#include #include const int Mod = 998244353, bit[21] = {1, 2, 4, 8, 16, 32, 64, 128, 256, 512, 1024, 2048, 4096, 8192, 16384, 32768, 65536, 131072, 262144, 524288, 1048576}, bit_inv[21] = {1, 499122177, 748683265, 873463809, 935854081, 967049217, 982646785, 990445569, 994344961, 996294657, 997269505, 997756929, 998000641, 998122497, 998183425, 998213889, 998229121, 998236737, 998240545, 998242449, 998243401}, root[21] = {1, 998244352, 911660635, 372528824, 929031873, 452798380, 922799308, 781712469, 476477967, 166035806, 258648936, 584193783, 63912897, 350007156, 666702199, 968855178, 629671588, 24514907, 996173970, 363395222, 565042129}, root_inv[21] = {1, 998244352, 86583718, 509520358, 337190230, 87557064, 609441965, 135236158, 304459705, 685443576, 381598368, 335559352, 129292727, 358024708, 814576206, 708402881, 283043518, 3707709, 121392023, 704923114, 950391366}; int ntt_b[21][1048576], ntt_c[21][1048576], ntt_x[21][1048576], ntt_y[21][1048576]; long long div_mod(long long x, long long y, long long z) { if (x % y == 0) return x / y; else return (div_mod((1 + x / y) * y - x, (z % y), y) * z + x) / y; } void NTT(int k, int a[], int z[]) { if (k == 0) { z[0] = a[0]; return; } int i, d = bit[k-1], tmpp; long long tmp; for (i = 0; i < d; i++) { ntt_b[k][i] = a[i*2]; ntt_c[k][i] = a[i*2+1]; } NTT(k - 1, ntt_b[k], ntt_x[k]); NTT(k - 1, ntt_c[k], ntt_y[k]); for (i = 0, tmp = 1; i < d; i++, tmp = tmp * root[k] % Mod) { tmpp = tmp * ntt_y[k][i] % Mod; z[i] = ntt_x[k][i] + tmpp; if (z[i] >= Mod) z[i] -= Mod; z[i+d] = ntt_x[k][i] - tmpp; if (z[i+d] < 0) z[i+d] += Mod; } } void NTT_reverse(int k, int z[], int a[]) { if (k == 0) { a[0] = z[0]; return; } int i, d = bit[k-1], tmpp; long long tmp; for (i = 0; i < d; i++) { ntt_x[k][i] = z[i*2]; ntt_y[k][i] = z[i*2+1]; } NTT_reverse(k - 1, ntt_x[k], ntt_b[k]); NTT_reverse(k - 1, ntt_y[k], ntt_c[k]); for (i = 0, tmp = 1; i < d; i++, tmp = tmp * root_inv[k] % Mod) { tmpp = tmp * ntt_c[k][i] % Mod; a[i] = ntt_b[k][i] + tmpp; if (a[i] >= Mod) a[i] -= Mod; a[i+d] = ntt_b[k][i] - tmpp; if (a[i+d] < 0) a[i+d] += Mod; } } void prod_poly_NTT(int da, int db, int a[], int b[], int c[]) { int i, k; for (k = 0; bit[k] < da + db - 1; k++); for (i = da; i < bit[k]; i++) a[i] = 0; for (i = db; i < bit[k]; i++) b[i] = 0; int *x = (int*)malloc(sizeof(int) * bit[k]), *y = (int*)malloc(sizeof(int) * bit[k]), *z = (int*)malloc(sizeof(int) * bit[k]); NTT(k, a, x); NTT(k, b, y); for (i = 0; i < bit[k]; i++) z[i] = (long long)x[i] * y[i] % Mod; NTT_reverse(k, z, c); for (i = 0; i < da + db - 1; i++) c[i] = (long long)c[i] * bit_inv[k] % Mod; free(x); free(y); free(z); } const int THR = 1000; // Compute the values b[0-N] of elementary symmetric polynomials of a[1-N] in O(N * (log N)^2) time void elementary_symmetric_polynomial(int N, int a[], int b[]) { int i, j, deg[200001], *x[200001], head, tail, tmp[3][262144]; for (i = 1; i <= N; i++) { deg[i] = 1; x[i] = (int*)malloc(sizeof(int) * (deg[i] + 1)); x[i][0] = 1; x[i][1] = a[i]; } for (head = 1, tail = N; head < tail; head += 2) { deg[++tail] = deg[head] + deg[head+1]; x[tail] = (int*)malloc(sizeof(int) * (deg[tail] + 1)); if (deg[tail] <= THR) { for (i = 0; i <= deg[tail]; i++) x[tail][i] = 0; for (i = 0; i <= deg[head]; i++) { for (j = 0; j <= deg[head+1]; j++) { x[tail][i+j] += (long long)x[head][i] * x[head+1][j] % Mod; if (x[tail][i+j] >= Mod) x[tail][i+j] -= Mod; } } } else { for (i = 0; i <= deg[head]; i++) tmp[0][i] = x[head][i]; for (i = 0; i <= deg[head+1]; i++) tmp[1][i] = x[head+1][i]; prod_poly_NTT(deg[head] + 1, deg[head+1] + 1, tmp[0], tmp[1], tmp[2]); for (i = 0; i <= deg[tail]; i++) x[tail][i] = tmp[2][i]; } free(x[head]); free(x[head+1]); } for (i = 0; i <= N; i++) b[i] = x[tail][i]; free(x[tail]); } int main() { int i, N, a[262144]; scanf("%d", &N); for (i = 1, a[0] = 0; i <= N; i++) scanf("%d", &(a[i])); int j, b[262144], c[262144], pow[100001]; for (i = 2, pow[1] = 10; i < N; i++) pow[i] = (long long)pow[i-1] * pow[i-1] % Mod; elementary_symmetric_polynomial(N - 1, pow, b); prod_poly_NTT(N + 1, N, a, b, c); for (i = 0; i < N; i++) printf("%d\n", (c[i] + c[i+N]) % Mod); fflush(stdout); return 0; }