the magnitude of vector product of two unit vector making an angle of 30 degree with each other is
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Answer:
Below is your answer.
Explanation:
The magnitude of vector product of two unit vectors makes an angle of 60 degrees with each other. We have to find their product:
Naming the vectors Set a and Set b, while applying formula:
Set a=(2,0) and b=(2*cos(60^0),2*sin(60^0)
so , this means to subtract a vector is to add the negative vector where the negative vector has opposite direction but same magnitude.
So B¯−A¯ is the same as B¯+(−A¯)
Placing values:
a-b = (2–2*cos(60^0),0–2*sin(60^0)) = (2–1,-2*sqrt(3)/2) = (1,-sqrt(3))
||a-b|| = sqrt((a-b)^2) = sqrt(1^2+3) = 2
2 is the answer.
hope my answer helps you and your family.
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