If the first and the nth term of a G.P. are a and b, respectively, and if P is the product of n terms , prove that `P^(2)=(ab)^(n)`.

If the first and the n^(t h) term of a GP are a and b, respectively, and if P is the product of n terms, prove that P^2=(a b)^n .

If the first and the n^("th") term of a G.P. are a and b, respectively, and if P is the product of n terms, prove that P^2 = (ab)^n .

If the first and the n^(th) terms of a G.P. are a and b respectively and if p is the product of n terms, prove that p^2=(ab)^n

If the first and the n^("th") term of a G.P. are a and b, respectively, and if P is the product of n terms, prove that P^2 = (ab)^n .

If the first and the n^("th") term of a G.P. are a and b, respectively, and if P is the product of n terms, prove that P^2 = (ab)^n .

If the first and the n^("th") term of a G.P. are a and b, respectively, and if P is the product of n terms, prove that P^2 = (ab)^n .

If the first and the n^( th) term of a . G . P are a and b , respectively, and if P is the product of n terms, prove that P^2=(a b)^n .

If the first and the nth terms of a G.P,are a and b ,respectively,and if P is hte product of the first n terms prove that P^(2)=(ab)^(n).

If the first and the nth terms of a G.P., are a and b respectively, and if P is the product of the first n terms. prove that P^2=(a b)^n