Past Paper Help? (1 Viewer)

Zokunu

Member
Joined
May 18, 2012
Messages
239
Location
Sydney
Gender
Male
HSC
2014
ok, what am i doing wrong here?

I'm asked to rearrange this to make k the subject?

T = 2pi√m/k
T^2 = 4pi^2 m/k <--Divide on this by K?
T^2/k = 4pi^2 m
KT^2 = 4pi^2 m
k = 4pi^2m/T <- I got this ==''

is this right?
 
Joined
Sep 20, 2010
Messages
2,225
Gender
Undisclosed
HSC
2012
Your 2nd step is incorrect. You have divided by k instead of multiplying.
 

Menomaths

Exaı̸̸̸̸̸̸̸̸lted Member
Joined
Jul 9, 2013
Messages
2,373
Gender
Male
HSC
2013
Apparently I got the same answer
 

Zokunu

Member
Joined
May 18, 2012
Messages
239
Location
Sydney
Gender
Male
HSC
2014
Your 2nd step is incorrect. You have divided by k instead of multiplying.
Oh w8 yep my bad.

A plane flies 1600km in 2 hours and 45 minutes. Calculate it's speed correct to 3 significant figures?

S=D/T?

= 1600/2.45? right?
 

Menomaths

Exaı̸̸̸̸̸̸̸̸lted Member
Joined
Jul 9, 2013
Messages
2,373
Gender
Male
HSC
2013
Oh w8 yep my bad.

A plane flies 1600km in 2 hours and 45 minutes. Calculate it's speed correct to 3 significant figures?

S=D/T?

= 1600/2.45? right?
Nope, 1600/ 2.75
The T squared one is correct
 

Zokunu

Member
Joined
May 18, 2012
Messages
239
Location
Sydney
Gender
Male
HSC
2014
Bump... How do i factorise these 2?

4x^2 + 17xy + 15y^2

15a^4b - 10a^4b^2 - 20a^3b^3?

thx
 

MrBeefJerky

Member
Joined
Jul 10, 2013
Messages
62
Gender
Undisclosed
HSC
2014
1) 4x^2+17xy+15y^2
Using cross method, you get (4x+5y)(x+3y)
2) 5a^3b(3a-2ab-4b^2)?
 

MrBeefJerky

Member
Joined
Jul 10, 2013
Messages
62
Gender
Undisclosed
HSC
2014
It is a bit difficult to explain, but I'll try. You basically draw a cross (X) and on the LHS (end points) you find two values that multiply together to get 4x^2. This could be 4x and x or 2x and 2x. On the RHS (end points) you need two values that multiply to get 15y^2 which could be 5y and 3y or 15y and y. Multiply the two values that are diagonally across and add it with the multiplication of the other diagonal. This should add up to 17xy. If it does then the factors of the equation will be the two values that are opposite each other added together.
4x 5y
X
x 3y
(4x multiply by x) gives 4x^2 (5y multiply by 3y) gives 15y^2 and adding the multiplication of the diagonals is: (4x x 3y) + (x x 5y) = 17xy. Therefore the factors are (4x+5y)(x+3y)
 

Zokunu

Member
Joined
May 18, 2012
Messages
239
Location
Sydney
Gender
Male
HSC
2014
It is a bit difficult to explain, but I'll try. You basically draw a cross (X) and on the LHS (end points) you find two values that multiply together to get 4x^2. This could be 4x and x or 2x and 2x. On the RHS (end points) you need two values that multiply to get 15y^2 which could be 5y and 3y or 15y and y. Multiply the two values that are diagonally across and add it with the multiplication of the other diagonal. This should add up to 17xy. If it does then the factors of the equation will be the two values that are opposite each other added together.
4x 5y
X
x 3y
(4x multiply by x) gives 4x^2 (5y multiply by 3y) gives 15y^2 and adding the multiplication of the diagonals is: (4x x 3y) + (x x 5y) = 17xy. Therefore the factors are (4x+5y)(x+3y)
Far, thx man :) I get it now
 

Hypem

Member
Joined
Mar 13, 2013
Messages
133
Gender
Male
HSC
2013
Far, thx man :) I get it now
You could also use PSF (product, sum, factors)

4x^2 + 17xy + 15y^2

P: first+last 15*4
S: middle
F: what two numbers multiply together to get 60 and add together to get 17?

P: 60
S: 17
F: 12,5

Break the middle into two different parts based on the factors:

4x^2 + 12xy + 5xy + 15y^2
4x^2 + 12xy | + 5xy + 15y^2

Factorise each part:

4x(x+3y) + 5y(x+3y)

Bring the outsides together and the common one:

(4x+5y)(x+3y)
 

Menomaths

Exaı̸̸̸̸̸̸̸̸lted Member
Joined
Jul 9, 2013
Messages
2,373
Gender
Male
HSC
2013
You could also use PSF (product, sum, factors)

4x^2 + 17xy + 15y^2

P: first+last 15*4
S: middle
F: what two numbers multiply together to get 60 and add together to get 17?

P: 60
S: 17
F: 12,5

Break the middle into two different parts based on the factors:

4x^2 + 12xy + 5xy + 15y^2
4x^2 + 12xy | + 5xy + 15y^2

Factorise each part:

4x(x+3y) + 5y(x+3y)

Bring the outsides together and the common one:

(4x+5y)(x+3y)
Can do this in a few seconds with a calculator allowed in HSC
 

Hypem

Member
Joined
Mar 13, 2013
Messages
133
Gender
Male
HSC
2013
ok, what am i doing wrong here?

I'm asked to rearrange this to make k the subject?

T = 2pi√m/k
T^2 = 4pi^2 m/k <--Divide on this by K?
T^2/k = 4pi^2 m
KT^2 = 4pi^2 m
k = 4pi^2m/T <- I got this ==''

is this right?

ohh you meant sqrt(m/k)
nvm
 
Last edited:

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

Top