If the sides `a, b` & `c` `/_ABC` is such that `a/(1+alpha^(2)beta^(2))=b/(alpha^(2)+beta^(2))=c/((1-alpha^(2))(1+beta^(2)))` thenA. `A=2tan^(-1)(alpha//beta)`B. `beta=2tan^(1-)(alpha beta)`C. area of `/_ABC=(alpha beta ab)/(alpha^(2)+beta^(2))`D. area of `/_ABC=(alpha beta bc)/(alpha^(2)+beta^(2))`

If the sides `a, b` & `c` `/_ABC` is such that `a/(1+alpha^(2)beta^(2)

1.	If the sides `a, b` & `c` `/_ABC` is such that `a/(1+alpha^(2)beta^(2))=b/(alpha^(2)+beta^(2))=c/((1-alpha^(2))(1+beta^(2)))` thenA. `A=2tan^(-1)(alpha//beta)`B. `beta=2tan^(1-)(alpha beta)`C. area of `/_ABC=(alpha beta ab)/(alpha^(2)+beta^(2))`D. area of `/_ABC=(alpha beta bc)/(alpha^(2)+beta^(2))`
Answer» Correct Answer - A::B::D `a/(1+alpha^(2)beta^(2))=b/(alpha^(2)+beta^(2))=c/((1-alpha^(2))(1+beta^(2)))=(2s)/(2+2beta^(2))` `implies s/(1+beta^(2))=a/(1+alpha^(2)beta^(2))implies(s-a)/(beta^(2)(1-alpha^(2)))=a/(1+alpha^(2)beta^(2))` `implies s=a=(a(1-alpha^(2))beta^(2))/(1+alpha^(2)beta^(2))` Similarly `s-b=(b(1-alpha^(2)))/(alpha^(2)+beta^(2))` `s-c=(calpha^(2))/(1-alpha^(2))` & `s=(b(1+beta^(2)))/(alpha^(2)+beta^(2))` `:. tan^(2)(A//2)=((s-b)(s-c))/(s(s-a))=((b(1-alpha^(2)))/(alpha^(2)+beta^(2)).(calpha^(2))/(1-alpha^(2)))/(b(1+beta^(2))/(alpha^(2)+beta^(2)) (a(1-alpha^(2))beta^(2))/(1+alpha^(2)beta^(2)))` `[Qa=(c(1+alpha^(2)beta^(2)))/((1-alpha^(2))(1+beta^(2)))]` `implies (alpha^(2))/(beta^(2))` `A=2tan^(-1)(alpha//beta)` `B=2tan^(-1)(alphabeta)` `:.` Reqd area `=1/2 bc sin A = 1/2 bc. (2tan (A//2))/(1+tan^(2)(A//2))=(bcalphabeta)/(alpha^(2)+beta^(2))`

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