Given α,β,γ are in G.P.⇒β2=αγ
For the equation αx2+2βx+γ=0
D=4β2−4αγ=0
Hence roots of the equation are equal and equals to –αβ=−βγ
Since given equation have common roots, hence β−γ must be a root of x2+x−1=0
⇒β2γ2−βγ−1=0
⇒γ2−γβ−β2=0
⇒γ2=β(β+γ)
⇒γ.αβ2=β(β+γ)
⇒α(β+γ)=βγ