" If "(a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)...

" If "(a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(x!=0)," then show that "a,b,c" and "d" are in GR."

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(a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(x!=0) then show that a,b,c and d are in G.P.

If (a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(x!=0) then show that a,b,c and d are in G.P.

If (a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)(xne0) then show that a,b,c and d are in G.P.

If (a+bx)/(a-bx)=(b +cx)/(b-cx)=(c+dx)/(c-dx) (x ne 0) , then show that a, b, c and d are in G.P.

If (a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx)( x ne 0) then show that a, b, c and d are in G.P.

If (a+bx)/(a-bx)=(b-cx)/(b-cx)=(c+dx)/(c-dx)( x ne 0) then show that a, b, c and d are in G.P.

If (a+bx)/(a-bx)=(b-cx)/(b-cx)=(c+dx)/(c-dx)( x ne 0) then show that a, b, c and d are in G.P.

If (a+bx)/(a-bx)=(b-cx)/(b-cx)=(c+dx)/(c-dx)( x ne 0) then show that a, b, c and d are in G.P.

If (a+bx)/(a-bx) =(b+cx)/(b-cx) =(c + dx)/(c-dx) (x ne 0) , then show that a,b,c and d are G.P.

If (a+bx)/(a-bx)=(b+cx)/(b-cx)=(c+dx)/(c-dx) (x+-0) then show a,b,c and d are in G.P

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