\displaystyle{\left|{\left|{A}+{B}\right|}\right|}-{\left|{\left|{A}-{B}\right|}\right|}=\sqrt{{41}}-\sqrt{{37}} Explanation: \displaystyle{A}={\left({A}_{{x}},{A}_{{y}},{A}_{{z}}\right)}\ \text{ }\ {B}={\left({B}_{{x}},{B}_{{y}},{B}_{{z}}\right)} ...

The answer is \displaystyle=-{0.025} Explanation: \displaystyle\vec{{A}}+\vec{{B}}=〈-{1},{2}〉+〈-{3},{4}〉=〈-{4},{6}〉 The modulus of \displaystyle\vec{{A}} is \displaystyle=∥\vec{{A}}∥=∥〈-{1},{2}〉∥=\sqrt{{{1}+{4}}}=\sqrt{{5}} ...

\displaystyle{\left(-{17}\right)}-{3}\sqrt{{58}} Explanation: \displaystyle{\left({x}{1},{y}{1},{z}{1}\right)}\cdot{\left({x}{2},{y}{2},{z}{2}\right)}={x}{1}{x}{2}+{y}{1}{y}{2}+{z}{1}{z}{2} ...

The angle is \displaystyle{0.566} rad Explanation: \displaystyle\vec{{C}}=\vec{{A}}-\vec{{B}}=〈-{10},-{5},-{4}〉 The dot product is \displaystyle\vec{{A}}.\vec{{C}}=∥\vec{{A}}∥\cdot∥\vec{{C}}∥\cdot{\cos{{\left(\vec{{A}},\vec{{C}}\right)}}} ...

\displaystyle\theta\approx{2.437} radians Explanation: \displaystyle{C}={<}{2}-{3},{4}-{8},-{1}-{1}{>} \displaystyle{C}={<}-{1},-{4},-{2}{>} The rectangular definition of the ...

LewisCroney May 4, 2016 If \displaystyle{C}={A}-{B} Then \displaystyle{C}={<}{2},{1},{6}{>}-{<}{5},{2},{3}{>} So \displaystyle{C}={<}-{3},-{1},{3}{>} The dot/scalar product ...