Answer :
Answer:
Magnitude of FR = 1174.56°N
α=67
β=92
γ=157
Explanation:
From the diagram, we know that
A:(0i+0j+6k)
B:(2i-3j+0k)
C:(3i+2j+0k)
First, we'll find the position vectors from A to B and A to C.
rAB ={(2−0)i+(−3−0)j+(0−6)k}
rAB ={2i−3j−6k} m
rAC ={(3−0)i+(2−0)j+(0−6)k}
rAC ={3i+2j−6k} m
From this point, we'll then find the magnitude of each position vector so that we can use it to find the unit vector in the next step.
Magnitude of rAB = √(2)² + (-3)² + (-6)²
Magnitude of rAB = √(4 + 9 + 36)
Magnitude of rAB = √49
Magnitude of rAB =7m
Magnitude of rAC = √(3)² + (2)² + (-6)²
Magnitude of rAC = √(9 + 4 + 36)
Magnitude of rAC = √49
Magnitude of rAC =7m
Now, we'll find the unit vector for each force. Remember, this is found by dividing each component of the position vector by it’s magnitude.
uAB = (2i/7 -3j/7 - 6k/7)
uAC = (3i/7 + 2j/7 - 6k/7)
FB = 560 * uAB
FB = 560 * (2i/7 -3j/7 - 6k/7)
FB = {160i - 240j - 480k}N
FC = 700 * uAC
FC = 700 * (3i/7 + 2j/7 - 6k/7)
FC = {300i + 200j - 600k}N
We'll add both forces together to find the resultant force
FR = FC + FB
FR = {460i - 40j - 1080k}N
Then, we'll find the magnitude of the resultant force to get the coordination direction angle.
Magnitude of FR = √(460)² + (-40)² + (-1080)²
Magnitude of FR = 1174.56N
Finding the coordination angles
α=cos-1(460/1174.56) = 67° --- Approximated
β= cos-1(-40/1174.56) = 92° ---- Approximated
γ= cos-1(-1080/1174.56) = 157° ---- Approximated
The magnitude of the resulting forse will be 1174.56 N. It is a quantity that has both magnitude and direction.
What is Vector Quantity?
It is a quantity that has both magnitude and direction. The resulting vector's magnitude can be calculated by the Pythagorean theorem,
[tex]F_R = \sqrt {(F_r)^2_x+{(F_r)^2_y}+{(F_r)^2_z}}[/tex]
Where,
[tex](F_r)_x[/tex] - Force in the X- direction = 460 N
[tex](F_r)_y[/tex] - Force in the Y- direction = 40 N
[tex](F_r)_z[/tex] - Force in the Z- direction = 1080 N
Put the values in the formula,
[tex]F_R = \sqrt {(460)^2+{(40)^2}+{(1080)^2}}\\\\F_R = 1174.56 \rm \ N[/tex]
Therefore, the magnitude of the resulting forse will be 1174.56 N.
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