Answer with Step-by-step explanation:
We are given that
A=4i-2j+4k
B=-4i+3k
[tex]\mid A\mid=\sqrt{4^2+(-2)^2+4^2}=6[/tex]
[tex]mid B\mid=\sqrt{3^2+(-4)^2}=5[/tex]
[tex]\hat{A}=\frac{A}{\mid A\mid}[/tex]
[tex]\hat{A}=\frac{4i-2j+4k}{6}=\frac{2}{3}i-\frac{1}{3}j+\frac{2}{3}k[/tex]
[tex]\hat{B}=\frac{-4i+3k}{5}=\frac{-4}{5}i+\frac{3}{5}k[/tex]
Sum of unit vectors=[tex]\hat{A}+\hat{B}[/tex]
Sum of unit vectors=[tex]\frac{2}{3}i-\frac{1}{3}j+\frac{2}{3}k+\frac{-4i+3k}{5}=\frac{-4}{5}i+\frac{3}{5}k[/tex]
Sum of unit vectors=[tex]\frac{-2}{15}i-\frac{1}{3}j+\frac{19}{15}k[/tex]
[tex]\mid \hat{A}+\hat{B}\mid=\sqrt{(\frac{-2}{15})^2+(\frac{1}{3})^2+(\frac{19}{15})^2}[/tex]
[tex]\mid \hat{A}+\hat{B}\mid=1.32[/tex]
[tex]\theta_1=Cos^{-1}(\frac{A\cdot B)}{\mid A\mid \mid B\mid}[/tex]
[tex]\theta_1=cos^{-1}(\frac{-4}{30})=97.6^{\circ}[/tex]
[tex]\theta_2=cos^{-1}(\frac{(Sum\;of\;unt\;vectors\cdot A)}{\mid sum\mid \mid A\mid }[/tex]
[tex]\theta_2=cos^{-1}(\frac{78}{15\cdot 2\cdot 1.32\cdot 6})=49^{\circ}[/tex]
[tex]\frac{1}{2}\theta_1=\frac{1}{2}(97.6)=48.8\sim 49^{\circ}=\theta_2[/tex]
Hence, proved.
A unit vector in the same direction as a vector [tex]v[/tex] can be obtained by multiplying [tex]v[/tex] by the reciprocal of its norm. So [tex]\vec A[/tex] and [tex]\vec B[/tex] have corresponding unit vectors [tex]\vec a[/tex] and [tex]\vec b[/tex],
[tex]\vec a=\dfrac{\vec A}{\|\vec A\|}=\dfrac{4\,\vec\imath-2\,\vec\jmath+4\,\vec k}{\sqrt{4^2+(-2)^2+4^2}}=\dfrac23\,\vec\imath-\dfrac13\,\vec\jmath+\dfrac23\,\vec k[/tex]
[tex]\vec b=\dfrac{-4\,\vec\imath+3\,\vec k}{\sqrt{(-4)^2+3^2}}=-\dfrac45\,\vec\imath+\dfrac35\,\vec k[/tex]
They have vector sum
[tex]\vec a+\vec b=-\dfrac2{15}\,\vec\imath-\dfrac13\,\vec\jmath+\dfrac{19}{15}\,\vec k[/tex]
Find the angle between [tex]\vec A[/tex] and [tex]\vec B[/tex] using the dot product formula:
[tex]\vec A\cdot\vec B=\|\vec A\|\|\vec B\|\cos\theta[/tex]
[tex]-4=30\cos\theta[/tex]
[tex]\cos\theta=-\dfrac2{15}[/tex]
[tex]\theta\approx97.66^\circ[/tex]
Then find the angle between either [tex]\vec A[/tex] or [tex]\vec B[/tex] and [tex]\vec a+\vec b[/tex]:
[tex]\vec A\cdot(\vec a+\vec b)=\|\vec A\|\|\vec a+\vec b\|\cos\varphi[/tex]
[tex]\dfrac{26}5=2\sqrt{\dfrac{78}5}\cos\varphi[/tex]
[tex]\cos\varphi=\sqrt{\dfrac{13}{30}}[/tex]
[tex]\varphi\approx48.831^\circ[/tex]
(and this is half of [tex]\theta[/tex])
