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Question (1 Viewer)
- Thread starter GaDaMIt
- Start date
acullen
Povo postgrad
I'm not sure as to how they expect you to approach this problem, but I'll assume that you are to define two pronumerals as numeric constants.
As a+b+c=0
Let
Proof
(2a-b)³+(2b-c)³+(2c-a)³ = 3(2a-b)(2b-c)(2c-a)
As a=2, b=3 and c=-5...
LHS
(2•2-3)³+(2•3-(-5))³+(2•(-5)-2)³
(4-3)³+(6+5)³+(-10-2)
1³+11³+(-12)³
1+1331-1728
-396
RHS
3(2•2-3)(2•3-(-5))(2•(-5)-2)
3(4-3)(6+5)(-10-2)
3(1)(11)(-12)
-396
.: LHS = RHS
As a+b+c=0
Let
a = 2
b = 3
.: 2+3+c=0
c=-5
b = 3
.: 2+3+c=0
c=-5
Proof
(2a-b)³+(2b-c)³+(2c-a)³ = 3(2a-b)(2b-c)(2c-a)
As a=2, b=3 and c=-5...
LHS
(2•2-3)³+(2•3-(-5))³+(2•(-5)-2)³
(4-3)³+(6+5)³+(-10-2)
1³+11³+(-12)³
1+1331-1728
-396
RHS
3(2•2-3)(2•3-(-5))(2•(-5)-2)
3(4-3)(6+5)(-10-2)
3(1)(11)(-12)
-396
.: LHS = RHS
+Po1ntDeXt3r+
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subbing in values is not a proof.. as it may not be true for all values
consider
(2a-b)=X
(2b-c)=Y
(2c-a)=Z
then hence X + Y+ Z = a + b + c = 0
and X^3+Y^3+Z^3 = 3XYZ
generally use the
(X + Y +Z) ^3 = 0 = X^3 + Y^3 + Z^3 + 6XYZ + 3 (X^2Y + X^2Z +Y^2Z + Y^2X + Z^2X + Z^2Y)
= 0 (from the X + Y+ Z = 0.. 0 cubed is zero)
now use the hint in the question
(2a-b)^3 + (2b – c)^3 + (2c – a)^3 = 3(2a-b)(2b-c)(2c-a)
which means ure trying to make
X^3+Y^3+Z^3 = 3XYZ
so add 3XYZ to ure equation
X^3 + Y^3 + Z^3 + 6XYZ + 3 (X^2Y + X^2Z +Y^2Z + Y^2X + Z^2X + Z^2Y) + 3XYZ - 3XYZ
factor out
gives u
X^3 + Y^3 + Z^3 + 3(X + Y + Z)(XY+YZ+ZX) - 3XYZ = 0
X^3 + Y^3 + Z^3 + 3(X + Y + Z)(XY+YZ+ZX) = 3XYZ
using X + Y+ Z = 0
X^3 + Y^3 + Z^3 = 3XYZ
then resubing the initial values
(2a-b)^3 + (2b – c)^3 + (2c – a)^3 = 3(2a-b)(2b-c)(2c-a)
Ok i havent done 3Unit maths in 2 yrs.. so im not sure if this is the shortest way
P.S took me 14 mins to refresh :S
consider
(2a-b)=X
(2b-c)=Y
(2c-a)=Z
then hence X + Y+ Z = a + b + c = 0
and X^3+Y^3+Z^3 = 3XYZ
generally use the
(X + Y +Z) ^3 = 0 = X^3 + Y^3 + Z^3 + 6XYZ + 3 (X^2Y + X^2Z +Y^2Z + Y^2X + Z^2X + Z^2Y)
= 0 (from the X + Y+ Z = 0.. 0 cubed is zero)
now use the hint in the question
(2a-b)^3 + (2b – c)^3 + (2c – a)^3 = 3(2a-b)(2b-c)(2c-a)
which means ure trying to make
X^3+Y^3+Z^3 = 3XYZ
so add 3XYZ to ure equation
X^3 + Y^3 + Z^3 + 6XYZ + 3 (X^2Y + X^2Z +Y^2Z + Y^2X + Z^2X + Z^2Y) + 3XYZ - 3XYZ
factor out
gives u
X^3 + Y^3 + Z^3 + 3(X + Y + Z)(XY+YZ+ZX) - 3XYZ = 0
X^3 + Y^3 + Z^3 + 3(X + Y + Z)(XY+YZ+ZX) = 3XYZ
using X + Y+ Z = 0
X^3 + Y^3 + Z^3 = 3XYZ
then resubing the initial values
(2a-b)^3 + (2b – c)^3 + (2c – a)^3 = 3(2a-b)(2b-c)(2c-a)
Ok i havent done 3Unit maths in 2 yrs.. so im not sure if this is the shortest way
P.S took me 14 mins to refresh :S
insert-username
Wandering the Lacuna
You have to prove the equation is true for all possible values of a, b, and c, not just a few random ones. I would assume that you expand (2a-b)3 + (2b – c)3 + (2c – a)3, then eliminate any instances of (a + b + c), as that equals 0, and that should equal the RHS. If I get time I'll expand it out and see if it works.
EDIT: Pointdexter's way is much better
I_F
EDIT: Pointdexter's way is much better
I_F
Last edited:
acullen
Povo postgrad
Haha, what can I say, I got lazy.