Question

If alpha and beta are acute and are roots of 2 tan square theta +35tan theta+2=0 then show that alpha +beta=pie by 2

Answer 1

Answer:

Step-by-step explanation:

If alpha and beta are acute and are roots of 2 tan square theta +35tan theta+2=0 then show that alpha +beta=pie by 2

If α and β are acute

=> Tan α  & Tan β would be positive

if Tan α  & Tan β are positive

then 2Tan²θ +35tanθ would always be + ve

hence 2Tan²θ +35tanθ + 2 ≥ 2

so 2Tan²θ +35tanθ + 2 can not be zero

Hence Data given in question is wrong