- #1
philbein
- 9
- 0
I need help urgently asap proving that -0=0
Prove that
0=-0
We Can use only the following axioms for Real Numbers
(x+y)+z=x+(y+z); (xy)z=x(yz)
x+y=y+x; xy=yx
x(y+z)=(xy)+(xz)
The Additive Identity 0+x=x
The Additive Inverse for all x in the real numbers there exists -x, such that x+(-x)=0
Multipicative Identity There exists an element 1, such that x*1=x
Mult. Inverse There exists for all x an inverse (1/x), such that x(1/x)=1
If x is in the real numbers than one of the following is true
x is positive
x is 0
-x is positive
You can also add or multiply the same thing to both sides of the equation
We know that x+(-x)=0
thus, we see that -(x+(-x))=-0
I'm not sure where i can go next. We can use the distributive property, but would we be allowed to use it in this situation with the (-).
Homework Statement
Prove that
0=-0
Homework Equations
We Can use only the following axioms for Real Numbers
(x+y)+z=x+(y+z); (xy)z=x(yz)
x+y=y+x; xy=yx
x(y+z)=(xy)+(xz)
The Additive Identity 0+x=x
The Additive Inverse for all x in the real numbers there exists -x, such that x+(-x)=0
Multipicative Identity There exists an element 1, such that x*1=x
Mult. Inverse There exists for all x an inverse (1/x), such that x(1/x)=1
If x is in the real numbers than one of the following is true
x is positive
x is 0
-x is positive
You can also add or multiply the same thing to both sides of the equation
The Attempt at a Solution
We know that x+(-x)=0
thus, we see that -(x+(-x))=-0
I'm not sure where i can go next. We can use the distributive property, but would we be allowed to use it in this situation with the (-).
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