If the $$p^{th}, \ q^{th},$$ and $$r^{th}$$ terms of an A.P. are in G.P., then common ratio of the G.P. is
Correct option is D. $$\dfrac{q-r}{p-q}$$
$$p^{th}, \ q^{th}, \ r^{th}$$ terms of A.P. are
$$a + (p-1)d = x$$ (1)
$$a + (q-1)d = xR$$ (2)
$$a + (r-1)d = xR^2$$ (3)
Where r is common ratio of G.P.
Subtracting (2) from (3) and (1) from (2) and then dividing the former by the later, we have
$$\dfrac{q-r}{p-q} = \dfrac{xR^2 - xR}{xR - x} = R$$