The given series is related to the binomial expansion for any index. The binomial expansion for (1−x)−n when |x|<1 is given by : (1−x)−n=1+nx+‌
n(n+1)
1â‹…2
x2+‌
n(n+1)(n+2)
1â‹…2â‹…3
x3+... To relate the series with the binomial expansion, consider setting x=‌
1
2
and n=‌
2
3
. The substitution into the binomial formula results in : (‌
1
2
)−‌
2
3
=1+‌
2â‹…1
3â‹…2
+‌
2â‹…5â‹…1
3â‹…6â‹…4
+... This series equates to ‌3√4 : ‌3√4=1+‌
2â‹…1
3â‹…2
+‌
2â‹…5â‹…1
3â‹…6â‹…4
+... Thus, the assertion that this infinite series sums to ‌3√4 is correct, and it is derived from the application of the binomial series expansion with the appropriate substitutions for x and n.