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How does distributive property works? - Answers
Suppose x, y and z are elements of a set and # and ~ are two binary operations defined on the set. Then, the distributive property of # over ~ sates that for all elements x, y and z in the set, x # (y ~ z) = x#y ~ x#z A common example is # = multiplication and ~ = addition (or subtraction). In that case, the distributive property of multiplication over addition states that x*(y + z) = x*y + x*z
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How does distributive property works? - Answers
Suppose x, y and z are elements of a set and # and ~ are two binary operations defined on the set. Then, the distributive property of # over ~ sates that for all elements x, y and z in the set, x # (y ~ z) = x#y ~ x#z A common example is # = multiplication and ~ = addition (or subtraction). In that case, the distributive property of multiplication over addition states that x*(y + z) = x*y + x*z
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How does distributive property works? - Answers
Suppose x, y and z are elements of a set and # and ~ are two binary operations defined on the set. Then, the distributive property of # over ~ sates that for all elements x, y and z in the set, x # (y ~ z) = x#y ~ x#z A common example is # = multiplication and ~ = addition (or subtraction). In that case, the distributive property of multiplication over addition states that x*(y + z) = x*y + x*z
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- og:descriptionSuppose x, y and z are elements of a set and # and ~ are two binary operations defined on the set. Then, the distributive property of # over ~ sates that for all elements x, y and z in the set, x # (y ~ z) = x#y ~ x#z A common example is # = multiplication and ~ = addition (or subtraction). In that case, the distributive property of multiplication over addition states that x*(y + z) = x*y + x*z
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