Question

`a` i s The arithmetic mean of two positive numbers `b and c` . `G_1` and `G_2` are the geometric mean between the same positive numbers `b and c` so prove that `G_1^3+G_2^3`=`2abc` ?

Answer 1

Please see below.

Explanation:

Here,

`color(blue)("a is the AM of b and c " =>(b+c)/2=a=>b+c=2ato(1)`

Now, `color(red)(G_1 and G_2 " are the GM between b and c."`

So, `b,G_1,G_2,c " are in GP"`

Let `r " be the common ratio and b is the first term."`

So, `b, br, br^2,br^3 " are in GP"`

`i.e. color(blue)(G_1=br ,G_2=br^2 ,c=br^3......to(2)`

Let us take LHS.

`LHS=(G_1)^3+(G_2)^3`

`LHS=(br)^3+(br^2)^3`

`LHS=b^3r^3+b^3r^6`

`LHS=b^2color(blue)((br^3))+b(color(blue)(br^3))^2`

`LHS=b^2color(blue)((c))+bcolor(blue)((c)^2....to["using " (2) ]`

`LHS=bc{color(blue)(b+c)}`

`LHS=bc{color(blue)(2a)}...............to["using " (1)]`

`LHS=2abc`

`LHS=RHS`