证明下列公式是重言式.[tex=13.786x1.357]GmI1mwsK/vDwgIIPEIpMc4OjktT3BMmV1vBCbPfBfTxUJGKj3nDkSHvgeFTDqL6c7GCJA9aCAOhOJ9gcHUFOHBCycr+AT/VmIcwXsxylLyA=[/tex].
证明下列公式是重言式.[tex=13.786x1.357]GmI1mwsK/vDwgIIPEIpMc4OjktT3BMmV1vBCbPfBfTxUJGKj3nDkSHvgeFTDqL6c7GCJA9aCAOhOJ9gcHUFOHBCycr+AT/VmIcwXsxylLyA=[/tex].
令[tex=13.786x1.357]QyBh8f86pwyJ8/9+7dFszBkKktnLW1QfdLJ5PRoRM55vPpHyA6AJ+k01G8UpE6N3[/tex],求[tex=2.357x3.286]C3xgilca3I2a7KOgejDAaWl7m3UdKvz4gOil0kuKDaE=[/tex]
令[tex=13.786x1.357]QyBh8f86pwyJ8/9+7dFszBkKktnLW1QfdLJ5PRoRM55vPpHyA6AJ+k01G8UpE6N3[/tex],求[tex=2.357x3.286]C3xgilca3I2a7KOgejDAaWl7m3UdKvz4gOil0kuKDaE=[/tex]
求一般螺面[tex=13.786x1.357]2yicnz51cy8jm4ENtDpb51/Favhf8ReCys4sgEr4nTyk/snTAhuwSMkKrocljIXy[/tex]的第一二次形式。
求一般螺面[tex=13.786x1.357]2yicnz51cy8jm4ENtDpb51/Favhf8ReCys4sgEr4nTyk/snTAhuwSMkKrocljIXy[/tex]的第一二次形式。
下列关系能否构成函数?[p=align:center][tex=13.786x1.357]Lbznz5y07GiNrSEVAcoyikZ633D937oifeLrHsTgJXTPwGqwng8Ulr99OchOXq2vPC6cqHZHMbX/W9wDtZJjLKtCUErTPrvkPkt2tk/ud2M+XUHLsz/IvjsPlMrsKvPc[/tex].
下列关系能否构成函数?[p=align:center][tex=13.786x1.357]Lbznz5y07GiNrSEVAcoyikZ633D937oifeLrHsTgJXTPwGqwng8Ulr99OchOXq2vPC6cqHZHMbX/W9wDtZJjLKtCUErTPrvkPkt2tk/ud2M+XUHLsz/IvjsPlMrsKvPc[/tex].
计算当[tex=1.643x1.0]MVeOYouc7e3FvU1m5bCV6w==[/tex] 时的[tex=6.286x1.357]D4GztPbZ29QqVPUQCVaZL4JB93UOIlYdqHVHkej+43g=[/tex] 。[tex=13.786x1.357]BPSKsr0JsAF0Re6F7SyqjGMD01kpu5Qwerrrjwr+uzBsmRMB2lkyPWT4Hljoi7+LEcFcz9ss2RUjtxjcpHgILQ==[/tex]
计算当[tex=1.643x1.0]MVeOYouc7e3FvU1m5bCV6w==[/tex] 时的[tex=6.286x1.357]D4GztPbZ29QqVPUQCVaZL4JB93UOIlYdqHVHkej+43g=[/tex] 。[tex=13.786x1.357]BPSKsr0JsAF0Re6F7SyqjGMD01kpu5Qwerrrjwr+uzBsmRMB2lkyPWT4Hljoi7+LEcFcz9ss2RUjtxjcpHgILQ==[/tex]
这里介绍一些与随机变量x和xz的协方差有关的关系式。[br][/br]我们计算了[tex=13.786x1.357]wiXrGoO8wEpHbGy1Lsyf6bjrlBwLw09D43lTj4xmXPeS7E2H6AdTTc31MUmoTD0U[/tex]的方差。如果[tex=7.857x1.357]YRHgHmN/yZW92ECOHesamrZfkPHdXXZbcDre+I8M3j1TECwf1vI0zF7Yz6TSJVhYr+IHre92vyKXBaAAri6TFg==[/tex],上面的结论一—当[tex=3.143x1.0]ZxR9r3QjH1bAu/oUyVc20A==[/tex]时,X的方差最小,是否还成立?
