Question

verify x³+y³=(x+y)(x²-xy+u²) , x³-y³=(x-y)(x²-xy+y²) using some non-zero positive integers and check by actual multiplication.can you call these as identities?​

Answer 1

Answer:

Step-by-step explanation:

To prove: x  

3

−y  

3

=(x−y)(x  

2

+xy+y  

2

)

Consider the right hand side (RHS) and expand it as follows:

(x−y)(x  

2

+xy+y  

2

)=x  

3

+x  

2

y+xy  

2

−yx  

2

−xy  

2

−y  

3

 

=(x  

3

−y  

3

)+(x  

2

y+xy  

2

+x  

2

y−xy  

2

)=x  

3

−y  

3

=LHS  

Hence proved.

Yes, we can call it as an identity: For example:

Let us take x=2 and y=1 in x  

3

−y  

3

=(x−y)(x  

2

+xy+y  

2

) then the LHS and RHS will be equal as shown below:

2  

3

−1  

3

=7 and  

(2−1)(2  

2

+(2×1)+1  

2

)=1(5+2)=1×7=7

Therefore, LHS=RHS

Hence, x  

3

−y  

3

=(x−y)(x  

2

+xy+y  

2

) can be used as an identity.