• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

MATH1081 Topic 1 Revision mega-thread (1 Viewer)

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
Okay so as we have a topic 1 test this week in our first tute and some of us are still struggling with a few things here and there (including my self) i thought this would be helpful. We can collaborate on answers to past papers and hopefully get any concepts explained to us by each other.

Please upload your own answers and/or check ones done by others

Ill start of with answers to 1st 2 tests and as ppl upload more answers i can add them here:

2008 Test 1A(Explained really well in this vid)

2008 Test 1B:
Q1
Q2 is the exact same as in 2008 Test 1A so see the vid
Q3

2009 Test 1A:
Q1
 
Last edited:

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
It is obvious, but write out proper answers to prepare for test
Yeah k fair enough, for the one that is false u can just say {{a}} is a sub set of A3 not an element right?
could u also check my answer for 2009 Test 1A Q1 before i add it to the main post
 

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
Also how can you prove Q2 2009 Test 1B is invective or subjective ? i think form the graph it does fail the horizontal line test but how would u write out a proof for this one??
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
Yeah k fair enough, for the one that is false u can just say {{a}} is a sub set of A3 not an element right?
could u also check my answer for 2009 Test 1A Q1 before i add it to the main post
yep

ah... i dont think that is clear enough for me lol

To be clear,

A = {n, s, w}

P(A) = blah (from above)

Therefore, A U P(A) = {empty set, n, s, w, {n}, {s}, {w}, {n,s}, {n,w}, {s,w}, {n,s,w}}

P(A U P(A)) = 2^(|A U P(A)|) = 2^11
 

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
yep

ah... i dont think that is clear enough for me lol

To be clear,

A = {n, s, w}

P(A) = blah (from above)

Therefore, A U P(A) = {empty set, n, s, w, {n}, {s}, {w}, {n,s}, {n,w}, {s,w}, {n,s,w}}

P(A U P(A)) = 2^(|A U P(A)|) = 2^11
Yep cool ty
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
Also how can you prove Q2 2009 Test 1B is invective or subjective ? i think form the graph it does fail the horizontal line test but how would u write out a proof for this one??
Range (f) = (-infinity, infinity)

f is 1-1 iff for all y ∈ R, there exists AT MOST one x ∈ R such that f(x) = y
So it's either yes or no. Clearly from a quick sketch, it is NOT 1-1, so we need to provide a counter-example (numerical example)

So when y = -4, 2x^3 + 3x^2 = 0 --> gives 2 x values, hence not 1-1 (i drew a sketch of f and easily found a place where for that one Y-VALUE, there exists 2 - to sketch, draw 2x^3 + 3x^2 then shift curve down 4 units)

f is onto iff for every y ∈ R, there exists at LEAST ONE x ∈ R such that f(x) = y and the range (y-values that exists for f, in this case R) of f equals the co-domain (particular set in which you are defining the function, in this case R) of f

So since range(f) equals co-dom(f), then f is onto

f is bijection, iff f is 1-1 and onto -----> f is not bijective


Oh for range and domain, here is an example:

f : [0,1] -> [-1,5] defined by f(x) = x

Range is [0,1]

Co-domain is [-1,5]

It should be clear that RANGE IS the subset of CO-DOM


If I made a mistake, please tell me!!
 
Last edited:

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
Range (f) = (-infinity, infinity)

f is 1-1 iff for all y ∈ R, there exists AT MOST one x ∈ R such that f(x) = y
So it's either yes or no. Clearly from a quick sketch, it is NOT 1-1, so we need to provide a counter-example (numerical example)

So when y = -4, 2x^3 + 3x^2 = 0 --> gives 2 x values, hence not 1-1 (i drew a sketch of f and easily found a place where for that one Y-VALUE, there exists 2 - to sketch, draw 2x^3 + 3x^2 then shift curve down 4 units)

f is onto iff for every y ∈ R, there exists at LEAST ONE x ∈ R such that f(x) = y and the range (y-values that exists for f, in this case R) of f equals the co-domain (particular set in which you are defining the function, in this case R) of f

So since range(f) equals co-dom(f), then f is onto

f is bijection, iff f is 1-1 and onto -----> f is not bijective


Oh for range and domain, here is an example:

f : [0,1] -> [-1,5] defined by f(x) = x

Range is [0,1]

Co-domain is [-1,5]

It should be clear that RANGE IS the subset of CO-DOM


If I made a mistake, please tell me!!
im really bad with these Qs so help me out a bit here how did u get the range as [0,1] ?
and for the 2 values u get u go like: x^2(2x+3) then x=0 or x= -3/2 right??
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
im really bad with these Qs so help me out a bit here how did u get the range as [0,1] ?
and for the 2 values u get u go like: x^2(2x+3) then x=0 or x= -3/2 right??
The function is f(x), so if you input blah, you get blah

