• 3 months ago
This video shows the various methods that make the concept
crystal clear. To make the concept of inverse function easy for
the learners.
Transcript
00:00Today, I am going to discuss the topic Inverse Function.
00:09This topic is by RBI Educational Academy.
00:13Here you will see the concept in an oral way.
00:18So I request you to watch the video from beginning till end.
00:25Now see here students, what do you mean by inverse function?
00:32The inverse of a function is it reverse that is it undoes the function f at x.
00:41How it undoes?
00:42I will show you.
00:43The inverse of the function f at x is written as f inverse at x.
00:51Suppose take the example f at x, f at x is x plus 2 in one way it can be represent like
00:58this or here you see f such that function f such that x is mapped onto x plus 2.
01:10Suppose here I will take one example, here I will draw domain, encode domain.
01:18So here I will take the numbers domain 1, 2, 3, minus 1, minus 2 and f at x is a function
01:38is x plus 2.
01:41So f at x is x plus 2.
01:46So in place of x if I write f at 1, 1 plus 2 that is nothing but 3.
01:55So 1 is mapped to 3.
01:57If I take 2, f at 2 is 2 plus 2 is 4.
02:05So 2 is mapped to 4.
02:08If I take 3, 3 plus 2 is 5 and if I take minus 1.
02:31Now here f at x what I have written x plus 2.
02:47So we took the numbers 1, 2, 3 and f at x is x plus 2, 1 is mapped to 1, 1 is mapped
03:00to 5.
03:01So if I write 1, 1 is attached to 3.
03:03If I take 3, 2 plus 2 I have written 4, 3 plus 2 5.
03:08If I extend the number minus 1 and minus 2 here, minus 1, minus 1 plus 2, 2 minus 1 is
03:181 with plus sign because we take the sign of a bigger number always.
03:37So sorry for the disturbance boys, 1, 2, 3, minus 1, minus 2.
03:47So 2 plus 1, 3, 2 plus 2, 4, 3 plus 2, 5 then here I want to show minus 1 plus 2 we get
03:541.
03:55If I write minus 2 plus 2 it is 0.
03:59So minus 1 attached to 1 and 2 is attached to 0.
04:02So this was a function f at x.
04:06These variable we call it as x, 1, 2, 3 we replace x 1 time by 1, 1 time by 2, then 3,
04:14minus 1, minus 2 when we write 1, 1 plus 2 we get 3.
04:19So 1 is attached to 3, 2 plus 2 is 4.
04:23So this number 3, 4, 5, 1, 0 these are the images.
04:29Image of 1 is 3, image of 2 is 4, image of 3 is 5.
04:35So these images we represent by letter y or we call these images as f of x.
04:44It is same as f at x but f at x is a function, it is not the same.
04:48f of x is a real number, generally we say f of x this to function and to image also
04:55we say f of x but f of x is a real number and f at x is a function, please remember.
05:03Now when we talk about the inverse function, inverse function will be from co-domain to
05:11domain.
05:13So when we talk about this.
05:28So here when we talk about the inverse function, here the image of 1 is 3.
05:36So f inverse means 3 will be attached to 1, we see f inverse of y, we call this as x and
05:44this as y.
05:45So f inverse, I mean to say f inverse of y that will be nothing but it will be equal
05:51to x, this is the main thing which I want to say you.
05:54So boys here, I am going to show you how we will find f inverse of x.
06:20So f at x, I will write here is equal to x plus 2 in place of f of x, I will take y
06:30is equal to x plus 2 because x, its image is y or you can say this as f of x.
06:41So here I replace f of x by y, y is equal to x plus 2 and plus 2 when we send this side,
06:50it become minus 2, either you can subtract 2 from both side, y minus 2 is equal to x
06:58plus 2 minus 2, we will get cancel, you will get x or transposition, we move shift plus
07:052 from right to left, so the plus sign changes to minus sign, y minus 2 is equal to x.
07:11Now when we define inverse function, f inverse of y will be x, so x is equal to y minus 2,
07:24x is the subject, so I write on left hand side.
07:28Now see here, f inverse of y, if I write here f inverse of y, that will be, when I
07:37substitute y in f inverse function, I will get x, so in place of x, I can write f inverse
07:43of y is equal to y minus 2 and if I replace y by x, f inverse of x is equal to x minus
07:542, in place of y I have written x, so f at x is a function, f at x is equal to x plus
08:022 is the given function, its inverse is f inverse at x is x minus 2.
08:08Now boys, here I want to say you one more thing, you can remember in another way also
08:17that I am going to say you now, f at x, f of x, the image we call it as y, I can apply
08:30f inverse on both side, f inverse of f of x is equal to f inverse of y, on right hand
08:41side I apply an inverse function, on left hand side also I apply an inverse function,
08:47f inverse means 1 over f, f of x is equal to f inverse of y.
