人邮高数 第5章 第5-1-16题

教材习题

📝 题目

16.已知向量 $\boldsymbol{a}=(2,-3,1), \boldsymbol{b}=(1,-1,3), \boldsymbol{c}=(1,-2,0)$ ,求: (1)$(\boldsymbol{a}+\boldsymbol{b}) \times(\boldsymbol{b}+\boldsymbol{c})$ ; (2)$(\boldsymbol{a} \times \boldsymbol{b}) \cdot \boldsymbol{c}$ ; (3)$(\boldsymbol{a} \times \boldsymbol{b}) \times \boldsymbol{c}$ ; (4)$(\boldsymbol{a} \cdot \boldsymbol{b}) \boldsymbol{c}-(\boldsymbol{a} \cdot \boldsymbol{c}) \boldsymbol{b}$ .

💡 答案解析

[AI解答]

[AI解答]

已知向量 $$ \boldsymbol{a}=(2,-3,1),\quad \boldsymbol{b}=(1,-1,3),\quad \boldsymbol{c}=(1,-2,0) $$

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### (1)$(\boldsymbol{a}+\boldsymbol{b}) \times(\boldsymbol{b}+\boldsymbol{c})$

先计算: $$ \boldsymbol{a}+\boldsymbol{b} = (2+1,\,-3-1,\,1+3) = (3,\,-4,\,4) $$ $$ \boldsymbol{b}+\boldsymbol{c} = (1+1,\,-1-2,\,3+0) = (2,\,-3,\,3) $$

叉积: $$ (\boldsymbol{a}+\boldsymbol{b})\times(\boldsymbol{b}+\boldsymbol{c}) = \begin{vmatrix} \mathbf{i} & \mathbf{j} & \mathbf{k} \\ 3 & -4 & 4 \\ 2 & -3 & 3 \end{vmatrix} $$

计算: $$ \mathbf{i}((-4)\cdot 3 - 4\cdot(-3)) - \mathbf{j}(3\cdot 3 - 4\cdot 2) + \mathbf{k}(3\cdot(-3) - (-4)\cdot 2) $$ $$ = \mathbf{i}(-12 + 12) - \mathbf{j}(9 - 8) + \mathbf{k}(-9 + 8) $$ $$ = (0,\,-1,\,-1) $$

所以: $$ \boxed{(0,\,-1,\,-1)} $$

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### (2)$(\boldsymbol{a} \times \boldsymbol{b}) \cdot \boldsymbol{c}$

先求 $\boldsymbol{a}\times\boldsymbol{b}$: $$ \boldsymbol{a}\times\boldsymbol{b} = \begin{vmatrix} \mathbf{i} & \mathbf{j} & \mathbf{k} \\ 2 & -3 & 1 \\ 1 & -1 & 3 \end{vmatrix} $$ $$ = \mathbf{i}((-3)\cdot 3 - 1\cdot(-1)) - \mathbf{j}(2\cdot 3 - 1\cdot 1) + \mathbf{k}(2\cdot(-1) - (-3)\cdot 1) $$ $$ = \mathbf{i}(-9 + 1) - \mathbf{j}(6 - 1) + \mathbf{k}(-2 + 3) $$ $$ = (-8,\,-5,\,1) $$

再与 $\boldsymbol{c}=(1,-2,0)$ 点乘: $$ (-8)\cdot 1 + (-5)\cdot(-2) + 1\cdot 0 = -8 + 10 + 0 = 2 $$

所以: $$ \boxed{2} $$

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### (3)$(\boldsymbol{a} \times \boldsymbol{b}) \times \boldsymbol{c}$

