In Taxmania dead cats are prohibited from owning stock, so when Mittens died, all her shares (units) of stock in Mittens Conglomerated were sold, with $30\% $ of the capital gains paid as taxes. Your task is to compute how much money the final sale of Mittens’ shares yields, after paying taxes on the profits. There are no tax effects from selling at a loss.
Mittens stock records indicate the history of her purchases and sales of shares, and at what costs they were made. In addition, they indicate when the company performed splits and merges of its stock. When the company splits its stock, every share is replaced by $x$ new shares, and the value divided evenly between them. When the company merges its stock, every $x$ shares are replaced by a single stock. If Mittens can not merge all her shares (due to her number of shares not being divisible by $x$), she is forced to sell any remainder stock (at a price equal to the current average cost of her shares).
For example, consider the following sequence of events (corresponding to Sample Input 2):
Mittens buys $10$ shares for $10$ crowns per share.
Mittens buys $30$ shares for $5$ crowns per share. The average cost of her $40$ shares is now $\frac{10 \cdot 10 + 30 \cdot 5}{10 + 30} = 6.25$ crowns.
Mittens sells $31$ shares for $8$ crowns per share. The profit is $8-6.25=1.75$ crowns per share (which is subject to capital gains tax but that is irrelevant). The sale does not change the average cost of Mittens’ shares.
The company performs a split with $x=2$. Mittens’ shares split into $2 \cdot 9 = 18$ shares, of average cost $6.25 / 2 = 3.125$.
The company performs a merge with $x=8$. Mittens merges $16$ of her $18$ shares into $2$ new shares of average cost $8 \cdot 3.125 = 25$. The last two remaining old shares can not be merged and Mittens is forced to sell them.
Mittens dies and her $2$ shares are sold for $42$ crowns per share. The profit is $42-25=17$ crowns per share, which is subject to the $30\% $ tax. The total amount obtained from the final sale after taxes is thus $2 \cdot (42 - 17 \cdot 0.3) = 73.8$ crowns.
The input contains a sequence of at most $10\, 000$ events in chronological order. Each event is in one of the following forms:
“buy $x$ $y$”: Mittens bought $x$ shares of stock at $y$ crowns per share.
“sell $x$ $y$”: Mittens sold $x$ shares of stock at $y$ crowns per share (and used the money for purposes unknown). The value of $x$ is no greater than the number of shares owned before the event.
“split $x$”: The stock split with $x$ new shares for each share.
“merge $x$”: The stock merged with one new share for every $x$ shares.
“die $y$”: The remaining shares were sold off at the death of Mittens for $y$ crowns per share. This event happens exactly once and is guaranteed to be the last event in the input.
In all events, $x$ and $y$ are integers satisfying $1 \le x \le 1\, 000$ and $1 \le y \le 1\, 000$. You may assume that at any point in time in the event history, the total number of shares of stock owned by Mittens was at most $10^6$.
Output a single line containing the number of crowns obtained (after paying taxes) in the final sale of Mittens’ stock after her death. The answer should be accurate to within an absolute error of at most $0.01$.
Sample Input 1 | Sample Output 1 |
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buy 1 15 split 3 sell 1 5 die 4 |
8.00000000 |
Sample Input 2 | Sample Output 2 |
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buy 10 10 buy 30 5 sell 31 8 split 2 merge 8 die 42 |
73.8 |