08:57Now boys, see here f is in the numerator, f is in the denominator, okay, you cannot
09:05cancel function, so it is better we say remove this both from the numerator and denominator,
09:11so you can say x is nothing but equal to f inverse of y, so in place of x, you can substitute
09:20f inverse of y, x is nothing but f inverse of y or you think that you substitute y in
09:28inverse function, f inverse of y, we get x, so in place of x, f inverse of y, the last
09:34step y we replace by x, that is x minus 2.
09:38Now there is one more way, okay, there is one more way to find the inverse of a function,
09:53so what is that way in which we find f, to find the inverse of a function, how we can
10:05find the inverse of a function, okay, the first step we write f at x is equal to x plus
10:112, so the first step is rewrite the function replacing f at x with phi, so I will rewrite
10:25now in place of f of x, I will write x, y is equal to x plus 2.
10:32In place of f of x, this f of x, I replace f of x with phi, see I replaced it, now the
10:41next step interchange x and y, here I mean to swap, in place of y, I will write x and
10:48in place of x, I will write y, so now it will be x is equal to y plus 2, so I swap, in place
11:00of y, I have written x, in place of x, I have written y.
11:05Now what is the third step, rearrange the equation to make y the subject, now I can
11:11subtract minus 2 from both side or send plus 2 from right to left, so it become x minus
11:202 is equal to y, okay, now you know it, I have shown you just now, here x, here y, when
11:32we substitute y in inverse function, f inverse of y is nothing but x, so in place of y, last
11:42step just write f inverse of x, f inverse of x when we apply inverse function, you get
11:52x minus 2, so this was our second method.
12:03Now I will discuss with you the third method, before graph I should have discussed, okay,
12:27but I will discuss, nothing will happen, here in the graph I will discuss, then I will show
12:32you the graph, so step a, I will write a flow diagram for f, a flow diagram for f, how x,
12:47let us say add 2, add 2 in flow diagram, so I get f at x is x plus 2, now I will write
13:02a flow diagram for f inverse, flow diagram for f inverse, here it is very easy, simple,
13:17see here, I will start from right side, okay, in flow diagram just write the inverse, add,
13:26I will write subtract, inverse of addition, subtraction, so subtract 2, we get x minus 2,
13:37so f at x is x plus 2 and f inverse at x is x minus 2, it is so simple.
13:46So, now I will discuss the flow diagram with you, just now I have discussed flow diagram with you,
13:54now I will show you the graph of f at x and f inverse at x, so 1, when I keep 1 plus 2, 3,
14:08because the function is f at x is x plus 2, this is the function, now if I keep 2, I get 3,
14:22if I keep 3, I get 4, if I write minus 1, minus 1 plus 2 is 1, if I write minus 2, minus 2 plus 2
14:32is 0, 1 max 2, 2 max 3, if I write 2, 2 max 4, minus 1 max 1, minus 2 max 0, this is the function,
14:46from domain to coordinate. Now, if I draw the graph, see the graph, so if I take 0, 0 plus 2,
15:01I will get 2, so 0 to 2, it will be here, if I write 1, 1 plus 2, it is 3, so 1 to 3 is here my
15:09boy, if I take 2, 2 plus 2, 4, so 2 to 4, it is here, if I write minus 1, minus 1 plus 2 is 1,
15:19minus 1, 2, so it is here, if I take minus 2, minus 2 plus 2 is 0, so this represent f at x.
15:30Now, let us see this, this represent what? So, let us see what it represent, it represent inverse
15:45function that is f inverse that is reverse, reverse of it, f inverse of x, so what happen,
15:53f inverse of x, just now I have done x minus 2, how it will be, if I write 0, I will get 0 minus
16:052 that is minus 2, 0 minus 2 and if you draw a line, this line is y is equal to x, you can see
16:17the symmetry, if I take 0, 0 to plus 2, in the inverse, if I write 0, 0 to minus 2, now if I
16:26write 1, 1 plus 2, 3, 1 to 3, if I write 1 here, 1 minus 2, I get minus 1 boys, so here if I write
16:411, I get minus 1 here, you can see here minus 1 and if I write 2, 2 minus 2 will be 0, you see
16:50here, I will show you, f inverse at x is equal to x minus 2, if I write 2, 2 minus 2 is 0, so x2,
17:07when x is 2, in inverse function, if I write f inverse at 2, 2 minus 2, 0, so when x is 2, y is
17:140 here, if I write 3, 3 minus 2 is 1, 3, 2, 1 here, so you see here, when I substitute 2 here,
17:251 here, 1 plus 2, it is 3, okay, when I substitute 1, I get 3 but when I substitute 1 here, I get
17:33minus 1, so see, see the symmetry, see the symmetry here, see the symmetry, okay.
