mention the expression for magnitude of two vectors and explain terms
Answers
Explanation:
The magnitude of a vector is the length of the vector. ... For a two-dimensional vector a=(a1,a2), the formula for its magnitude is ∥a∥=√a21+a22.
Answer:
The formula for its magnitude is ∥a∥=√a21+a22.
Explanation:
Step 1: |v| =(x2 Plus y2) is the formula to calculate the magnitude of a vector (in two dimensions) v = (x, y). The Pythagorean theorem serves as the basis for this calculation. |V| = (x2 + y2 + z2) is the method to calculate the magnitude of a vector (in three-dimensional space) V = (x, y, z).
The length of a vector determines its size. The expression for the magnitude of a two-dimensional vector, a=(a1,a2), is a=a21+a22.
Step 2: Since the vectors are pointing in the same direction, magnitude is at its highest. The magnitude R=A2+B2+2ABcos in the previous expression has nothing to do with the direction of R, i.e. resultant, whereas in the equation =tan1BsinBcos+A we have nothing to do with the magnitude of R.
By using the symbol |v|, the magnitude of a vector formula can be used to determine the length for a given vector (let's say v). This amount is essentially the distance between the vector's beginning point and ending spot.
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