Question

How do you find the component form of v given its magnitude 1 and the angle it makes with the positive x-axis is `theta=45^circ`?

Answer 1

See below.

Explanation:

There are various ways we can solve this, so this is just one of them.

Let `v` have components `x` and `y`, such that:

`v=((x),(y))`

`||v||=sqrt((x)^2+(y)^2)=1`

`:.`

`x^2+y^2=1`

This is the equation of a circle, with radius 1 and centre at the origin.

For any point on the circumference of this circle, the coordinates `( x ,y)` can be represented by:

`(rcos(theta),rsin(theta))`

Since our vector makes an angle of `45^@` with the x axis, we have:

`(rcos(45), rsin(45))`

Our radius is equal to the magnitude of `v` and `v=1`, so:

`(sqrt(2)/2,sqrt(2)/2)` `v=((sqrt(2)/2),(sqrt(2)/2))`

or `sqrt(2)/2hati+sqrt(2)/2hatj`