17:42If I write 2, 2 plus 2, 4, I get 4, if I write in this function f inverse 2, 2 minus 2, 0, so y is
17:52equal to x, this line gives the symmetry between f at x and f inverse at x. Now, I will give you
18:05another example, if I take g at x is equal to 2x plus 4 divided by 3, okay, I have to find the
18:23inverse function, so first step in place of g at x, I write y is equal to 2x plus 4 by 3. Now,
18:35there are two ways, either multiply by 3 on both side or you can multiply 3 with y,
18:42it is 3y is equal to 2x plus 4, the division changes to multiplication when we send from
18:51right to left, so 3 multiplied with y and see here, we send plus 4 this side from right to
19:01left, so 3y minus 4 is equal to 2x. Next step, we want to make x as a subject, so I will write 2x
19:14on left hand side, 2x is equal to 3y minus 4, then x divide by 2 on both the side or send 2 on
19:29right hand side, 2 and 2 cancel, so x is equal to 3y minus 4 divided by 2. Now, see here in place
19:45of x, I can write F inverse of y, F inverse of y is equal to 3y minus 4 by 2. Now, in place of y,
20:02I replace x, last step, F inverse of x is equal to 3x minus 4 divided by 2. Now, see here,
20:15there is easy way also, so to do this all, I will show you both the ways, I will show you the
20:30swapping way and I will show you the flow diagram way, so 2x plus 4 by 3. Now, g of x is y, I think
20:58I have taken, it is g, I should not write x, I should use g only. Now, see here, g at x is y,
21:08y is equal to 2x plus 4 by 3, the first step, then in place of c at x, I have written y,
21:20then I will swap, the next step is swap. So, in place of y, I will write x and in place of x,
21:30I will write y, x is equal to 2y plus 4 by 3, I swap boys. After swapping, now what I will do,
21:43here boys, either multiply by 3 on both side or send the 3 to right-hand side, the division
21:55changes to multiplication, so it becomes 3 multiply with x, 3x is equal to 2y plus 4,
22:04then I send 4 on the other side, that is 3x minus 4 is equal to 2y, then what I will do,
22:21I will divide by 2 on both the side boys, left-hand side and right-hand side, rule,
22:29there is a rule in maths, if you divide left-hand side by a number, with same number you divide
22:34right-hand side, so 2 and 2 get cancelled, so y, I can replace y, f inverse of x is equal to 3x
22:44minus 4 by 2, I got the same thing. So, boys, now one more thing, the flow diagram,
23:03so flow diagram for f, first I will write for f, so or you can say g, whatever you take,
23:21suppose g at x whatever you have taken, g at x is 2x plus 4 by 3, so boys, so first I will write
23:38for the function for g, that is x, then multiply by 2, here we write multiply by 2, so what we are
23:52doing, we are multiplying x by 2, so it become 2x, in this we add 4 boys, add 4, so now it become
24:04boys 2x plus 4, first you are adding x, you see here, 2x plus 4 by 3, so first what I have taken,
24:26I have taken x, then in this I multiply by 2, so it become 2x, in this I add 4, I added 4,
24:49so it become 2x plus 4, 2x plus 4, now after addition, then what I am doing boys, I divide,
25:01I divide by 3, so it become 2x plus 4 by 3. Now boys, I will go the reverse way now,
25:14okay, what I will do, I will go in reverse order, same but see here, what I will do,
25:23I will take x from right hand side, take an x, so divide, okay, first in place of divide,
25:34I will change it to multiply, because the inverse of division is multiplication,
25:40so I will write multiply by 3, so it become 3x boys, after that there is add is there,
26:00so you see this function add, so I will subtract now, subtract 4, so it become boys 3x minus 4,
26:17okay, now last step, here multiply by 2, this is very important boys see, multiply by 2,
26:31so here I will write divide by 2 after subtraction 3x minus 4 by 2, so I got the inverse function 3x
26:42minus 4 by 2 at last, so I was writing x, so g at x was 2x plus 4 by 3 and g inverse at x,
27:03what we got by different ways, 3x minus 4 by 2, so here first step we have taken x,
27:19multiply by 2 first step, then add 4 and divide by 3, so remember divide by 3,
27:29so we have taken x on right hand side, divide by 3, we change into multiply by 3,
27:35so we got 3x, then add 4, we subtract 4, then multiply by 2, we divide by 2,
27:47so we got 3x minus 4 by 2, it is so simple boys, I hope you understand,
27:53thanks for watching the video, it is by RBA educational academy,
28:03please like, share and subscribe, so till the time we meet again, please share the video.

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