The ratio of sum of $n$ terms of two Arithmetic Progressions is
$r_n= \frac{ 3n - 3}{5n + 21}$
I'm asked to find the ratio of sum of $24$th term.
The ratio of sum of $n$ terms of two Arithmetic Progressions is
$r_n= \frac{ 3n - 3}{5n + 21}$
I'm asked to find the ratio of sum of $24$th term.
You have one progression that is $a, a+d, a+2d, \ldots$ and another that is $b, b+e, b+2e, \ldots$ The problem promises that $\frac ba=0$ (assuming that the count starts with 1). BTW please put parentheses in your expression. I am sure you mean $\frac {3n-3}{5n+21}$ but you wrote $3n-\frac 3{5n}+21$