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$\\simplify{{cons_num[0]}*x^{x1[0]}*y^{y1[0]}}$$\\simplify{{cons_num[0]}*{mult[0]}*x^{x2[0]}*y^{y2[0]}}$ =

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$\\simplify{x^({x1[0]}-{x2[0]})*y^({y1[0]}-{y2[0]})}$$\\simplify{{mult[0]}}$

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$\\simplify{x^({x1[0]}+{x2[0]})*y^({y1[0]}-{y2[0]})}$$\\simplify{{mult[0]}}$

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$\\simplify{x^({x1[0]}+{x2[0]})*y^({y1[0]}+{y2[0]})}$$\\simplify{{mult[0]}}$

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$\\simplify{{cons_num[1]}*x^{x1[1]}*y^{y1[1]}}$$\\simplify{{cons_num[1]}*{mult[1]}*x^{x2[1]}*y^{y2[1]}}$ =

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$\\simplify{x^({x1[1]}-{x2[1]})*y^({y1[1]}-{y2[1]})}$$\\simplify{{mult[1]}}$

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$\\simplify{x^({x1[1]}+{x2[1]})*y^({y1[1]}-{y2[1]})}$$\\simplify{{mult[1]}}$

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$\\simplify{x^({x1[1]}-{x2[1]})*y^({y1[1]}+{y2[1]})}$$\\simplify{{mult[1]}}$

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$\\simplify{x^({x1[1]}+{x2[1]})*y^({y1[1]}+{y2[1]})}$$\\simplify{{mult[1]}}$

$\\simplify{{cons_num[2]}*(x+y)^{x1[2]}}$$\\simplify{{cons_num[2]}*{mult[2]}*(x+y)^{x2[2]}}$

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$\\simplify{2*(x+y)^({x1[2]}-{x2[2]})}$

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$\\simplify{2*(x+y)^({x1[2]}+{x2[2]})}$

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$\\simplify{2*(x+y)^(2*({x1[2]}-{x2[2]}))}$

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$\\simplify{2*(x+y)^({x1[2]}*{x2[2]})}$

$\\simplify{{cons_num[3]}*x^{x1[3]}*y^{y1[3]}}$$\\simplify{{cons_num[3]}*{mult[3]}*x^{x2[3]}*y^{y2[3]}}$ =

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$\\simplify{x^({x1[3]}-{x2[3]})*y^({y1[3]}-{y2[3]})}$$\\simplify{{mult[3]}}$

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$\\simplify{x^({x1[3]}-{x2[3]})*y^({y1[3]}+{y2[3]})}$$\\simplify{{mult[3]}}$

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$\\simplify{x^({x1[3]}+{x2[3]})*y^({y1[3]}+{y2[3]})}$$\\simplify{{mult[3]}}$

$\\simplify{{cons_num[4]}*x^{x1[4]}*y^{y1[4]}}$$\\simplify{{cons_num[4]}*{mult[4]}*x^{x2[4]}*y^{y2[4]}}$ =

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$\\simplify{x^({x1[4]}-{x2[4]})*y^({y1[4]}-{y2[4]})}$$\\simplify{{mult[4]}}$

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$\\simplify{x^({x1[4]}+{x2[4]})*y^({y1[4]}-{y2[4]})}$$\\simplify{{mult[4]}}$

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$\\simplify{x^({x1[4]}-{x2[4]})*y^({y1[4]}+{y2[4]})}$$\\simplify{{mult[4]}}$

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$\\simplify{x^({x1[4]}+{x2[4]})*y^({y1[4]}+{y2[4]})}$$\\simplify{{mult[4]}}$

Power of x

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Putting algebraic fractions into their simplest forms

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Simplify the following fractions.

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