Step-by-step explanation:
We have
[tex]125 - x {}^{3} [/tex]
First, 125 is a perfect cube because
[tex]5 \times 5 \times 5 = 125[/tex]
and
x^3 is a perfect cube because
[tex]x \times x \times x = x {}^{3} [/tex]
so we can use the difference of cubes identity
[tex]( {x}^{3} - {y}^{3} ) = (x - y)( {x}^{2} + xy + {y}^{2} )[/tex]
Let say we have two perfect cubes:
64 because 8×8×8=64
and 27 because 3×3×3=27 and let subtract
[tex]64 - 27[/tex]
we know that
[tex]64 - 27 = 37[/tex]
but using the difference of cubes identity we should get the same thing.
Remeber cube root of 64 is 4 and cube root of 27 is 3 so we have
[tex](4 - 3)( {4}^{2} + 4(3) + 3 {}^{2} )[/tex]
[tex]1(16 + 12 + 9) = 1(37) = 37[/tex]
So the difference of cubes works for real numbers. This is a good way to help remeber the identity using real numbers.
Back on to the topic,
we know that 5 is cube root of 125 and x is the cube root of x^3 so we have
[tex](5 - x)( {5}^{2} + 5x + {x}^{2} ) = [/tex]
[tex](5 - x)(25 + 5x + {x}^{2} )[/tex]
