Respuesta :
Answer:
For vector u, x component = 10.558 and y component =12.808
unit vector = 0.636 i+ 0.7716 j
For vector v, x component = 23.6316 and y component = -6.464
unit vector = 0.9645 i-0.2638 j
Explanation:
Let the vector u has magnitude 16.6
u makes an angle of 50.5° from x axis
So [tex]u_x=ucos\Theta =16.6\times cos50.5=10.558[/tex]
Vertical component [tex]u_y=usin\Theta =16.6\times sin50.5=12.808[/tex]
So vector u will be u = 10.558 i+12.808 j
Unit vector [tex]u=\frac{10.558i+12.808j}{\sqrt{10.558^2+12.808^2}}=0.636i+0.7716j[/tex]
Now in second case let vector v has a magnitude of 24.5
Making an angle with -15.3° from x axis
So horizontal component [tex]v_x=vcos\Theta =24.5\times cos(-15.3)=23.6316[/tex]
Vertical component [tex]v_y=vsin\Theta =24.5\times sin(-15.3)=-6.464[/tex]
So vector v will be 23.6316 i - 6.464 j
Unit vector of v [tex]=\frac{23.6316i-6.464}{\sqrt{23.6316^2+6.464^2}}=0.9645i-0.2638j[/tex]
