Respuesta :
Answer:
Therefore the angle of intersection is [tex]\theta =79.48^\circ[/tex]
Step-by-step explanation:
Angle at the intersection point of two carve is the angle of the tangents at that point.
Given,
[tex]r_1(t)=(2t,t^2,t^4)[/tex]
and [tex]r_2(t)=(sin t , sin5t, 2t)[/tex]
To find the tangent of a carve , we have to differentiate the carve.
[tex]r'_1(t)=(2,2t,4t^3)[/tex]
The tangent at (0,0,0) is [ since the intersection point is (0,0,0)]
[tex]r'_1(0)=(2,0,0)[/tex] [ putting t= 0]
[tex]|r'_1(0)|=\sqrt{2^2+0^2+0^2} =2[/tex]
Again,
[tex]r'_2(t)=(cos t ,5 cos5t, 2)[/tex]
The tangent at (0,0,0) is
[tex]r'_2(0)=(1 ,5, 2)[/tex] [ putting t= 0]
[tex]|r'_1(0)|=\sqrt{1^2+5^2+2^2} =\sqrt{30}[/tex]
If θ is angle between tangent, then
[tex]cos \theta =\frac{r'_1(0).r'_2(0)}{|r'_1(0)|.|r'_2(0)|}[/tex]
[tex]\Rightarrow cos \theta =\frac{(2,0,0).(1,5,2)}{2.\sqrt{30} }[/tex]
[tex]\Rightarrow cos \theta =\frac{2}{2\sqrt{30} }[/tex]
[tex]\Rightarrow cos \theta =\frac{1}{\sqrt{30} }[/tex]
[tex]\Rightarrow \theta =cos^{-1}\frac{1}{\sqrt{30} }[/tex]
[tex]\Rightarrow \theta =79.48^\circ[/tex]
Therefore the angle of intersection is [tex]\theta =79.48^\circ[/tex].
