Extension One Revising Game (1 Viewer)

Timothy.Siu

Prophet 9
Joined
Aug 6, 2008
Messages
3,449
Location
Sydney
Gender
Male
HSC
2009
youngminii said:
Don't quite understand the last part :S
And you were meant to type your own question!

By the way, Harder 3u is 4u
he just added the same terms to both sides
 

youngminii

Banned
Joined
Feb 13, 2008
Messages
2,083
Gender
Male
HSC
2009
OH, sorry I thought the (10n+1 - 9n - 10) was part of the denominator. Nevermind
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
Timothy.Siu said:
uhh ok

Prove by induction that 7+77+777+....+777...to n digits=7/81(10n+1-9n-10)
G.P: last term has 7+70+700+... a=7,r=10
Sn=7/9(10^n-1)

7=S1=7/9(10-1)
70=S2=7/9(100-1)
777...=7/9(10^n-1)

BY adding n lines 7+77+777+777 n digits=7/9(10+10^2+10^3+..10^n)-7n/9
7/9 x [10(10^n-1)/9]-7n/9

=7/9x[10(10^n-1)/9-n)]
=7/81(10^n+1-9n-1)
 
Last edited:

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,392
Gender
Male
HSC
2006
Timothy.Siu said:
Prove by induction that 7+77+777+....+777...to n digits=7(10n+1-9n-10)/81
Using an induction proof...
For n = 1:
LHS = 7
RHS = 7(100 - 9 - 10) / 81
= 7
LHS = RHS so statement is true for n = 1
Assume it is true for n = k
7+77+777+....+777...to k digits = 7(10k+1-9k-10)/81
Required to prove it is true for n = k + 1
7+77+777+....+777...to k + 1 digits = 7(10k+2-9k-19)/81
LHS = 7+77+777+....+777...to k + 1 digits
= 7(10k+1-9k-10)/81 + 777777.... (k + 1 digits) by assumption
= 7[10k+1-9k-10 + 81(111111.....{k + 1 digits})] / 81
= 7[10k+1-9k-10 + 81(10000000.....{k + 1 digits} + 10000000.... {k digits} + 10000000.... {k - 1digits} + ......)] / 81
= 7[10k+1-9k-10 + 81(10k + 10k - 1 + 10k - 2 + ......)] / 81
= 7[10k+1-9k-10 + 81(10k + 1 - 1) / 9)] / 81
= 7[10k+1-9k-10 + 9.10k + 1 - 9] / 81
= 7[10.10k+1-9k-19)] / 81
= 7[10k+2-9k-19)] / 81
= RHS
If the statement is true for n = k, it is also true for n = k + 1.
Since it is true for n = 1, it is true for all positive integers n by induction.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,392
Gender
Male
HSC
2006
addikaye03 said:
Factorise (a+b+c)^3-a^3-b^3-c^3
(a + b + c)³ - a³ - b³ - c³ = (a + b + c - a)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)[(a + b + c)² + a(a + b + c) + a² - (b² - bc + c²)]
= (b + c)[a² + b² + c² + 2ab + 2ac + 2bc + a² + ab + ac + a² - b² + bc - c²]
= (b + c)[3a² + 3ab + 3ac + 3bc]
= (b + c)[3a(a + b) + 3c(a + b]
= 3(a + b)(b + c)(a + c)

I'll give a question: (It's not as straightforward as it looks)

Consider a triangle ABC with, the length of BC being 20 metres and the length of AC being 30 metres. It is also known that angle BAC is 40º.

(i) Find angle ABC to the nearest minute

(ii) Hence calculate the side AB to 2 decimal places
 
Last edited:

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
Trebla said:
(a + b + c)³ - a³ - b³ - c³ = (a + b + c - a)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)[(a + b + c)² + a(a + b + c) + a² - (b² - bc + c²)]
= (b + c)[a² + b² + c² + 2ab + 2ac + 2bc + a² + ab + ac + a² - b² + bc - c²]
= (b + c)[3a² + 3ab + 3ac + 3bc]
= (b + c)[3a(a + b) + 3c(a + b]
= 3(a + b)(b + c)(a + c)
U r so VERY good at maths lol I have to admit i didnt get this Q right(stuff'd up a factorisation), u nailed it tho. have u got a Q to post up?
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
Trebla said:
(a + b + c)³ - a³ - b³ - c³ = (a + b + c - a)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)((a + b + c)² + a(a + b + c) + a²) - (b + c)(b² - bc + c²)
= (b + c)[(a + b + c)² + a(a + b + c) + a² - (b² - bc + c²)]
= (b + c)[a² + b² + c² + 2ab + 2ac + 2bc + a² + ab + ac + a² - b² + bc - c²]
= (b + c)[3a² + 3ab + 3ac + 3bc]
= (b + c)[3a(a + b) + 3c(a + b]
= 3(a + b)(b + c)(a + c)

I'll give a question:

Consider a triangle ABC with, the length of BC being 20 metres and the length of AC being 30 metres. It is also known that angle BAC is 40º.

(i) Find angle ABC to the nearest minute

(ii) Hence calculate the side AB to 2 decimal places
let <ABC=@
SinB/b=SinA/a
Sin@/30=Sin40/20
Sin@=30sin40degrees/20
@=74 degrees 37'

ii) <ACB=180-(40+74.37')
=65'23', 105'23' ( nearest min)

Similarly, AB=20Sin65'23'/Sin40 degrees
=28.29, 30m (2d.p)

Question: Prove by mathematical induction, the sum of the exterior angles of a n-sided polygon=360 degrees
 
Last edited:

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,392
Gender
Male
HSC
2006
addikaye03 said:
let <ABC=@
SinB/b=SinA/a
Sin@/30=Sin40/20
Sin@=30sin40degrees/20
@=74 degrees 37'

ii) <ACB=180-(40+74.37')
=65'23' ( nearest min)

Similarly, AB=20Sin65'23'/Sin40 degrees
=28.29 (2d.p)
It's not that straightforward. There's something missing. I'll let you think about it...;)
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
Trebla said:
It's not that straightforward. There's something missing. I'll let you think about it...;)
I knew it! lol it felt wayy to easy. Well im thinking.... The angle orientation allows for the above answer, there cant be an obtuse angle...its non-right angle therefore Sine rule or Cosine... lol...umm... could u please assist me lol
 

Timothy.Siu

Prophet 9
Joined
Aug 6, 2008
Messages
3,449
Location
Sydney
Gender
Male
HSC
2009
well if thats all, theres no other trick, its like a yr 10 question, unless i'm missing something
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,392
Gender
Male
HSC
2006
Timothy.Siu's correct. Good job. This also implies there are two possible answers for AB.
 
Last edited:

youngminii

Banned
Joined
Feb 13, 2008
Messages
2,083
Gender
Male
HSC
2009
Oh shit.
Is it because sin(180 - theta) = sin(theta)?
So theta can be 74'37' OR 105'22'?

P.S. You're a genius Trebla
 

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

Top