# Find Angle Two Vectors Whose Dot Product Twice Magnitude Cross Product Theta Q

This post categorized under Vector and posted on October 9th, 2019.

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Dot Product Find Angle Between Two Vectors. Here I do another quick example of using the dot product to find the angle between two vectors. Category Education Show more Show less. Loading begingroup Yes once one has the value of sin theta in hand (if it is not equal to 1) one needs to decide whether the angle is more or less than fracpi2 which one can do using e.g. the dot product. The answer is given to be 161.5 degrees. 18.434951 degrees. This is frustrating 180-18.434951 the correct answer. Im not quite sure where Im going wrong here. I must be making the same mistake repeatedly. Another problem was the same thing but with the numbers changed and I also got the 180

There are situations when you need to find out the angle between two vectors and the only thing you know are vectors coordinates. The same forma is used for 2D vectors and 3D vectors as well. So Dot Product A vector has magnitude (how long it is) and direction Here are two vectors They can be multiplied using the Dot Product (also see Cross Product). Calculating. The Dot Product gives a number as an answer (a scalar not a vector). The Dot Product is written using a central dot a b This means the Dot Product of a and b If we have V x W 2 1 -1 (Cross-Product) and V W 4 (Dot Product) is it possible to find the angle between vectors V and W Note that I do not actually know values for the vectors just their products.

Cross Product can be found by multiplying the magnitude of the vectors and the Sin of the angle between the vectors. However you need to take the smaller angle between the 2 vectors (unlike dot product where you can take smaller or larger angle). Dot Product of Two Vectors with definition calculation vectorgth and angles. Find the angle between two vectors whose dot product is twice the magnitude of their cross product.