How do you simplify and find the restrictions for $(x^2+x)/(x^2+2x)$ ?

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How do you simplify and find the restrictions for $(x^2+x)/(x^2+2x)$ ?

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Answer 1 · 2017-07-14T14:38:20

$(x+1)/(x+2); x!=-2, 0$

Explanation:

$(x^2+x)/(x^2+2x)$

$=(cancelx(x+1))/(cancelx(x+2))$ $->$ factor and cancel

$=(x+1)/(x+2)$

The restrictions consist of $x$ -values that make the denominator zero.

Set the original expression's denominator equal to $0$ :

$x^2+2x != 0$
$x(x+2)!= 0$
$x!= 0$ and $x+2!= 0 => x!=-2$

Set the simplified expression's denominator equal to $0$ :
$x+2!=0$
$x!=-2$
This is the same answer as above, but sometimes there are additional restricted values that result from the simplified expression.

$(x+1)/(x+2); x!=-2, 0$

Answer 2 · 2017-07-14T14:46:59

$(x+1)/(x+2)$ [ $x!=0$ and $x!=-2$ ]

Explanation:

Expression $=(x^2+x)/(x^2+2x)$

$= (x(x+1))/(x(x+2))$

If $x!=0$

Expression $=(x+1)/(x+2)$

Hence, Expression is defined $forall x in RR != -2$

$:.$ Expression $=(x+1)/(x+2)$ [ $x!=0$ and $x!=-2$ ]

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How do you simplify and find the restrictions for $(x^2+x)/(x^2+2x)$ ?

2 Answers

Explanation:

Explanation:

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How do you simplify and find the restrictions for $(x^2+x)/(x^2+2x)$ ?