\left. \begin{array} { l } { k = 1 + 5 }\\ { l = {(\frac{2}{3})} ^ {k} }\\ { m = l }\\ { n = m }\\ { o = n }\\ { p = o }\\ { q = p }\\ { r = q }\\ { s = r }\\ { t = s }\\ { \text{Solve for } u \text{ where} } \\ { u = t } \end{array} \right.
Solve for k, l, m, n, o, p, q, r, s, t, u
u=\frac{64}{729}\approx 0.087791495
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k=6
Consider the first equation. Add 1 and 5 to get 6.
l=\left(\frac{2}{3}\right)^{6}
Consider the second equation. Insert the known values of variables into the equation.
l=\frac{64}{729}
Calculate \frac{2}{3} to the power of 6 and get \frac{64}{729}.
m=\frac{64}{729}
Consider the third equation. Insert the known values of variables into the equation.
n=\frac{64}{729}
Consider the fourth equation. Insert the known values of variables into the equation.
o=\frac{64}{729}
Consider the fifth equation. Insert the known values of variables into the equation.
p=\frac{64}{729}
Consider the equation (6). Insert the known values of variables into the equation.
q=\frac{64}{729}
Consider the equation (7). Insert the known values of variables into the equation.
r=\frac{64}{729}
Consider the equation (8). Insert the known values of variables into the equation.
s=\frac{64}{729}
Consider the equation (9). Insert the known values of variables into the equation.
t=\frac{64}{729}
Consider the equation (10). Insert the known values of variables into the equation.
u=\frac{64}{729}
Consider the equation (11). Insert the known values of variables into the equation.
k=6 l=\frac{64}{729} m=\frac{64}{729} n=\frac{64}{729} o=\frac{64}{729} p=\frac{64}{729} q=\frac{64}{729} r=\frac{64}{729} s=\frac{64}{729} t=\frac{64}{729} u=\frac{64}{729}
The system is now solved.
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