# hadamard matrix उदाहरण वाक्य

### उदाहरण वाक्य

*Hadamard matrix*is formed by rearranging the rows so that the number of sign-changes in a row is in increasing order.- The circulant
*Hadamard matrix*conjecture, however, asserts that, apart from the known 1? and 4? examples, no such matrices exist. - The Hadamard code, by contrast, is constructed from the
*Hadamard matrix*H _ { 2 ^ n } by a slightly different procedure. - The number of Hadamard designs from each
*Hadamard matrix*is 23 choose 6; that is 100, 947 designs from each 24?4 Hadamard matrix. - The number of Hadamard designs from each Hadamard matrix is 23 choose 6; that is 100, 947 designs from each 24?4
*Hadamard matrix*. - For the second FEC layer : every ASCII character is encoded as one of 64 possible Walsh functions ( or vectors of a
*Hadamard matrix*). - In that case, other statistical methods may be used to fractionate a
*Hadamard matrix*in such a way that allows only a tolerable amount of aliasing. - This construction demonstrates that the rows of the
*Hadamard matrix*H _ { 2 ^ n } can be viewed as a length 2 ^ n linear generating matrix F _ n. - Given an
*Hadamard matrix*of size 4 " a " in standardized form, remove the first row and first column and convert every " 1 to a 0. - Let " H " be an
*Hadamard matrix*of order 4 " m " in standardized form ( first row and column entries are all + 1 ).