00:06
Now here in this question, basically we are asked to use the definition, right, to determine the free transfer of this function, right? i guess we are asked to find actually the free theory, right? so obviously the function, oh, basically the free transfer.
00:24
Well, that's, oh, so basically we asked to find the free transfer instead of the free series, right? free transfer.
00:31
Okay, so the free transfer, we're going to call it if, let's say, omega, right? and by definition, that should be given a buy from, you know, minus infinite to infinite, right? and then d t and times e, you know, minus i omega -t, and actually is plus, all right? remember that.
00:48
And then times the ft, right? so that's by definition that this is a free transformer of this function ft.
00:58
Right now you can use the definition function, right? obviously, for t last time, minus 3 and latin the minus 3 is 0, right? so the integral just basically is effective from minus 3 to 3, right? so you can rewrite it as minus 3 to 3, right? and dte, e, i, omega, t, and ft, right? now, ft for this is just a constant, which is 2, which is 2, right? so we just put f2 equals 2, and you put 2 here, and then you find the minus 3, dt, e, i, omega, t, right? now, i, of course, remember it's a unit of imagine number.
01:34
And then this is given by two times...