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Question

If a cos2x+b sin2x=c has α and β as its roots, then prove that

(i) tanα+tanβ=2ba+c [NCERT EXEMPLAR]

(ii) tanα tanβ=c-ac+a

(iii) tanα+β=ba [NCERT EXEMPLAR]

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Solution

Given: a cos2x+b sin2x=c

a1-tan2x1+tan2x+b2tanx1+tan2x-c=0a1-tan2x+2b tanx-c1+tan2x=0a-a tan2x+2b tanx-c-c tan2x=0a+c tan2x-2b tanx+c-a=0 .....1

This a quadratic equation in terms of tan2x.

It is given that α and β are the roots of the given equation, so tanα and tanβ are the roots of (1).

Since tanα and tanβ are the roots of the equation a+c tan2x-2b tanx+c-a=0. Therefore,

(i)
tanα+tanβ=--2ba+c Sum of roots=-batanα+tanβ=2ba+c

(ii)

tanα tanβ=c-aa+c Product of roots=caOr tanα tanβ=c-ac+a

(iii)
tanα+β=tanα+tanβ1-tanα tanβ =2ba+c1-c-ac+a From i and ii =2ba+cc+a-c+ac+a =2b2a =ba

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