Find the angle between f(x) = sin(x) and g(x) = cos(x) using the inner product = (integral with upper limit of p
Posted: Thu May 12, 2022 12:46 pm
Find the angle between f(x) = sin(x) and g(x) = cos(x)
using the inner product <f,g> = (integral with upper
limit of pi/2 and lower limit of 0) f(x)g(x)dx.
Use cos(θ) = <f(x),g(x)>/(||f|| *
||g||) and ||f|| = sqrt(<f(x),f(x)>
using the inner product <f,g> = (integral with upper
limit of pi/2 and lower limit of 0) f(x)g(x)dx.
Use cos(θ) = <f(x),g(x)>/(||f|| *
||g||) and ||f|| = sqrt(<f(x),f(x)>