The determinant of a matrix 2 × 2 is defined as follows:

A matrix is called degenerate if its determinant is equal to zero.

The norm ||A|| of a matrix A is defined as a maximum of absolute values of its elements.

You are given a matrix . Consider any degenerate matrix B such that norm ||A - B|| is minimum possible. Determine ||A - B||.

The first line contains two integers a and b (|a|, |b| ≤ 10⁹), the elements of the first row of matrix A.

The second line contains two integers c and d (|c|, |d| ≤ 10⁹) the elements of the second row of matrix A.

Output a single real number, the minimum possible value of ||A - B||. Your answer is considered to be correct if its absolute or relative error does not exceed 10^- 9.