + 1)tan²x − √2 ⋅ λtanx = (1 – k), where k(≠ -1) and λ are real numbers. If tan²(α + β) = 50, then a value of λ is:

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