part of my AP Calculus summer homework includes 8 questions on functions:
If: f(x)={(3,5),(2,4),(1,7)} g(x)= (x-3)[sup:3td985rz]1/2[/sup:3td985rz] h(x)={(3,2),(4,3),(1,6)} k(x)=x[sup:3td985rz]2[/sup:3td985rz]+5
determine each of the following:
1. (f+h)(1)=
2. (k-g)(5)=
3. (f[sup:3td985rz]o[/sup:3td985rz]g)(3)=
4. (g[sup:3td985rz]o[/sup:3td985rz]k)(7)=
5. f[sup:3td985rz]-1[/sup:3td985rz](x)=
6. k[sup:3td985rz]-1[/sup:3td985rz](x)=
7. 1/f(x)=
8. (kg)(x)=
I'm familiar with how to solve these problems when the functions are equations, as in g(x) and k(x), but how do i do them for f(x) and h(x), since there is no x in the ordered pairs?
I have a few ideas about how it might be done, but I'm not sure, so here's what I've got:
for number one:
would (f+h)(1)={(3,5),(2,4),(1,7),(3,2),(4,3),(1,6)} make sense?
my logic being, that if f(x) and h(x) have no x in their solutions, then neither would f(1) or h(1)
it also occurred to me that these ordered pairs might be solutions to an equation that I am supposed to find, but I don't know how to find it.
for number two:
(k-g)(5)= 30 - 2[sup:3td985rz]1/2[/sup:3td985rz]
I'm pretty sure that one's correct, because these are the problems i have familiarity with (f(x)=equation, type problems)
for number three:
this one really confused me, would it possibly be simply the ordered pairs for f(x)?
number four is another one that I understand
number five:
taking the inverse of the ordered pairs is really confusing me. I dont really have any idea how to do this one.
number seven is also confusing, but i understand 6 and 8
if someone could just explain how the ordered pairs play into this, it would really help. I understand the basics of functions, composite functions, etc., but the f(x) and h(x) are really throwing me for a loop.
Sorry this is so long, I just wanted to make it as clear as possible what I do and dont understand.
Thanks in advance!
If: f(x)={(3,5),(2,4),(1,7)} g(x)= (x-3)[sup:3td985rz]1/2[/sup:3td985rz] h(x)={(3,2),(4,3),(1,6)} k(x)=x[sup:3td985rz]2[/sup:3td985rz]+5
determine each of the following:
1. (f+h)(1)=
2. (k-g)(5)=
3. (f[sup:3td985rz]o[/sup:3td985rz]g)(3)=
4. (g[sup:3td985rz]o[/sup:3td985rz]k)(7)=
5. f[sup:3td985rz]-1[/sup:3td985rz](x)=
6. k[sup:3td985rz]-1[/sup:3td985rz](x)=
7. 1/f(x)=
8. (kg)(x)=
I'm familiar with how to solve these problems when the functions are equations, as in g(x) and k(x), but how do i do them for f(x) and h(x), since there is no x in the ordered pairs?
I have a few ideas about how it might be done, but I'm not sure, so here's what I've got:
for number one:
would (f+h)(1)={(3,5),(2,4),(1,7),(3,2),(4,3),(1,6)} make sense?
my logic being, that if f(x) and h(x) have no x in their solutions, then neither would f(1) or h(1)
it also occurred to me that these ordered pairs might be solutions to an equation that I am supposed to find, but I don't know how to find it.
for number two:
(k-g)(5)= 30 - 2[sup:3td985rz]1/2[/sup:3td985rz]
I'm pretty sure that one's correct, because these are the problems i have familiarity with (f(x)=equation, type problems)
for number three:
this one really confused me, would it possibly be simply the ordered pairs for f(x)?
number four is another one that I understand
number five:
taking the inverse of the ordered pairs is really confusing me. I dont really have any idea how to do this one.
number seven is also confusing, but i understand 6 and 8
if someone could just explain how the ordered pairs play into this, it would really help. I understand the basics of functions, composite functions, etc., but the f(x) and h(x) are really throwing me for a loop.
Sorry this is so long, I just wanted to make it as clear as possible what I do and dont understand.
Thanks in advance!
