The initial amount in the jackpot was x dollars. The amount added to the jackpot was [tex] (1 \frac{1}{2}) x= \frac{3}{2} x[/tex]. So the amount in the jackpot on the next day would be [tex] \frac{3}{2}x+x= \frac{5}{2}x [/tex] dollars.
So the amount in the jackpot on the next day would [tex] \frac{5}{2} [/tex] of the previous day. This can be modeled by a geometric sequence with the following formula
[tex]A=x \cdot r^{n}[/tex]
where A = amount in future,
x = initial amount,
r = rate of change,
n= number of days.
In this case, A = 4747.50, r = [tex] \frac{5}{2} = 2.5 , n = 5. [/tex]
Hence,
[tex]4747.50=x\cdot 2.5^{5} \\
4747.50=97.6563x \\
x=49[/tex]
Thus x = $49.