由(2)得 $\boldsymbol{a}\times\boldsymbol{b}=(-8,-5,1)$,与 $\boldsymbol{c}=(1,-2,0)$ 叉乘: $$ \begin{vmatrix} \mathbf{i} & \mathbf{j} & \mathbf{k} \\ -8 & -5 & 1 \\ 1 & -2 & 0 \end{vmatrix} $$ $$ = \mathbf{i}((-5)\cdot 0 - 1\cdot(-2)) - \mathbf{j}((-8)\cdot 0 - 1\cdot 1) + \mathbf{k}((-8)\cdot(-2) - (-5)\cdot 1) $$ $$ = \mathbf{i}(0+2) - \mathbf{j}(0 - 1) + \mathbf{k}(16 + 5) $$ $$ = (2,\,1,\,21) $$

所以: $$ \boxed{(2,\,1,\,21)} $$

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### (4)$(\boldsymbol{a} \cdot \boldsymbol{b}) \boldsymbol{c}-(\boldsymbol{a} \cdot \boldsymbol{c}) \boldsymbol{b}$

先计算点积: $$ \boldsymbol{a}\cdot\boldsymbol{b} = 2\cdot 1 + (-3)\cdot(-1) + 1\cdot 3 = 2 + 3 + 3 = 8 $$ $$ \boldsymbol{a}\cdot\boldsymbol{c} = 2\cdot 1 + (-3)\cdot(-2) + 1\cdot 0 = 2 + 6 + 0 = 8 $$

于是: $$ (\boldsymbol{a}\cdot\boldsymbol{b})\boldsymbol{c} = 8\cdot(1,-2,0) = (8,-16,0) $$ $$ (\boldsymbol{a}\cdot\boldsymbol{c})\boldsymbol{b} = 8\cdot(1,-1,3) = (8,-8,24) $$

相减: $$ (8,-16,0) - (8,-8,24) = (0,\,-8,\,-24) $$

所以: $$ \boxed{(0,\,-8,\,-24)} $$

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难度:★☆☆☆☆

📋 详细解题步骤

步骤 1/4
目标:计算 (a+b)×(b+c)
先计算 a+b = (3,-4,4),b+c = (2,-3,3),然后计算叉积: |i j k; 3 -4 4; 2 -3 3| = i((-4)*3 - 4*(-3)) - j(3*3 - 4*2) + k(3*(-3) - (-4)*2) = i(0) - j(1) + k(-1) = (0,-1,-1)
公式:(a+b)×(b+c) = (0,-1,-1)
提示:叉积计算时注意符号和行列式展开
步骤 2/4
目标:计算 (a×b)·c
先计算 a×b = |i j k; 2 -3 1; 1 -1 3| = i((-3)*3 - 1*(-1)) - j(2*3 - 1*1) + k(2*(-1) - (-3)*1) = i(-8) - j(5) + k(1) = (-8,-5,1),再与 c=(1,-2,0) 点乘:(-8)*1 + (-5)*(-2) + 1*0 = -8+10+0=2
公式:(a×b)·c = 2
提示:点乘是对应分量相乘再相加
步骤 3/4
目标:计算 (a×b)×c
由 (2) 得 a×b = (-8,-5,1),与 c=(1,-2,0) 叉乘: |i j k; -8 -5 1; 1 -2 0| = i((-5)*0 - 1*(-2)) - j((-8)*0 - 1*1) + k((-8)*(-2) - (-5)*1) = i(2) - j(-1) + k(21) = (2,1,21)
公式:(a×b)×c = (2,1,21)
提示:注意叉积顺序,先 a×b 再与 c 叉乘
步骤 4/4
目标:计算 (a·b)c - (a·c)b
先计算点积:a·b = 2*1 + (-3)*(-1) + 1*3 = 2+3+3=8;a·c = 2*1 + (-3)*(-2) + 1*0 = 2+6+0=8。则 (a·b)c = 8*(1,-2,0) = (8,-16,0);(a·c)b = 8*(1,-1,3) = (8,-8,24);相减得 (0,-8,-24)
公式:(a·b)c - (a·c)b = (0,-8,-24)
提示:注意向量数乘和减法运算

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