Input [0,1], you get [0,1], hence that is the range

yep, continue with that working out or you will lose marks


sorry, but i have to go now, i'll help you tomorrow - good luck with this
 

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
The function is f(x), so if you input blah, you get blah

Input [0,1], you get [0,1], hence that is the range

yep, continue with that working out or you will lose marks


sorry, but i have to go now, i'll help you tomorrow - good luck with this
K i got confused and thought u said range was [0,1] for this specific Q not for a some general example all g
 

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
For 2009 Test 1A
Q2
i) is it fine to write "f is 1-1 iff for every y an element B, there is at most one x and element of A such that f(x)= y" and " g is 1-1 iff for every y an element of C, there is at most one x an element of B such that f(x)=y"
part ii) i said "suppose g o f(x) = g o f(y), prove x=y..... =g(f(x))=g(f(y)) from definition of composition.... as f and g are 1-1 (given in Q) then x=y hence g o f is 1-1"

Q3 not sure bout my 1 line to 2nd line step tho
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
For 2009 Test 1A
Q2
i) is it fine to write "f is 1-1 iff for every y an element B, there is at most one x and element of A such that f(x)= y" and " g is 1-1 iff for every y an element of C, there is at most one x an element of B such that f(x)=y"
part ii) i said "suppose g o f(x) = g o f(y), prove x=y..... =g(f(x))=g(f(y)) from definition of composition.... as f and g are 1-1 (given in Q) then x=y hence g o f is 1-1"

Q3 not sure bout my 1 line to 2nd line step tho
i) Yep correct, I think you should write 'one-to-one' instead of '1-1'

EDIT: Also include that for x, y in A, if f(x) = f(y), then x = y and likewise for function g

ii) Show a bit more working out

Start from g(f(x)) = g(f(y))

f(x) = f(y) as g is one-to-one

x = y as f is one-to-one

hence g 'circle' f is 1-1


Q3 - I got the answer as AUB, maybe you made a mistake while doing the reverse distributive law too quickly
 
Last edited:

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
Also help me out with 2010 2B Q2 plz
hm....

ii) f(g(x)) is an exponential function, so clearly for every y in R, there exists at most one x in R such that f(g(x)) = y (this is the idea in your mind)
To show it in the test, just show that if x,y in R and f(x) = f(y), then x = y!! (this actually means that if you begin with x and y, and it maps to the same y-value, then x should be equal to y --> Peter Brown says this in his video of solutions to 2008 T1 V1A)

f(x) = f(y)

e^(2x) = e^(2y) (you can log both sides and simplify)
2x = 2y
x = y

Extension to this question: Is f(g(x)) an onto function? Is g(f(x)) an onto function? Give reasons for your answers
 
Last edited:

Drewk

Member
Joined
May 18, 2012
Messages
125
Gender
Male
HSC
2013
Q3 - I got the answer as AUB, maybe you made a mistake while doing the reverse distributive law too quickly
Hmm so for Q 3 i'm not sure how you mean i did the reverse distributive law wrong... here is my working
On 1st line we get (AUB^c)U(AUB) - De morgans law, second line we use the reverse distributive law
The distributive law says: "A ∩ (B ∪ C) = (A ∩ B) ∪ (A ∩ C)"
So we note the A's common in both brackets on the RHS in the above proof and apply to Q taking A...(...)
Then the sign between the brackets in the law is placed in next to the A so then we have A∪..(...)
The the remaining sign is in between brackets hence for our Question A∪(..∪..)
Finally placing the B and B^c in A∪(B∪B^c) am i still wrong ??

Also i found out that double angle formula will likely be tested
 

Thief

!!
Joined
Dec 18, 2010
Messages
561
Gender
Male
HSC
2013
If anyone will be revising today, there's solutions on the mathsoc website.

Also i found out that double angle formula will likely be tested
It's confirmed true by lecturer.
 
Last edited:

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
Drewk, read the question again

Your (AUB^c)U(AUB) should be (A intersect B^c) U (A U B)

AND say if you began from (AUB^c)U(AUB) - you can't use the distributive law
 

Thief

!!
Joined
Dec 18, 2010
Messages
561
Gender
Male
HSC
2013
Drewk, read the question again

Your (AUB^c)U(AUB) should be (A intersect B^c) U (A U B)

AND say if you began from (AUB^c)U(AUB) - you can't use the distributive law
What degree are you doing Heroic?
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top