see the attached file and answer it for me
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MATE
YOUR SOLUTION IS IN ATTACHED PICTURE ☺️
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Step-by-step explanation:
Let the given Geometrical progression be :
a, a r , a r², a r³ , .....
m+n^{th} \: term: a \: r^{m+n-1} = p\\m-n^{th} \: term: a \: r^{m-n-1} = q\\\\=\ \textgreater \ r^{2n} = p/q\\=\ \textgreater \ r = (p/q)^{\frac{1}{2n}}\\\\Also, \: a^2 \: r^{2m-2}=p q\\ \implies a \: r^{m-1}=\sqrt{pq}=m^{th} \: term \: of \: GP\\\\n^{th} \: term =a \: r^{n-1}=\frac{p}{r^{m+n-1}}*r^{n-1}=\frac{p}{r^m}=p*r^{-m}\\\\=p*(\frac{p}{q})^{\frac{-m}{2n}}=p*(\frac{q}{p})^{\frac{m}{2n}}
So its is proved.
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