这里介绍一些与随机变量x和xz的协方差有关的关系式。[br][/br]我们计算了[tex=13.786x1.357]wiXrGoO8wEpHbGy1Lsyf6bjrlBwLw09D43lTj4xmXPeS7E2H6AdTTc31MUmoTD0U[/tex]的方差。如果[tex=7.857x1.357]YRHgHmN/yZW92ECOHesamrZfkPHdXXZbcDre+I8M3j1TECwf1vI0zF7Yz6TSJVhYr+IHre92vyKXBaAAri6TFg==[/tex],上面的结论一—当[tex=3.143x1.0]ZxR9r3QjH1bAu/oUyVc20A==[/tex]时,X的方差最小,是否还成立?
求证: 对于[tex=4.929x1.214]/+gDsj1Fh24ZDJ6KDOXIb6h9gVmlnN8/xyJojb/Sql4=[/tex]有[tex=16.714x1.357]0pANN1SVkCE/Lw6FMZG+REMRXQ+E9riNVO0rz5YIaKBFggBIj7YkbBbqE4dkkBnYHnCGZ0vl790Zu0ipMz2bymNdaET37F65ReAG7eDV4mAWWmNltbXm9a+mxpvXdalHnQilAgYd4RVtq/O55jdsAw==[/tex], [tex=13.786x1.357]0xBVfUtQ+9UL0Lb3fYOdobMKjmG5laDzjQo1eHuEnFvb2P9dP6yxxERoE88m+oV2p1nq/XF7XWyJuj57WUgyOuMVX1agfXGanqJyAQBkT5ilJRuOd6MVG8sSinsBzKUW[/tex].
求证: 对于[tex=4.929x1.214]/+gDsj1Fh24ZDJ6KDOXIb6h9gVmlnN8/xyJojb/Sql4=[/tex]有[tex=16.714x1.357]0pANN1SVkCE/Lw6FMZG+REMRXQ+E9riNVO0rz5YIaKBFggBIj7YkbBbqE4dkkBnYHnCGZ0vl790Zu0ipMz2bymNdaET37F65ReAG7eDV4mAWWmNltbXm9a+mxpvXdalHnQilAgYd4RVtq/O55jdsAw==[/tex], [tex=13.786x1.357]0xBVfUtQ+9UL0Lb3fYOdobMKjmG5laDzjQo1eHuEnFvb2P9dP6yxxERoE88m+oV2p1nq/XF7XWyJuj57WUgyOuMVX1agfXGanqJyAQBkT5ilJRuOd6MVG8sSinsBzKUW[/tex].
列举集合的元素[tex=7.643x1.5]pJ97+p5Y62Jo3kIxIWSqWxkxC2Fiayxa1Owdl9paI8Z46OOqBcavdN+0uvAvkzNA[/tex]为正奇数[tex=1.286x1.357]tZQEiUsycCRzNdzfFLO0hw==[/tex]______;[tex=13.786x1.357]jvfKFhSmrazTumdbe26YDUlFNITNszvUqG0S70Hozhm+e2PLG/JMJDQrY3TaO+0k[/tex]______.
列举集合的元素[tex=7.643x1.5]pJ97+p5Y62Jo3kIxIWSqWxkxC2Fiayxa1Owdl9paI8Z46OOqBcavdN+0uvAvkzNA[/tex]为正奇数[tex=1.286x1.357]tZQEiUsycCRzNdzfFLO0hw==[/tex]______;[tex=13.786x1.357]jvfKFhSmrazTumdbe26YDUlFNITNszvUqG0S70Hozhm+e2PLG/JMJDQrY3TaO+0k[/tex]______.
计算下列中各对序列间的6点圆周卷积和线性卷积,并比较结果。[tex=13.786x1.357]frIDoZNRJdYupjo0SYQ9eMQLyYeVwnL5SeiiLNksr1g6sDsqN7P4FVCBN30n6AkJ[/tex]
计算下列中各对序列间的6点圆周卷积和线性卷积,并比较结果。[tex=13.786x1.357]frIDoZNRJdYupjo0SYQ9eMQLyYeVwnL5SeiiLNksr1g6sDsqN7P4FVCBN30n6AkJ[/tex]
设系统由下面差分方程描述:[tex=13.786x1.357]rxk+G9FFN2Hy9drtCqCxTgM6Wguklx4dY28DwtKnUcM=[/tex]求系统的系统函数[tex=2.071x1.286]RmhpoXHV0HsiHu4rXqr4mA==[/tex],并画出极零点分布图
设系统由下面差分方程描述:[tex=13.786x1.357]rxk+G9FFN2Hy9drtCqCxTgM6Wguklx4dY28DwtKnUcM=[/tex]求系统的系统函数[tex=2.071x1.286]RmhpoXHV0HsiHu4rXqr4mA==[/tex],并画出极零点分布图