Show that + : R xx R ->Rand xx : R xx R ...

Show that `+ : R xx R ->R`and `xx : R xx R ->R`are commutative binary operations, but ` : RxxR ->R`and `-: : R_* xxR_* ->R_*`are not commutative.

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MODERN PUBLICATION-RELATIONS AND FUNCTIONS-CHAPTER TEST (1)

R is a relation is defined on the set {1,2,3,4} as follow R={(1,2), ...
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If f be greatest integer function defined asf(x)=[x] and g be the mdou...
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Give an example of a relation which is symmetric but neither reflex...
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Are f and g both necessarily onto, if gofis onto?
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Show that + : R xx R ->Rand xx : R xx R ->Rare commutative binary ope...
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Prove that the relation R on the set NxxN defined by (a ,\ b)R\ (c ,\ ...
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Show that the Signum Function f:RrarrR, given by : f(x)={{:("1, if "...
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If f(x)=(x-1)/(x+1),x!=-1, . then show that f(f(x))=-1/x , prove that ...
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Let Y = {n^2: n in N} in N. Consider f : N ->Yas f(n)=n^2. Show tha...
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Is *defined on the set {1, 2, 3, 4, 5} b y a * b = LdotCdotMdotof a a...
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If R(1) and R(2) are equivalence relations in a set A, show that R(1) ...
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Consider the binary operations *:" "RxxR ->R and o:" "R" "xx" "R->R de...
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