Respuesta :
Answer:
The resultant vector A + B is given by 7.2 m at an angle of 26° east of north,
C
Explanation:
Resolving the vectors to vertical and horizontal component;
Vertical;
Vector A = 6sin30
Vector B = 4sin60
Resultant vertical = 6sin30 + 4sin60 = 6.464m
Horizontal;
Vector A = 6cos30
Vector B = -4cos60
Resultant horizontal = 6cos30 - 4cos60 = 3.196m
Resultant R = √(6.464^2 + 3.196^2) = 7.2m
Tanθ = 6.464/3.196
θ = taninverse (6.464/3.196) BN
θ = 64° north of East.
Or
26° east of north
The resultant vector A + B is given by 7.2 m at an angle of 26° east of north,
The resultant vector A + B is given by 7.2 m at an angle of 26° east of north. Hence, option (c) is correct.
Given data:
The magnitude of vector A is, A = 6.0 m.
The direction of vector A is, 30° north of east.
The magnitude of vector B is, B = 4.0 m.
The direction of vector B is, 30° west of north.
The quantity having both the magnitude as well as the magnitude are known as vector quantities.
Resolving the vectors to vertical and horizontal component;
Along the Vertical direction;
Vector A = 6sin30
Vector B = 4sin60
Resultant vertical vector = 6sin30 + 4sin60 = 6.464 m
Along the Horizontal direction;
Vector A = 6cos30
Vector B = -4cos60
Resultant horizontal vector = 6cos30 - 4cos60 = 3.196 m
Now, the resultant vector is calculated as,
[tex]R=\sqrt{6.464^{2}+3.196^{2}}\\\\R = 7.2 \;\rm m[/tex]
And the resultant direction of vectors is,
[tex]tan \theta = 6.464/3.196\\\\\theta = tan^{-1} (6.464/3.196) \\\theta =64 ^{\circ}[/tex]( North of East)
θ = 64° north of East.
Or
26° east of north
Thus, we can conclude that the resultant vector A + B is given by 7.2 m at an angle of 26° east of north. Hence, option (c) is correct.
Learn more about the vector quantities here:
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