For the points A(−1,−4), B(−2,1), C(1,2), and D(0,7), determine whether the vectors AB and CD are equivalent. [Hint: Write AB and CD as position vectors.] Choose the correct answer below. A) The vectors are not equivalent because position vector of AB and the position vector of CD are located in different positions. B) The vectors are not equivalent because the position vector of AB is not equal to the position vector of CD. C) The vectors are equivalent because the position vector of AB is equal to the position vector of CD. D) The vectors are equivalent because the position vector of AB is a scalar multiple of the position vector of CD.
For the points A(−1,−4), B(−2,1), C(1,2), and D(0,7), determine whether the vectors AB and CD are equivalent. [Hint: Write AB and CD as position vectors.] Choose the correct answer below. A) The vectors are not equivalent because position vector of AB and the position vector of CD are located in different positions. B) The vectors are not equivalent because the position vector of AB is not equal to the position vector of CD. C) The vectors are equivalent because the position vector of AB is equal to the position vector of CD. D) The vectors are equivalent because the position vector of AB is a scalar multiple of the position vector of CD.
For the points A(−1,−4), B(−2,1), C(1,2), and D(0,7), determine whether the vectors AB and CD are equivalent. [Hint: Write AB and CD as position vectors.] Choose the correct answer below. A) The vectors are not equivalent because position vector of AB and the position vector of CD are located in different positions. B) The vectors are not equivalent because the position vector of AB is not equal to the position vector of CD. C) The vectors are equivalent because the position vector of AB is equal to the position vector of CD. D) The vectors are equivalent because the position vector of AB is a scalar multiple of the position vector of CD.
For the points A(−1,−4), B(−2,1), C(1,2), and D(0,7), determine whether the vectors AB and CD are equivalent. [Hint: Write AB and CD as position vectors.]
Choose the correct answer below.
A) The vectors are not equivalent because position vector of AB and the position vector of CD are located in different positions.
B) The vectors are not equivalent because the position vector of AB is not equal to the position vector of CD.
C) The vectors are equivalent because the position vector of AB is equal to the position vector of CD.
D) The vectors are equivalent because the position vector of AB is a scalar multiple of the position vector of CD.
Quantities that have magnitude and direction but not position. Some examples of vectors are velocity, displacement, acceleration, and force. They are sometimes called Euclidean or spatial vectors.
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