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Operations on Exponents in Algebraic Expansions

Verify that x...

Question

Verify that $x^{3} + y^{3} + z^{3} - 3 x y z =$ $\frac{1}{2} (x + y + z) [{(x - y)}^{2} + {(y - z)}^{2} + {(z - x)}^{2}]$

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Solution

Verifying $x^{3} + y^{3} + z^{3} - 3 x y z =$ $\frac{1}{2} (x + y + z) [{(x - y)}^{2} + {(y - z)}^{2} + {(z - x)}^{2}]$ :
Taking R.H.S.,
Using the identity, ${(a - b)}^{2} = a^{2} - 2 a b + b^{2}$ , we get
${(x - y)}^{2} = x^{2} - 2 x y + y^{2} {(y - z)}^{2} = y^{2} - 2 y z + z^{2} {(z - x)}^{2} = z^{2} - 2 z x + x^{2}$
Now put these values in R.H.S., we get,
$\begin{array}{rcl} \frac{1}{2} (x + y + z) [{(x - y)}^{2} + {(y - z)}^{2} + {(z - x)}^{2}] & = & \frac{1}{2} (x + y + z) \times [(x^{2} - 2 xy + y^{2}) + (y^{2} - 2 yz + z^{2}) + (z^{2} - 2 zx + x^{2})] \\ = & \frac{1}{2} (x + y + z) \times [x^{2} - 2 xy + y^{2} + y^{2} - 2 yz + z^{2} + z^{2} - 2 zx + x^{2}] \\ = & \frac{1}{2} (x + y + z) \times [2 x^{2} - 2 xy + 2 y^{2} - 2 yz + 2 z^{2} - 2 zx] \\ = & \frac{1}{2} (x + y + z) \times 2 \times [x^{2} - xy + y^{2} - yz + z^{2} - zx] \\ = & (x + y + z) \times [x^{2} - xy + y^{2} - yz + z^{2} - zx] \\ = & x \times [x^{2} - xy + y^{2} - yz + z^{2} - zx] + y \times [x^{2} - xy + y^{2} - yz + z^{2} - zx] + z \times [x^{2} - xy + y^{2} - yz + z^{2} - zx] \\ = & [x^{3} - x^{2} y + {xy}^{2} - xyz + {xz}^{2} - {zx}^{2}] + [x^{2} y - {xy}^{2} + y^{3} - y^{2} z + {yz}^{2} - zxy] + [{zx}^{2} - xyz + y^{2} z - {yz}^{2} + z^{3} - z^{2} x] \\ = & x^{3} - x^{2} y + {xy}^{2} - xyz + {xz}^{2} - {zx}^{2} + x^{2} y - {xy}^{2} + y^{3} - y^{2} z + {yz}^{2} - zxy + {zx}^{2} - xyz + y^{2} z - {yz}^{2} + z^{3} - z^{2} x \\ = & x^{3} - xyz + y^{3} - zxy - xyz + z^{3} \\ = & x^{3} + y^{3} + z^{3} - 3 xyz \\ = & L . H . S \end{array}$
Hence, $x^{3} + y^{3} + z^{3} - 3 x y z =$ $\frac{1}{2} (x + y + z) [{(x - y)}^{2} + {(y - z)}^{2} + {(z - x)}^{2}]$ is verified.

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Verify that : $x^{3} + y^{3} + z^{3} - 3 x y z = \frac{1}{2} (x + y + z) [{(x - y)}^{2} + {(y - z)}^{2} + {(z - x)}^{2})]$

x^{3} + y^{3} + z^{3} - 3 x y z = \frac{1}{2} (x + y + z) [(x - y)^{2} + (y - z)^{2} + (z - x)^{2}]

x^{3} + y^{3} + z^{3} - 3 x y z = \frac{1}{2} (x + y + z) [(x - y)^{2} + (y - z)^{2} + (z - x)^{2}]

Q. State True or False.

x^{3} + y^{3} + z^{3} - 3 x y z = \frac{1}{2} (x + y + z) [(x - y)^{2} + (y - z)^{2} + (z - x)^{2}]

Q. Question 12
Verify that:

x^{3} + y^{3} + z^{3} - 3 x y z = \frac{1}{2} (x + y + z) [(x - y)^{2} + (y - z)^{2} + (z - x)^{2}]

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