How do you simplify: $\frac{1}{4} x^{2} y^{2} z + \frac{25}{4} x^{2} z - \frac{5}{2} x^{2} y z$ $1/4x^2y^2z+25/4x^2z-5/2x^2yz$ ?

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Answer 1 · 2016-04-19T01:29:48

$(\frac{1}{4}) x^{2} {(y - 5)}^{2} z$ $(1/4)x^2(y-5)^2z$

The factors are $x^{2} and z$ $x^2 and z$ , Also, factor $(\frac{1}{4})$ $(1/4)$ would leave the numerical coefficients as integers.

So, the expression = $(\frac{1}{4}) x^{2} z (y^{2} - 10 y + 25) = (\frac{1}{4}) x^{2} z {(y - 5)}^{2}$ $(1/4)x^2z(y^2-10y+25)=(1/4)x^2z(y-5)^2$

How do you simplify: 1/4x^2y^2z+25/4x^2z-5/2x^2yz14x2y2z+254x2z−52x2yz1/4x^2y^2z+25/4x^2z-5/2x^2yz?