In order for a relation to be a function, for each x-value there must be exactly one corresponding y-value. Let's analyze the given relation t:
x: 0, 2, 4, 6
y: -10, -1, 4, 8
Since each x-value has exactly one corresponding y-value, we can conclude that relation t is a function.
To determine if the inverse of relation t is also a function, we need to switch the x and y values:
x: -10, -1, 4, 8
y: 0, 2, 4, 6
Now, if each x-value has exactly one corresponding y-value, we can conclude that the inverse of relation t is a function. In this case, -1 has two y-values, -1 and 2. Therefore, the inverse of relation t is not a function.
The answer is C. Relation t is a function. The inverse of relation t is not a function.
is relation t a function? is the inverse of relation t a function? relation t x: 0246 y: -10-148
A. Relation t is not a function. The inverse of relation t is not a function
B. Relation t is a function. The inverse of relation t is a function
C. Relation t is a function. The inverse of relation t is not a function
D. Relation t is not a function. The inverse of relation t is a function
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