In vector addition, any set of vectors that add up to zero can have a zero resultant. This set of vectors is called a "zero vector" or "null vector."
A zero vector is a vector with a magnitude of zero and can have any direction. It is denoted by the symbol 0 or $\vec{0}$.
For example, suppose we have two vectors $\vec{A}$ and $\vec{B}$, and we want to find another vector $\vec{C}$ that will result in a zero resultant. We can find $\vec{C}$ as follows:
$\vec{C} = -\vec{A} - \vec{B}$
Here, we add the two vectors $\vec{A}$ and $\vec{B}$ and then take the negative of the resultant vector. This will give us a vector $\vec{C}$ that will have the same magnitude as the resultant vector, but in the opposite direction. If we add $\vec{A}$, $\vec{B}$, and $\vec{C}$ together, the resultant will be zero.
Therefore, any set of vectors that can be added in such a way that their resultant is a zero vector can have a zero resultant.
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Explanation:
Resultant of 3 and 4 we get 5
Then add the 5 to the resultant in opposite direction
Then we get zero finally
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Answer:
In vector addition, any set of vectors that add up to zero can have a zero resultant. This set of vectors is called a "zero vector" or "null vector."
A zero vector is a vector with a magnitude of zero and can have any direction. It is denoted by the symbol 0 or $\vec{0}$.
For example, suppose we have two vectors $\vec{A}$ and $\vec{B}$, and we want to find another vector $\vec{C}$ that will result in a zero resultant. We can find $\vec{C}$ as follows:
$\vec{C} = -\vec{A} - \vec{B}$
Here, we add the two vectors $\vec{A}$ and $\vec{B}$ and then take the negative of the resultant vector. This will give us a vector $\vec{C}$ that will have the same magnitude as the resultant vector, but in the opposite direction. If we add $\vec{A}$, $\vec{B}$, and $\vec{C}$ together, the resultant will be zero.
Therefore, any set of vectors that can be added in such a way that their resultant is a zero vector can have a zero resultant.