-1, but @tm{1,007\times 1,007}@nm{1,007*1,007} = 1,014,049 is much
-greater than @am{2^{10},2**10} = 1,024. Shifting @m{q} bits right, we
-get @tm{1,014,049/2^{10}}@nm{1,014,049/(2**10)} = 990, or about 0.97,
+1, but @tm{16,111\times 16,111}@nm{16,111*16,111} = 259,564,321 is much
+greater than @am{2^{14},2**14} = 16,384. Shifting @m{q} bits right, we
+get @tm{259,564,321/2^{14}}@nm{259,564,321/(2**14)} = 15,842, or about 0.97,