Đặt \(x=AA'\)

Ta có: \(\overrightarrow{AB'}=\overrightarrow{AA'}+\overrightarrow{AB}\) ; \(\overrightarrow{BD'}=\overrightarrow{BB'}+\overrightarrow{BD}=\overrightarrow{BB'}+\overrightarrow{BA}+\overrightarrow{BC}=\overrightarrow{AA'}-\overrightarrow{AB}+\overrightarrow{BC}\)

\(\Rightarrow\overrightarrow{AB'}.\overrightarrow{BD'}=\left(\overrightarrow{AA'}+\overrightarrow{AB}\right)\left(\overrightarrow{AA'}-\overrightarrow{AB}+\overrightarrow{BC}\right)\)

\(=AA'^2+\overrightarrow{AA'}\left(-\overrightarrow{AB}+\overrightarrow{BC}\right)+\overrightarrow{AB}.\overrightarrow{AA'}-AB^2+\overrightarrow{AB}.\overrightarrow{BC}\)

\(=x^2-a^2+AB.BC.cos120^0\)

\(=x^2-a^2-\dfrac{a^2}{2}=x^2-\dfrac{3a^2}{2}=0\)

\(\Rightarrow x=\dfrac{a\sqrt{6}}{2}\)

\(V=\dfrac{a\sqrt{6}}{2}.2.\dfrac{a^2\sqrt{3}}{4}=\dfrac{3a^3\sqrt{2}}{4}\)

Đáp án C

Chọn đáp án B

Gọi O = AC ∩ BD.Từ giả thiết suy ra A'O ⊥ ABCD

Cũng từ giả thiết, suy ra ABC là tam giác đều nên

Đường cao khối hộp

\(\overrightarrow{AB}+\overrightarrow{BC}=\overrightarrow{AC}\Rightarrow\overrightarrow{BC}=\overrightarrow{AC}-\overrightarrow{AB}=\overrightarrow{b}-\overrightarrow{a}\)

Theo Talet: \(\dfrac{A'K}{IK}=\dfrac{B'I}{A'D'}=\dfrac{1}{2}\Rightarrow A'K=\dfrac{2}{3}A'I\)

\(\Rightarrow\overrightarrow{A'K}=\dfrac{2}{3}\overrightarrow{A'I}=\dfrac{2}{3}\left(\overrightarrow{A'B'}+\overrightarrow{B'I}\right)=\dfrac{2}{3}\left(\overrightarrow{A'B'}+\dfrac{1}{2}\overrightarrow{B'C'}\right)\)

\(=\dfrac{2}{3}\overrightarrow{AB}+\dfrac{1}{3}\overrightarrow{BC}=\dfrac{2}{3}\overrightarrow{a}+\dfrac{1}{3}\left(\overrightarrow{b}-\overrightarrow{a}\right)=\dfrac{1}{3}\overrightarrow{a}+\dfrac{1}{3}\overrightarrow{b}\)

\(\Rightarrow\overrightarrow{DK}=\overrightarrow{DD'}+\overrightarrow{D'A'}+\overrightarrow{A'K}=\overrightarrow{AA'}-\overrightarrow{BC}+\overrightarrow{A'K}\)

\(=\overrightarrow{c}-\left(\overrightarrow{b}-\overrightarrow{a}\right)+\dfrac{1}{3}\overrightarrow{a}+\dfrac{1}{3}\overrightarrow{b}\)

\(=\dfrac{4}{3}\overrightarrow{a}-\dfrac{2}{3}\overrightarrow{b}+\overrightarrow{c}\)