The prison of your city has *n* prisoners. As the prison can't accommodate all of them, the city mayor has decided to transfer *c* of the prisoners to a prison located in another city.

For this reason, he made the *n* prisoners to stand in a line, with a number written on their chests. The number is the severity of the crime he/she has committed. The greater the number, the more severe his/her crime was.

Then, the mayor told you to choose the *c* prisoners, who will be transferred to the other prison. He also imposed two conditions. They are,

- The chosen
*c*prisoners has to form a contiguous segment of prisoners. - Any of the chosen prisoner's crime level should not be greater then
*t*. Because, that will make the prisoner a severe criminal and the mayor doesn't want to take the risk of his running away during the transfer.

Find the number of ways you can choose the *c* prisoners.

The first line of input will contain three space separated integers *n* (1 ≤ *n* ≤ 2·10^{5}), *t* (0 ≤ *t* ≤ 10^{9}) and *c* (1 ≤ *c* ≤ *n*). The next line will contain *n* space separated integers, the *i*^{th} integer is the severity *i*^{th} prisoner's crime. The value of crime severities will be non-negative and will not exceed 10^{9}.

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