(-g-2)^3=(-n+4)^3=(-m-5)^3=​

To find the values of g, n, and m that satisfy the equation $(-g-2)^3=(-n+4)^3=(-m-5)^3$, we can set up a system of equations and solve for each variable one at a time.

First, let's set up the equations:

1. $(-g-2)^3 = (-n+4)^3$
2. $(-g-2)^3 = (-m-5)^3$

We'll start by solving equation 1:

$(-g-2)^3 = (-n+4)^3$

To remove the cube root, take the cube root of both sides:

$-g-2 = -n+4$

Now, let's solve for g:

$g = -n+4+2$ $g = -n+6$

Next, we'll solve equation 2:

$(-g-2)^3 = (-m-5)^3$

Take the cube root of both sides:

$-g-2 = -m-5$

Solve for g:

$g = -m-5+2$ $g = -m-3$

So, we have two expressions for g:

1. $g = -n+6$
2. $g = -m-3$

Now, you can choose values for n and m, and these equations will give you corresponding values for g that satisfy the original equation $(-g-2)^3=(-n+4)^3=(-m-5)^3$. You can choose any values for n and m to find a corresponding value for g.

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