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Given a vector with the initial point, (4,2) and the terminal point, (-3,1), find the vector in unit vector form.

-7i - j
-7i + 3j
i + j
i + 3j

Given a vector with the initial point 42 and the terminal point 31 find the vector in unit vector form 7i j 7i 3j i j i 3j class=

Respuesta :

Answer:

A. [tex]-7i-j[/tex]

Step-by-step explanation:

To find the position vector, subtract the initial point vector P from the terminal point vector Q.

Vector in unit vector form is equals to -7i - j.

What is vector?

" Vector is a quantity which represents both magnitude and the direction."

According to the question,

Vector with initial point = (4, 2)

Vector with terminal point = (-3,1)

'A' represents the initial point

'B' represents the terminal point

Therefore,

Substitute the value in AB to get vector in unit vector form ,

[tex]\vector{AB} = (-3-4)i + (1-2)j[/tex]

     [tex]= -7i-j[/tex]  

Hence, vector in unit vector form is equals to -7i - j.

Learn more about vectors here

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