MATH 1151 Question (1 Viewer)

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
a) By expanding ' ( x - y ) ^ 2 ' prove that ' (x ^ 2 ) + ( y ^ 2 ) ' is GREATER THAN or EQUAL to ' 2 x y ' for all real numbers x, y.

b) Deduce that ' (a + b ) / 2 ' is GREATER THAN or EQUAL to ' sqrt (ab) ' for all non-negative real numbers a, b. When does equality hold?

Is the answer: "When 'x' and 'y' are equal." or... am i misinterpreting this question?
 

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A






For the next part, "deduce", we can substitute

Equality holds iff a=b
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
Noo... i did that and i deduced the answer. It's just the part when it asks "When does equality hold?" that I'm confused about.
 

kaz1

et tu
Joined
Mar 6, 2007
Messages
6,960
Location
Vespucci Beach
Gender
Undisclosed
HSC
2009
Uni Grad
2018
first year noob there is a maths help thingo level 4 of the red centre
 

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A
Noo... i did that and i deduced the answer. It's just the part when it asks "When does equality hold?" that I'm confused about.
Consider what we have proved.



When does the side have equality to the other side? When a=b. Check it to see. Though what Kaz said is partially right (in saying a=0, b=0 the equality will hold, it is really a subset of what I have said.)
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
I kinda said that too... didn't I? LMAO but thanks for verifying.
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
c) Use the result above to find the minimum value of ' y = (x^2) + 1 / (x^2) '.

so from a) i could just write...

from (a) : (x^2) + 1 / (x^2) is GREATER THAN or EQUAL to 2

and from that could I say the 'minimum value of blah blah' will be 2? or is there something more i need to say?
 

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A
c) Use the result above to find the minimum value of ' y = (x^2) + 1 / (x^2) '.

so from a) i could just write...

from (a) : (x^2) + 1 / (x^2) is GREATER THAN or EQUAL to 2

and from that could I say the 'minimum value of blah blah' will be 2? or is there something more i need to say?
Say when the equality holds. Can you see it? There are two possible ways this equality can hold.
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
OHH... took me a while to understand what you said... So... basically after I state 'the minimum value of blah blah will be 2' I would also say for what values of 'x' will yield the minimum value?

i.e. The minimum value of ' y = (x^2) + 1/(x^2) ' will be 2 and this value will be obtained when 'x' is 1 or -1.

Right?
 

SpiralFlex

Well-Known Member
Joined
Dec 18, 2010
Messages
6,960
Gender
Female
HSC
N/A
OHH... took me a while to understand what you said... So... basically after I state 'the minimum value of blah blah will be 2' I would also say for what values of 'x' will yield the minimum value?

i.e. The minimum value of ' y = (x^2) + 1/(x^2) ' will be 2 and this value will be obtained when 'x' is 1 or -1.

Right?
Yes very well done.
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
001.png

Okay... what I don't understand is why is the answer '12978189' as opposed to '12978188'. Shouldn't you be rounding down? =/
 

Shadowless

Member
Joined
May 3, 2010
Messages
342
Gender
Male
HSC
2012
Hmm... Makes sense.

But would I have to provide an explanation? Or could I just write:

Therefore there would be '12978189' digits in the decimal expansion.

?
 

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

Top