Question

Two vectors are given by a = 3.3 x - 6.4 y and b = -17.8 x + 5.1 y. What is the magnitude of a?

Answer 1

The magnitude (length) of a vector in two dimensions is given by:

`l=sqrt(a^2+b^2)`. In this case, for the vector `a`, `l=sqrt(3.3^2+(-6.4)^2) = sqrt(51.85)=7.2 units.`

Explanation:

To find the length of a vector in two dimensions, if the coefficients are `a` and `b`, we use:

`l=sqrt(a^2+b^2)`

This might be vectors of the form `(ax+by) or (ai+bj) or (a,b)`.

Interesting side note: for a vector in 3 dimensions, e.g. `(ax+by+cz)`, it's

`l=sqrt(a^2+b^2+c^2)` - still a square root, not a cube root.

In this case, the coefficients are `a=3.3` and `b=-6.4` (note the sign), so:

`l=sqrt(3.3^2+(-6.4)^2) = sqrt(51.85)=7.2` `units`