Which statement is true about the relation y=sin(x)? A.The relation is a function because for every angle measure, x , there is a single, distinct y-value. B.The relation is a function because for every angle measure, x , there is more than one single, distinct y-value. C.The relation is not a function because for every angle measure, x , there is a single, distinct y-value. D. The relation is not a function because for every angle measure, x, there is more than one single, distinct y-value.
Which statement is true about the relation y=sin(x)? A.The relation is a function because for every angle measure, x , there is a single, distinct y-value. B.The relation is a function because for every angle measure, x , there is more than one single, distinct y-value. C.The relation is not a function because for every angle measure, x , there is a single, distinct y-value. D. The relation is not a function because for every angle measure, x, there is more than one single, distinct y-value.
Which statement is true about the relation y=sin(x)? A.The relation is a function because for every angle measure, x , there is a single, distinct y-value. B.The relation is a function because for every angle measure, x , there is more than one single, distinct y-value. C.The relation is not a function because for every angle measure, x , there is a single, distinct y-value. D. The relation is not a function because for every angle measure, x, there is more than one single, distinct y-value.
Which statement is true about the relation y=sin(x)?
A.The relation is a function because for every angle measure, x , there is a single, distinct y-value.
B.The relation is a function because for every angle measure, x , there is more than one single, distinct y-value.
C.The relation is not a function because for every angle measure, x , there is a single, distinct y-value.
D. The relation is not a function because for every angle measure, x, there is more than one single, distinct y-value.
Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.
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