Find the value of `n` so that `(a^(n+1)+b^(n+1))/(a^n+b^n)` may be the geometric mean between `a` and `b`.

Find n, so that (a^(n+1)+b^(n+1))/(a^(n)+b^(n))(a ne b ) be HM beween a and b.

For what value of n ,\ dot(a^(n+1)+b^(n+1))/(a^n+b^n) is the arithmetic mean of a\ a n d\ b ?

If (a^(n+1)+b^(n+1))/(a^n+b^n) harmonic mean of a&b then n is

If (a^(n+1)+b^(n+1))/(a^n+b^n) is the A.M. between a and b . Then, find the value of n

For what value of n , (a ^(n +3) + b ^(n +3))/(a ^(n +2) + b ^(n +2)), a ne b in the A.M. of a and b.

If the geometric mean of a and b is (a^(n+1)+b^(n+1))/(a^(n)+b^(n)) then n = ?

If the G.M. of a and b is (a^(n)+b^(n))/(a^(n-1)+b^(n-1)) then find the value of n.

In the arithmetic mean of a and b is (a^(n)+b^(n))/(a^(n-1)+b^(n-1)) then n= ?

Find the value of n so that the subnormal at any point on the curve xy^n = a^(n+1) may be constant.

If n geometric means are inserted between two quantities ; then the product of n geometric means is the nth power of the single geometric mean between two quantities.