Answer
$cos^{-1}(\frac{5}{ \sqrt {26}\times \sqrt {30}})\approx 79.7^\circ$
Work Step by Step
The dot product of $a=a_{1}i+a_{2}j+a_{3}k$ and $b=b_{1}i+b_{2}j+b_{3}k$ is defined as $a.b=a_{1}\times b_{1}+a_{2}\times b_{2}+a_{3}\times b_{3}$
The magnitude of a vector is given as $|a|=\sqrt {(a_{1})^{2}+(a_{2})^{2}+(a_{3})^{2}}$
$a.b=-5+6+4=5$
$|a|=\sqrt {(-1)^{2}+(3)^{2}+(4)^{2}}=\sqrt {26}$
$|b|=\sqrt {(5)^{2}+(2)^{2}+(1)^{2}}=\sqrt {30}$
Angle between two vectors is given by
$cos\theta=\frac{a.b}{|a||b|}$
$cos\theta=\frac{5}{ \sqrt {26}\times \sqrt {30}}$
$\theta=cos^{-1}(\frac{5}{ \sqrt {26}\times \sqrt {30}})\approx 79.7^\circ$