If (a^n + b^n)/(a^(n-1) + b^(n-1)) is the G.M between a & b find the value of'n'?

3 Answers
mason m
Aug 20, 2017

a=b and n doesn't matter.

Explanation:

The geometric mean of x and y is given by sqrt(xy).

Thus,

sqrt(ab)=(a^n+b^n)/(a^(n-1)+b^(n-1))

Cross multiplying yields:

(ab)^(1/2)(a^(n-1)+b^(n-1))=a^n+b^n

a^(n-1/2)b^(1/2)+a^(1/2)b^(n-1/2)=a^n+b^n

a^nsqrt(b/a)+b^nsqrt(a/b)=a^n+b^n

Comparing coefficients, we see that sqrt(a/b)=1 and sqrt(b/a)=1. Thus, a=b and n is irrelevant.

George C.
Aug 20, 2017

n=1/2

Explanation:

Putting n = 1/2 we find:

(a^n+b^n)/(a^(n-1)+b^(n-1)) = (sqrt(a)+sqrt(b))/(1/sqrt(a)+1/sqrt(b))

color(white)((a^n+b^n)/(a^(n-1)+b^(n-1))) = (sqrt(a)+sqrt(b))/(((sqrt(a)+sqrt(b))/(sqrt(a)sqrt(b))))

color(white)((a^n+b^n)/(a^(n-1)+b^(n-1))) = sqrt(a)sqrt(b)

color(white)((a^n+b^n)/(a^(n-1)+b^(n-1))) = sqrt(ab)

i.e. the geometric mean of a and b.

Cesareo R.
Aug 20, 2017

n = 1/2

Explanation:

Assuming that G.M stands for geometric mean, we have

sqrt(a b) = (a^n + b^n)/(a^(n - 1) + b^(n - 1)) so squaring and simplifying we have

ab = (a^(2n)+2 a^n b^n + b^(2n))/(a^(2n-2)+2a^(n-1)b^(n-1)+b^(2n-2)) or

b a^(2n-1)+2a^nb^n+a b^(2n-1)=a^(2n)+2 a^n b^n + b^(2n) or

b/a a^(2n)+a/b b^(2n) = a^(2n)+b^(2n) or

(b-a)/a a^(2n)-(b-a)/b b^(2n) = 0

Now assuming a ne b

a^(2n)b-ab^(2n) = 0 or

(a/b)^(2n)= a/b rArr 2n=1 rArr n = 1/2

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