If-in-triangle-ABC-cosB-b-cosC-c-show-that-the-triangle-is-isosceles-

Tinku Tara June 4, 2023 Trigonometry 0 Comments

Question Number 46570 by scientist last updated on 28/Oct/18

If in triangle ABC ((cosB)/b) =((cosC)/c), show that the triangle is isosceles

$${If}\:{in}\:{triangle}\:{ABC}\:\:\:\frac{{cosB}}{{b}}\:=\frac{{cosC}}{{c}},\:{show}\:{that}\:{the} \\ $$$${triangle}\:{is}\:{isosceles} \\ $$

Answered by tanmay.chaudhury50@gmail.com last updated on 28/Oct/18

((sinA)/a)=((sinB)/b)=((sinC)/c) ((cosB)/(cosC))=((sinB)/(sinC))=(b/c) sinBcosC−sinCcosB=0 sin(B−C)=0 so B−C=0 ∠B=∠C proved

$$\frac{{sinA}}{{a}}=\frac{{sinB}}{{b}}=\frac{{sinC}}{{c}} \\ $$$$\frac{{cosB}}{{cosC}}=\frac{{sinB}}{{sinC}}=\frac{{b}}{{c}} \\ $$$${sinBcosC}−{sinCcosB}=\mathrm{0} \\ $$$${sin}\left({B}−{C}\right)=\mathrm{0}\:\:\:{so}\:{B}−{C}=\mathrm{0} \\ $$$$\angle{B}=\angle{C}\:\:\:{proved} \\ $$

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