This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and removed.Find sources: "Imperiali quota" – news · newspapers · books · scholar · JSTOR (September 2014) (Learn how and when to remove this template message)

The Imperiali quota is a formula used to calculate the minimum number, or quota, of votes required to capture a seat in some forms of single transferable vote or largest remainder method party-list proportional representation voting systems. It is distinct from the Imperiali method, a type of highest average method. It is named after Belgian senator Pierre Imperiali.

The Czech Republic is the only country that currently uses this allocation system,[citation needed] while Italy and Ecuador used it in the past.

If many party lists poll just over the Imperiali quota, it is possible for this method to distribute more seats than there are vacancies to fill (this is not possible with the Hare or Droop quotas). If this occurs, the result needs to be recalculated with a higher quota (usually the Droop quota). If it does not happen, Imperiali usually distributes seats in a similar fashion to the D'Hondt method.

The Imperiali quota should not be confused with the highest average method, which is also called Imperiali.

## Formula

The Imperiali quota may be given as:

${\displaystyle {\frac ((\mbox{total))\;{\mbox{votes))}((\mbox{total))\;{\mbox{seats))+2))}$
• Total votes = the total valid poll; that is, the number of valid (unspoilt) votes cast in an election.
• Total seats = the total number of seats to be filled in the election.

## An example of use in STV

To see how the Imperiali quota works in an STV election imagine an election in which there are two seats to be filled and three candidates: Andrea, Carter and Brad. There are 100 voters as follows:

 65 voters Andrea Carter 15 voters Carter 20 voters Brad

There are 100 voters and 2 seats. The Imperiali quota is therefore:

${\displaystyle {\frac {100}{2+2))=25}$

To begin the count the first preferences cast for each candidate are tallied and are as follows:

• Andrea: 65
• Carter: 15
• Brad: 20

Andrea has more than 25 votes. She therefore has reached the quota and is declared elected. She has 40 votes more than the quota so these votes are transferred to Carter, as specified on the ballots. The tallies therefore become:

• Carter: 55
• Brad: 20

Carter has now reached the quota so he is declared elected. The winners are therefore Andrea and Carter.