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what is the minimal expression of (x + x y^ + x y ^ z) ?

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take x common from all expression x(1+y^ + y^z) = x so the answer is x

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the answer will be x

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x

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xy^z

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x + xy^ + xy^z = x[1 + y^ + y^z] = x

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since x is common in all the terms so x[1 + .....] = x

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x

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x

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=(x+xy'+xy'z) =(x(1+y')+xy'z) =(x+xy'z) =(x(1+y'z)) =x

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